tag:blogger.com,1999:blog-84767617490217639942024-03-06T21:03:31.183+01:00Bertals BlogBertal Dresenhttp://www.blogger.com/profile/01435152037884170636noreply@blogger.comBlogger653125tag:blogger.com,1999:blog-8476761749021763994.post-35017450038349106112020-12-30T09:15:00.002+01:002020-12-30T10:39:19.401+01:00Abschied<p>Liebe Leser,</p><p>leider müssen wir Ihnen mitteilen, dass Sie in diesem Blog keine weiteren Beiträge des Autors Albert Endres lesen werden. Er verstarb am Morgen des 28.12.2020.</p><p>Dieser Blog lag ihm sehr am Herzen. Fast 10 Jahre lang behandelte er in über 650 Beiträgen Themen aus den Bereichen Informatik, Geschichte, Politik, Wirtschaft und Philosophie. </p><p>Wir möchten Ihnen, seinen Lesern, hiermit vielmals danken, dass Sie ihn auf diesem Weg begleitet haben. Ihr reges Interesse motivierte ihn dazu, stetig neue Beiträge zu verfassen.</p><p>Wir haben ihm versprochen, dieses digitale Erbe zu pflegen und Sie weiterhin daran teilhaben zu lassen, auf dass seine Gedanken in diesem Blog weiterleben mögen und er in den unseren.</p><p>In tiefer Trauer,<br />seine Familie</p><div class="separator" style="clear: both;"><br /></div><div class="separator" style="clear: both;"><br /></div><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgj14x2qqboLTc_9r-9kdoOHRWOuTbJUH1QKC4OBkJwNOLdLNaFKhtzRM7pJzmjbuURp10d98DVD4acE0KtAyECuz2h8L_d7Kzxl4Ow7cMmokC5q0BUqeSswP8yggC7-0UnB3rn5OloTrVN/s320/bertal.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="172" data-original-width="320" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgj14x2qqboLTc_9r-9kdoOHRWOuTbJUH1QKC4OBkJwNOLdLNaFKhtzRM7pJzmjbuURp10d98DVD4acE0KtAyECuz2h8L_d7Kzxl4Ow7cMmokC5q0BUqeSswP8yggC7-0UnB3rn5OloTrVN/s0/bertal.jpg" /></a></div><div class="separator" style="clear: both; text-align: center;"><br /></div><div class="separator" style="clear: both; text-align: left;"><br /></div><br /><p><br /></p>Marcushttp://www.blogger.com/profile/01175903697403722050noreply@blogger.com1tag:blogger.com,1999:blog-8476761749021763994.post-79952882907011642732020-11-28T18:55:00.059+01:002020-12-10T18:52:32.692+01:00Umzug eines Operators [654] <p><span style="font-family: arial;">Ein Blog-Verwalter ist umgezogen. Das ist wirklich ein Nicht-Ereignis. Die Nutzer dürfen es ja eh nicht spüren. Gut 20 km sind es zwischen den Standorten. Betroffen ist nur einer der beiden Verwalter und Betreuer, der schon vor längerer Zeit das Reisen aufgegeben hatte. Denke ich an die Frühzeit seiner Karriere, ist es der Operator des Zentral-Computers, den das Schicksal traf. Operator 2 blieb in stiller Reserve.</span></p><p style="text-align: center;"><img alt="" height="414" 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" width="311" /></p><p style="text-align: center;"><span style="font-family: arial;"><span style="font-size: x-small;"><i>Im Rollstuhltaxi</i></span><br /></span></p><p><span style="font-family: arial;">Dieser Operator 1 ist so gut wie unbeweglich. Selbst wandern, ja laufen kann er schon lange nicht mehr. Inzwischen versagten seine Beine vollends. Er ist auf den Rollstuhl angewiesen. Sein physischer Umzug erfolgte reibungslos mit der Hilfe eines Spezialtaxis. An der Qualität der Straße machte sich die Güte der Radaufhängung hin und wieder bemerkbar. Mit weniger als einer Stunde hielt sich der Schüttelmodus in Grenzen.</span><span style="font-family: arial;"> </span></p><p><span style="font-family: arial;">Die
sich anschließende Zeit diente dem Anpassen des Computers, auf dem der
Server beheimatet ist. Hier mussten Geräte-Niveau und Software-Level in
die schon länger erstrebte Konvergenz gebracht werden. Auch das nahm
rund eine Stunde in Anspruch. Danach waren alle mit dem Erreichten
zufrieden. Wie gut, dass es stressfreie Wochenende gibt, selbst in
Corona-Zeiten. Da Sie sich einloggten, überzeugten Sie sich, dass
Organisation und Technik verlässlich wirkten. <br /></span></p><p style="text-align: center;"><span style="font-family: arial;"> <img alt="" height="383" 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" width="511" /></span></p><p style="text-align: center;"><span style="font-family: arial;"> <i><span style="font-size: x-small;">Wir sehen ja, alles läuft </span></i><br /></span></p><p></p><p><span style="font-family: arial;"><i>PS</i>: Dieser Tage las ich einen Rückblick von 1972 von Dietmar Hopp und Hasso Plattner, nachdem sie bei der Firma Imperical Chemistries in Östringen bei Mannheim die Echtzeitanwendung Finanzanalyse (RF) zum Laufen gebracht hatten. Sie galten fortan als die Operatoren dieser Anwendung. Viel später lösten sie sich wieder davon.</span></p><p><i><b><span style="font-family: arial;">Operateuse oder Operatorin von 1961</span></b></i></p><p><span style="font-family: arial;">Aus der Frühzeit meiner Berufserfahrung möchte ich an eine Person erinnern, die als Operator zu ihrer Rolle fand. Die hieß Frau Warnke. Ihr Vornamen ist mir entfallen. Sie war vermutlich die erste Person, der ich zu einer Festanstellung verholfen habe. Es war Anfang der 1960er Jahre in der westdeutschen Großstadt Düsseldorf - nicht unweit from Hauptbahnhof entfernt. Dabei will ich es bewenden lassen.<br /></span></p><p><span style="font-family: arial;">Ich weiß nicht, wo sie verblieben ist. Vielleicht hat sie geheiratet, eine Familie gegründet, und hat dann in einer ganz anderen Tätigkeit ihre Erfüllung gefunden. Ich sage dies gleich am Anfang, da ich mehrere Frauen kannte, die es nach kurzer Zeit wieder aus ihren technischen Tätigkeiten heraustrieb. Sie wollten lieber Lehrerin oder Krankenschwester werden.</span></p><p style="text-align: center;"><span style="font-family: arial;"> <img alt="" height="220" 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" width="306" /></span></p><p style="text-align: center;"><span style="font-family: arial;"><span style="font-size: x-small;"><i> Frau Warnke als Operateuse,<br />an Console einer IBM 650 in Düsseldorf </i></span></span><span style="font-family: arial;"><span style="font-size: x-small;"><i><span style="font-family: arial;"><span style="font-size: x-small;"><i>(1961)</i></span></span></i></span></span></p><p><span style="font-family: arial;">Frau Warnke kam jeden Morgen gut gelaunt in unserem Betrieb an. Sie wohnte nicht allzu weit weg und kam per Straßenbahn oder U-Bahn, manchmal auch per Fahrrad - was aber noch sehr unüblich war. Als Erstes begrüßte sie alle anwesenden Personen, egal ob Mitarbeiter, Kunden oder Dienstleister. Dann kamen die Sträucher und Blumen dran. Tiere. also Vögel, Katzen oder Hunde, besaßen wir keine. Weiter ging es mit den Maschinen. Der Raum von der Größe eines einstöckigen Geschäftsladens war voll davon. Außerdem gäbe es mit Leder- oder Stoffkissen gepolsterte Teakholz-Möbel. Vorrang hatten die Maschinen. Nicht nur mussten sie in vornehmer Zurückhaltung auf Benutzer warten, sie mussten auch zu erkennen geben, dass sie bereit waren, sich derer Aufgaben anzunehmen. Sollte dies nicht offensichtlich sein, musste Abhilfe geschaffen werden. Wenn nötig (und möglich), musste ein Ersatzgerät her, oder aber ein Wartungstechniker bemüht werden.</span></p><p><span style="font-family: arial;">Jeder Nutzer der Maschinen, der dies so wollte, bekam Unterstützung bei der generellen Handhabe der Maschinen und Betreuung bei konkreten Einzelschritten. Sie verabschiedete alle Kunden am Ende ihres Aufenthalts, sowie sie sich um diejenigen kümmerte, für die der Spezialist oder Sachbearbeiter gerade nicht zur Verfügung stand.</span></p><p><span style="font-family: arial;">Heute gehört der hier beschriebene Operator bzw. die Operateuse zu den ausgestorbenen Berufen. (Noch gibt es einige etwas anders ausgerichtete) Wie wir wissen, hat uns später die Do-it-yourself-Haltung in den Griff genommen. So wie der Friseur dem Selbstrasierer wich, so betätigt man heute jedes Schalter selbst. Kosten, die ein Geschäft zu schädigen schienen oder seiner Ausbreitung im Wege standen, wurden auf den, der den Dienst haben wollte, zurückdelegiert. Der Chefchirurg musste auch Autofahren selbst können und wollen, sich rasieren und die Schuhe putzen. Langfristig wird man sich fragen, ob die entsprechende Antwort immer vorgeben sein und gleich sein muss.</span><br /></p>Bertal Dresenhttp://www.blogger.com/profile/01435152037884170636noreply@blogger.com0tag:blogger.com,1999:blog-8476761749021763994.post-4695670973230429282020-11-25T15:55:00.020+01:002020-11-29T17:31:38.853+01:00Zeit für ein neues Manifest - und zwar für eine noch nicht gegründete Partei [653]<p><span style="font-size: large;"><span style="font-family: arial;">Als Urvater jedweden sozialistischen Denkens wird heute gerne der Journalist und Amateurphilosoph Karl Marx (1818-1883) angesehen. Unterstützt von seinem Freund Friedrich Engels (1820-1895), dem Sproß einer reichen Elberfelder Fabrikantenfamilie, veröffentlichte man 1848 das Kommunistische Manifest. Bis heute gilt dieses Opus als die wichtigste und prägnanteste Darstellung des Kommunismus, Der Kommunismus ist die Basis, d.h. die fundamentale Ausprägung des Sozialismus. Marx stammte aus Trier, der ältesten von Deutschlands Städten, etwa 300 km weiter südwestlich vom heutigen Wuppertal gelegen - hart an er Grenze zu Luxembu<i>rg<b>.</b></i></span></span></p><p><span style="font-size: large;"><span style="font-family: arial;"><b><i>Marxens Herkunft und Prägezeit</i></b><br /></span></span></p><p><span style="font-size: large;"><span style="font-family: arial;">Trier ist weder eine Industrie- noch eine Handelstadt. Ihr Ruhm, der wohl kaum zu bestreiten ist, liegt auf ihrer historischen Rolle und ihrer geistlichen Tadition. Sie war mehrere Jahrhunderte lang die westliche Hauptstadt des römischen Reiches, später ein wichtiger Bischofssitz und eine Universitätsstadt. </span></span><span style="font-size: large;"><span style="font-family: arial;">Schon zu Zeiten Napoléons (1801-1815) wagten es erste jüdische Familien sich in Trier niederzulassen.</span></span></p><div><span style="font-size: large;"><span style="font-family: arial;">Das bis dahin unabhängige Kurfürstentum Trier wurde 1814 ein Teil Preußens. Als Karl Marx geboren wurde, war sein Vater Herschel (deutsch: Heinrich) bereits Protestant, Rechtanwalt und Notar. Im Jahre 1824 wurden alle 7 Kinder getauft, auch Karl, das Zweitälteste. Karls Mutter stammte aus der holländischen Familie, welche die Firma Philips in Eindhoven gründete. Ihr Trierer Haus lag auf der Simeonsstraße, der heutigen Flaniermeile der Stadt in der Nähe der Porta Nigra. Man besaß Weinberge in Kürenz und Mertesdorf. Beide Orte liegen in Richtung des Ruwertals.<br /></span></span></div><div><span style="font-size: large;"><span style="font-family: arial;"><br /></span></span></div><div><span style="font-size: large;"><span style="font-family: arial;">Karl erhielt bis zum 12. Lebensjahr öffentlichen Unterricht, danach hatte er einen privaten Lehrer. In diese Zeit fiel in Paris die Revolution
von 1830, und in der Pfalz das Hambacher Fest 1832. Von 1830 -1835 besuchte Marx das Gymnasium in Trier (zusammen mit seinem Freund und späteren Schwager Edgar von Westphalen). Ab 1835 studierte er Rechtswissenschaften in Bonn und trat einer schlagenden Verbindung (Treveraner) bei.</span></span> <span style="font-size: large;"><span style="font-family: arial;">Er</span></span><span style="font-size: large;"><span style="font-family: arial;"> lebte auf großem Fuß, 'zwischen Champagner und Pfandhaus', wie er selbst zu sagen pflegte. Er</span></span><span style="font-size: large;"><span style="font-family: arial;"><span style="font-size: large;"><span style="font-family: arial;"> verfügte über 700 Thaler im Jahr als
Student.</span></span></span></span></div><div><span style="font-size: large;"><span style="font-family: arial;"><br /></span></span></div><div><span style="font-size: large;"><span style="font-family: arial;"></span></span></div><div><span style="font-size: large;"><span style="font-family: arial;">Marx wurde 1841 in Jena (in Abwesenheit) promoviert und ging anschließend zur ‚Rheinischen Zeitung‘ in Köln. Diese Zeitung wurde von der Familie Oppenheimer finanziert. Im Jahr darauf wurde er Chefredakteur und steigerte die Auflage bis 12/1842 auf 3500.</span></span><span style="font-size: large;"><span style="font-family: arial;"><span style="font-size: large;"><span style="font-family: arial;"> Er </span></span>berichtete u.a. über Armut an der Mosel. Im März 1843 reichte er seinen Rücktritt ein. Er begab sich nach London und wirkte von dort aus (zeitweise auch in Paris). Er liegt in London begraben.<br /></span></span></div><div><span style="font-size: large;"><span style="font-family: arial;"><br /></span></span></div><span style="font-size: x-small;"><p>---------------------------------------------------------------------------------------------------------------------------------------------</p></span><span style="font-size: x-small;"><p></p></span><span style="font-size: x-small;"><p><br /></p>
</span><h2 style="text-align: center;"><span style="font-family: arial;">Karl Marx/Friedrich Engels mit Bertal Dresen und M. Maux<br /></span></h2><span style="font-family: arial;">
</span><h1 style="text-align: center;"><span style="font-family: arial;">(Neues) Manifest der Kommunikationsbereiten Partei </span></h1>
<span style="font-size: large;"><span style="font-family: arial;"><span><p>Das Original wurde geschrieben im Dezember 1847/Januar 1848. Gedruckt und als Einzelbroschüre im Februar/März 1848 in London
erschienen. Der hier benutzten Ausgabe liegt der Text der letzten von
Friedrich Engels besorgten deutschen Ausgabe von 1890 zugrunde. </p><p>Die vorliegende Übertragung und Überarbeitung erfolgte im November 2020. Sie erschien in Bertals Blog. Das Vokuabular, mit dessen Hilfe die fernere Vergangenheit beschrieben wurde, haben wir stehen lassen. Nur bei jüngster Vergangenheit und Gegenwart musste hin und wieder differenziert werden. <br /></p></span></span></span><hr noshade="noshade" size="1" /><span style="font-size: large;"><span style="font-family: arial;"></span></span><p><span style="font-size: large;"><span style="font-family: arial;"><b><a name="S461">|461|</a></b> Ein Gespenst geht um in Europa
- das Gespenst der (digitalen) Kommunikation. Alle Mächte des alten Europa haben sich
zu einer heiligen Hetzjagd gegen dies Gespenst verbündet, der Papst und
die Nachfolger von Zar, Metternich und Guizot, französische Radikale und deutsche
Polizisten.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Wo ist die Oppositionspartei, die nicht von ihren regierenden Gegnern
als kommunikastisch verschrien worden wäre, wo die Oppositionspartei, die
den fortgeschritteneren Oppositionsleuten sowohl wie ihren reaktionären
Gegnern den brandmarkenden Vorwurf des Kommunikatismus nicht
zurückgeschleudert hätte?</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Zweierlei geht aus dieser Tatsache hervor.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Der Kommunikatismus wird bereits von allen europäischen Mächten als eine Macht anerkannt.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Es ist hohe Zeit, daß die Kommunikatisten ihre Anschauungsweise, ihre
Zwecke, ihre Tendenzen vor der ganzen Welt offen darlegen und dem Märchen vom Gespenst des Kommunikatismus ein Manifest der Partei selbst entgegenstellen.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Zu diesem Zweck haben sich Kommunikatisten der verschiedensten Altersgruppen versammelt und das folgende Manifest entworfen,
das in englischer, französischer, deutscher, italienischer, flämischer
und dänischer Sprache veröffentlicht wird. </span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><h3 align="CENTER"><span style="font-size: large;"><span style="font-family: arial;"><a name="Kap_I">I</a></span></span></h3><span style="font-size: large;"><span style="font-family: arial;">
</span></span><h3 align="CENTER"><span style="font-size: large;"><span style="font-family: arial;">Bourgeois und Proletarier </span></span></h3><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;"><b><a name="S462">|462|</a></b> Die Geschichte aller bisherigen Gesellschaft ist die Geschichte von Klassenkämpfen. Die Zukunft wird von Kommunikationsbemühungen bestimmt.<br /></span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Freier und Sklave, Patrizier und Plebejer, Baron und Leibeigener,
Zunftbürger und Gesell, kurz, Unterdrücker und Unterdrückte standen in
stetem Gegensatz zueinander, führten einen ununterbrochenen, bald
versteckten, bald offenen Kampf, einen Kampf, der jedesmal mit einer
revolutionären Umgestaltung der ganzen Gesellschaft endete oder mit dem
gemeinsamen Untergang der kämpfenden Klassen und Gruppen.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">In den früheren Epochen der Geschichte finden wir fast überall eine
vollständige Gliederung der Gesellschaft in verschiedene Stände, eine
mannigfaltige Abstufung der gesellschaftlichen Stellungen. Im alten Rom
haben wir <a name="S463"><b>|463|</b></a> Patrizier, Ritter, Plebejer,
Sklaven; im Mittelalter Feudalherren, Vasallen, Zunftbürger, Gesellen,
Leibeigene, und noch dazu in fast jeder dieser Klassen besondere
Abstufungen.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Die aus dem Untergang der feudalen Gesellschaft hervorgegangene
moderne bürgerliche Gesellschaft hat die Klassengegensätze nicht
aufgehoben. Sie hat nur neue Klassen und Gruppen, neue Bedingungen der
Unterdrückung und Kooperation, neue Gestaltungen und Brigad</span></span><span style="font-size: large;"><span style="font-family: arial;">en des Kampfes an die Stelle der alten
gesetzt.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Unsere Epoche, die Epoche der (allgemeinen) Bourgeoisie, zeichnet sich jedoch
dadurch aus, daß sie die Klassengegensätze vereinfacht und die Kommunikation intensiviert hat. Die ganze
Gesellschaft spaltet sich mehr und mehr in mehrere große Lager auf, die sich einander direkt gegenüberstehen und/oder ergänzen: Industrie, Handel, Wissenschaft, Verwaltung und Privat. Bourgeoisie
und Proletariat spielen kaum noch eine Rolle..</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Aus den Leibeigenen des Mittelalters gingen die Pfahlbürger der
ersten Städte hervor; aus dieser Pfahlbürgerschaft entwickelten sich die
ersten Elemente der Bourgeoisie.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Die Entdeckung Amerikas, die Umschiffung Afrikas schufen der
aufkommenden Bourgeoisie ein neues Terrain. Der ostindische und
chinesische Markt, die Kolonisierung von Amerika, der Austausch mit den
Kolonien, die Vermehrung der Tauschmittel und der Waren überhaupt gaben
dem Handel, der Schiffahrt, der Industrie einen nie gekannten Aufschwung
und damit dem revolutionären Element in der zerfallenden feudalen
Gesellschaft eine rasche Entwicklung.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Die bisherige feudale oder zünftige Betriebsweise der Industrie reichte nicht mehr aus für den mit neuen
Märkten anwachsenden Bedarf. Die Manufaktur trat an ihre Stelle. Die
Zunftmeister wurden verdrängt durch den industriellen Mittelstand; die
Teilung der Arbeit zwischen den verschiedenen Korporationen verschwand
vor der Teilung der Arbeit in der einzelnen Werkstatt selbst.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Aber immer wuchsen die Märkte, immer stieg der Bedarf. Auch die
Manufaktur reichte nicht mehr aus. Da revolutionierte der Dampf und die
Maschinerie die industrielle Produktion. An die Stelle der Manufaktur
trat die moderne große Industrie, an die Stelle des industriellen
Mittelstandes traten die industriellen Millionäre, die Chefs ganzer
industrieller Armeen, die modernen Bourgeois.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Die große Industrie hat den Weltmarkt hergestellt, den die Entdeckung
Amerikas vorbereitete. Der Weltmarkt hat dem Handel, der Schifffahrt,
den Landkommunikationen eine unermeßliche Entwicklung gegeben. Diese hat wieder auf die Ausdehnung der Industrie
zurückgewirkt, und in demselben Maße, worin Industrie, Handel,
Schiffahrt, Eisenbahnen sich ausdehnten, in demselben Maße entwickelte
sich die Bourgeoisie, vermehrte sie ihre Kapitalien, drängte sie alle
vom Mittelalter her überlieferten Klassen in den Hintergrund.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Wir sehen also, wie die moderne Bourgeoisie selbst das Produkt eines
langen Entwicklungsganges, einer Reihe von Umwälzungen in der
Produktions- und Verkehrsweise ist.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Jede dieser Entwicklungsstufen der Bourgeoisie war begleitet von einem entsprechenden politischen Fortschritt. Unterdrückter Stand unter der Herrschaft der Feudalherren, bewaffnete und sich selbst verwaltende Assoziation in der Kommune, hier unabhängige städtische Republik, dort dritter steuerpflichtiger Stand der Monarchie, dann zur Zeit der Manufaktur Gegengewicht gegen den Adel in der ständischen oder in der absoluten Monarchie,
Hauptgrundlage der großen Monarchien überhaupt, erkämpfte sie sich
endlich seit der Herstellung der großen Industrie und des Weltmarktes im
modernen Repräsentativstaat die ausschließliche politische Herrschaft.
Die moderne Staatsgewalt ist nur ein Ausschuß, der die
gemeinschaftlichen Geschäfte der ganzen Bourgeoisklasse verwaltet.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Die Bourgeoisie hat in der Geschichte eine höchst revolutionäre Rolle gespielt.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Die Bourgeoisie, wo sie zur Herrschaft gekommen, hat alle feudalen,
patriarchalischen, idyllischen Verhältnisse zerstört. Sie hat die
buntscheckigen Feudalbande, die den Menschen an seinen natürlichen
Vorgesetzten knüpften, unbarmherzig zerrissen und kein anderes Band
zwischen Mensch und Mensch übriggelassen als das nackte Interesse, als
die gefühllose "bare Zahlung". Sie hat die heiligen Schauer der frommen
Schwärmerei, der ritter- <a name="S465"><b>|465|</b></a> lichen
Begeisterung, der spießbürgerlichen Wehmut in dem eiskalten Wasser
egoistischer Berechnung ertränkt. Sie hat die persönliche Würde in den
Tauschwert aufgelöst und an die Stelle der zahllosen verbrieften und
wohlerworbenen Freiheiten die eine gewissenlose Handelsfreiheit gesetzt.
Sie hat, mit einem Wort, an die Stelle der mit religiösen und
politischen Illusionen verhüllten Ausbeutung die offene, unverschämte,
direkte, dürre Ausbeutung gesetzt.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Die Bourgeoisie hat alle bisher ehrwürdigen und mit frommer Scheu
betrachteten Tätigkeiten ihres Heiligenscheins entkleidet. Sie hat den
Arzt, den Juristen, den Pfaffen, den Poeten, den Mann der Wissenschaft
in ihre bezahlten Lohnarbeiter verwandelt.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Die Bourgeoisie hat dem Familienverhältnis seinen
rührend-sentimentalen Schleier abgerissen und es auf ein reines
Geldverhältnis zurückgeführt.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Die Bourgeoisie hat enthüllt, wie die brutale Kraftäußerung, die die
Reaktion so sehr am Mittelalter bewundert, in der trägsten Bärenhäuterei
ihre passende Ergänzung fand. Erst sie hat bewiesen, was die Tätigkeit
der Menschen zustande bringen kann. Sie hat ganz andere Wunderwerke
vollbracht als ägyptische Pyramiden, römische Wasserleitungen und
gotische Kathedralen, sie hat ganz andere Züge ausgeführt als
Völkerwanderungen und Kreuzzüge.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Die Bourgeoisie kann nicht existieren, ohne die
Produktionsinstrumente, also die Produktionsverhältnisse, also sämtliche
gesellschaftlichen Verhältnisse fortwährend zu revolutionieren.
[Erstaunlicherweise ist dies immer noch so] Unveränderte Beibehaltung der alten Produktionsweise war dagegen die
erste Existenzbedingung aller früheren industriellen Klassen. Die
fortwährende Umwälzung der Produktion, die ununterbrochene Erschütterung
aller gesellschaftlichen Zustände, die ewige Unsicherheit und Bewegung
zeichnet die Bourgeoisepoche vor allen anderen 0
aus. Alle festen eingerosteten Verhältnisse mit ihrem Gefolge von
altehrwürdigen Vorstellungen und Anschauungen werden aufgelöst, alle
neugebildeten veralten, ehe sie verknöchern können. Alles Ständische und
Stehende verdampft, alles Heilige wird entweiht, und die Menschen sind
endlich gezwungen, ihre Lebensstellung, ihre gegenseitigen Beziehungen
mit nüchternen Augen anzusehen.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Das Bedürfnis nach einem stets ausgedehnteren Absatz für ihre
Produkte jagt die Bourgeoisie über die ganze Erdkugel. Überall muß sie
sich einnisten, überall anbauen, überall Verbindungen herstellen.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;"><b><a name="S466">|466|</a></b> Die Bourgeoisie hat durch ihre Exploitation des Weltmarkts die Produktion und Konsumption aller Länder
kosmopolitisch gestaltet. Sie hat zum großen Bedauern der Reaktionäre
den nationalen Boden der Industrie unter den Füßen weggezogen. Die
uralten nationalen Industrien sind vernichtet worden und werden noch
täglich vernichtet. Sie werden verdrängt durch neue Industrien, deren
Einführung eine Lebensfrage für alle zivilisierten Nationen wird, durch
Industrien, die nicht mehr einheimische Rohstoffe, sondern den
entlegensten Zonen angehörige Rohstoffe verarbeiten und deren Fabrikate
nicht nur im Lande selbst, sondern in allen Weltteilen zugleich
verbraucht werden.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">An die Stelle der alten, durch Landeserzeugnisse befriedigten
Bedürfnisse treten neue, welche die Produkte der entferntesten Länder
und Klimate zu ihrer Befriedigung erheischen. An die Stelle der alten
lokalen und nationalen Selbstgenügsamkeit und Abgeschlossenheit tritt
ein allseitiger Verkehr, eine allseitige Abhängigkeit der Nationen
voneinander. Und wie in der materiellen, so auch in der geistigen
Produktion. Die geistigen Erzeugnisse der einzelnen Nationen werden
Gemeingut. Die nationale Einseitigkeit und Beschränktheit wird mehr und
mehr unmöglich, und aus den vielen nationalen und lokalen Literaturen
bildet sich eine Weltliteratur.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Die Bourgeoisie reißt durch die rasche Verbesserung aller
Produktionsinstrumente, durch die unendlich erleichterte Kommunikation
alle, auch die barbarischsten Nationen in die Zivilisation. Die
wohlfeilen Preise ihrer Waren sind die schwere Artillerie, mit der sie
alle chinesischen Mauern in den Grund schießt, mit der sie den
hartnäckigsten Fremdenhaß der Barbaren zur Kapitulation zwingt. Sie
zwingt alle Nationen, die Produktionsweise der Bourgeoisie sich
anzueignen, wenn sie nicht zugrunde gehen wollen; sie zwingt sie, die
sogenannte Zivilisation bei sich selbst einzuführen, d.h. Bourgeois zu
werden. Mit einem Wort, sie schafft sich eine Welt nach ihrem eigenen
Bilde.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Die Bourgeoisie hat das Land der Herrschaft der Stadt unterworfen.
Sie hat enorme Städte geschaffen, sie hat die Zahl der städtischen
Bevölkerung gegenüber der ländlichen in hohem Grade vermehrt und so
einen bedeutenden Teil der Bevölkerung dem Idiotismus des Landlebens
entrissen. Wie sie das Land von der Stadt, hat sie die barbarischen und
halbbarbarischen Länder von den zivilisierten, die Bauernvölker von den
Bourgeoisvölkern, den Orient vom Okzident abhängig gemacht.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Die Bourgeoisie hebt mehr und mehr die Zersplitterung der
Produktionsmittel, des Besitzes und der Bevölkerung auf. Sie hat die
Bevölkerung agglo- <a name="S467"><b>|467|</b></a> meriert, die
Produktionsmittel zentralisiert und das Eigentum in wenigen Händen
konzentriert. Die notwendige Folge hiervon war die politische
Zentralisation. Unabhängige, fast nur verbündete Provinzen mit
verschiedenen Interessen, Gesetzen, Regierungen und Zöllen wurden
zusammengedrängt in eine Nation, eine Regierung, ein Gesetz, ein
nationales Klasseninteresse, eine Douanenlinie. </span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Die Bourgeoisie hat in ihrer kaum hundertjährigen Klassenherrschaft
massenhaftere und kolossalere Produktionskräfte geschaffen als alle
vergangenen Generationen zusammen. Unterjochung der Naturkräfte,
Maschinerie, Anwendung der Chemie auf Industrie und Ackerbau,
Dampfschiffahrt, Eisenbahnen, elektrische Telegraphen, Urbarmachung
ganzer Weltteile, Schiffbarmachung der Flüsse, ganze aus dem Boden
hervorgestampfte Bevölkerungen - welches frühere Jahrhundert ahnte, daß solche Produktionskräfte im Schoß der gesellschaftlichen Arbeit schlummerten.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Wir haben also gesehen: Die Produktions- und Verkehrsmittel, auf deren Grundlage sich
die Bourgeoisie heranbildete, wurden in der feudalen Gesellschaft
erzeugt. Auf einer gewissen Stufe der Entwicklung dieser Produktions-
und Verkehrsmittel entsprachen die Verhältnisse, worin die feudale
Gesellschaft produzierte und austauschte, die feudale Organisation der
Agrikultur und Manufaktur, mit einem Wort die feudalen
Eigentumsverhältnisse den schon entwickelten Produktivkräften nicht
mehr. Sie hemmten die Produktion, statt sie zu fördern. Sie verwandelten
sich in ebensoviele Fesseln. Sie mußten gesprengt werden, sie wurden
gesprengt. </span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">An ihre Stelle trat die freie Konkurrenz mit der ihr angemessenen
gesellschaftlichen und politischen Konstitution, mit der ökonomischen
und politischen Herrschaft der Bourgeoisklasse.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Unter unsern Augen geht eine ähnliche Bewegung vor. Die bürgerlichen
Produktions- und Verkehrsverhältnisse, die bürgerlichen
Eigentumsverhältnisse, die moderne bürgerliche Gesellschaft, die so
gewaltige Produktions- und Verkehrsmittel hervorgezaubert hat, gleicht
dem Hexenmeister, der die unterirdischen Gewalten nicht mehr zu
beherrschen vermag, die er heraufbeschwor. Seit Dezennien ist die
Geschichte der Industrie und des Handels nur <a href="http://www.mlwerke.de/me/me04/me04_459.htm#T12">{12}</a>
die Geschichte der Empörung der modernen Produktivkräfte gegen die
modernen Produktionsverhältnisse, gegen die Eigentumsverhältnisse,
welche die Lebensbedingungen der Bourgeoisie und ihrer Herrschaft sind.
Es genügt, die Handelskrisen zu nennen, welche in ihrer periodischen
Wiederkehr immer drohender die Existenz der ganzen bürgerlichen
Gesellschaft in <a name="S468"><b>|468|</b></a> Frage stellen. In den Handelskrisen wird ein großer Teil nicht nur der erzeugten Produkte, sondern <a href="http://www.mlwerke.de/me/me04/me04_459.htm#T13">{13}</a>
der bereits geschaffenen Produktivkräfte regelmäßig vernichtet. In den
Krisen bricht eine gesellschaftliche Epidemie aus, welche allen früheren
Epochen als ein Widersinn erschienen wäre - die Epidemie der
Überproduktion. Die Gesellschaft findet sich plötzlich in einen Zustand
momentaner Barbarei zurückversetzt; eine Hungersnot, ein allgemeiner
Vernichtungskrieg <a href="http://www.mlwerke.de/me/me04/me04_459.htm#T14">{14}</a>
scheinen ihr alle Lebensmittel abgeschnitten zu haben; die Industrie,
der Handel scheinen vernichtet, und warum? Weil sie zuviel Zivilisation,
zuviel Lebensmittel, zuviel Industrie, zuviel Handel besitzt. Die
Produktivkräfte, die ihr zur Verfügung stehen, dienen nicht mehr zur
Beförderung der bürgerlichen Eigentumsverhältnisse; im Gegenteil, sie sind zu
gewaltig für diese Verhältnisse geworden, sie werden von ihnen gehemmt;
und sobald sie dies Hemmnis überwinden, bringen sie die ganze
bürgerliche Gesellschaft in Unordnung, gefährden sie die Existenz des
bürgerlichen Eigentums. Die bürgerlichen Verhältnisse sind zu eng
geworden, um den von ihnen erzeugten Reichtum zu fassen. - Wodurch
überwindet die Bourgeoisie die Krisen? Einerseits durch die erzwungene
Vernichtung einer Masse von Produktivkräften; anderseits durch die
Eroberung neuer Märkte und die gründlichere Ausbeutung alter Märkte. Wodurch also? Dadurch, daß sie allseitigere und gewaltigere
Krisen vorbereitet und die Mittel, den Krisen vorzubeugen, vermindert.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Die Waffen, womit die Bourgeoisie den Feudalismus zu Boden geschlagen hat, richten sich jetzt gegen die Bourgeoisie selbst.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Aber die Bourgeoisie hat nicht nur die Waffen geschmiedet, die ihr
den Tod bringen; sie hat auch die Männer gezeugt, die diese Waffen
führen werden - die modernen Arbeiter, die <i>Proletarier</i>.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">In demselben Maße, worin sich die Bourgeoisie, d.h. das Kapital,
entwickelt, in demselben Maße entwickelt sich das Proletariat, die
Klasse der modernen Arbeiter, die nur so lange leben, als sie Arbeit
finden, und die nur so lange Arbeit finden, als ihre Arbeit das Kapital
vermehrt. Diese Arbeiter, die sich stückweis verkaufen müssen, sind eine
Ware wie jeder andere Handelsartikel und daher gleichmäßig allen
Wechselfällen der Konkurrenz, allen Schwankungen des Marktes ausgesetzt.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Die Arbeit der Proletarier hat durch die Ausdehnung der Maschinerie
und die Teilung der Arbeit allen selbständigen Charakter und damit allen
Reiz für die Arbeiter verloren. Er wird ein bloßes Zubehör der Maschine, von dem <a name="S469"><b>|469|</b></a>
nur der einfachste, eintönigste, am leichtesten erlernbare Handgriff
verlangt wird. Die Kosten, die der Arbeiter verursacht, beschränken sich
daher fast nur auf die Lebensmittel, die er zu seinem Unterhalt und zur
Fortpflanzung seiner Race bedarf. Der Preis einer Ware, also auch der
Arbeit, ist aber gleich ihren Produktionskosten. In demselben Maße, in
dem die Widerwärtigkeit der Arbeit wächst, nimmt daher der Lohn ab. Noch
mehr, in demselben Maße, wie Maschinerie und Teilung der Arbeit
zunehmen, in demselben Maße nimmt auch die Masse
der Arbeit zu, sei es durch Vermehrung der Arbeitsstunden, sei es durch
Vermehrung der in einer gegebenen Zeit geforderten Arbeit,
beschleunigten Lauf der Maschinen usw.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Die moderne Industrie hat die kleine Werkstube des patriarchalischen
Meisters in die große Fabrik des industriellen Kapitalisten verwandelt.
Arbeitermassen, in der Fabrik zusammengedrängt, werden soldatisch
organisiert. Sie werden als gemeine Industriesoldaten unter die Aufsicht
einer vollständigen Hierarchie von Unteroffizieren und Offizieren
gestellt. Sie sind nicht nur Knechte der Bourgeoisie, des
Bourgeoisstaates, sie sind täglich und stündlich geknechtet von der
Maschine, von dem Aufseher und vor allem von den einzelnen fabrizierenden Bourgeois selbst. Diese Despotie ist um so
kleinlicher, gehässiger, erbitterter, je offener sie den Erwerb als
ihren Zweck proklamiert.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Je weniger die Handarbeit Geschicklichkeit und Kraftäußerung
erheischt, d.h. je mehr die moderne Industrie sich entwickelt, desto
mehr wird die Arbeit der Männer durch die der Weiber <a href="http://www.mlwerke.de/me/me04/me04_459.htm#T21">{21}</a>
verdrängt. Geschlechts- und Altersunterschiede haben keine
gesellschaftliche Geltung mehr für die Arbeiterklasse. Es gibt nur noch
Arbeitsinstrumente, die je nach Alter und Geschlecht verschiedene Kosten
machen.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Ist die Ausbeutung des Arbeiters durch den Fabrikanten so weit
beendigt, daß er seinen Arbeitslohn bar ausgezahlt erhält, so fallen die
anderen Teile der Bourgeoisie über ihn her, der Hausbesitzer, der
Krämer, der Pfandleiher <a href="http://www.mlwerke.de/me/me04/me04_459.htm#T22">{22}</a> usw.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Die bisherigen kleinen Mittelstände, die kleinen Industriellen,
Kaufleute und Rentiers, die Handwerker und Bauern, alle diese Klassen
fallen ins Proletariat hinab, teils dadurch, daß ihr kleines Kapital für
den Betrieb der großen Industrie nicht ausreicht und der Konkurrenz mit
den größeren Kapitalisten erliegt, teils dadurch, daß ihre
Geschicklichkeit von neuen Produktionsweisen entwertet wird. So
rekrutiert sich das Proletariat aus allen Klassen der Bevölkerung.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;"><b><a name="S470">|470|</a></b> Das Proletariat macht verschiedene Entwicklungsstufen durch. Sein Kampf gegen die Bourgeoisie beginnt mit seiner Existenz.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Im Anfang kämpfen die einzelnen Arbeiter, dann die Arbeiter einer
Fabrik, dann die Arbeiter eines Arbeitszweiges an einem Ort gegen den
einzelnen Bourgeois, der sie direkt ausbeutet. Sie richten ihre Angriffe
nicht nur gegen die bürgerlichen Produktionsverhältnisse, sie richten
sie gegen die Produktionsinstrumente selbst; sie vernichten die fremden
konkurrierenden Waren, sie zerschlagen die Maschinen, sie stecken die
Fabriken in Brand, die suchen die untergegangene Stellung des mittelalterlichen Arbeiters wiederzuerringen.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Auf dieser Stufe bilden die Arbeiter eine über das Land zerstreute
und durch die Konkurrenz zersplitterte Masse. Massenhaftes
Zusammenhalten der Arbeiter ist noch nicht die Folge ihrer eigenen
Vereinigung, sondern die Folge der Vereinigung der Bourgeoisie, die zur
Erreichung ihrer eigenen politischen Zwecke das ganze Proletariat in
Bewegung setzen muß und es einstweilen noch kann.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Auf dieser Stufe bekämpfen die Proletarier also noch nicht ihre
Feinde, sondern die Feinde ihrer Feinde, die Reste der absoluten
Monarchie, die Grundeigentümer, die nichtindustriellen Bourgeois, die
Kleinbürger. Die ganze geschichtliche Bewegung ist so in den Händen der
Bourgeoisie konzentriert; jeder Sieg, der so errungen wird, ist ein Sieg
der Bourgeoisie.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Aber mit der Entwicklung der Industrie vermehrt sich nicht nur das
Proletariat; es wird in größeren Massen zusammengedrängt, seine Kraft
wächst, und es fühlt sie immer mehr. Die Interessen, die Lebenslagen
innerhalb des Proletariats gleichen sich immer mehr aus, indem die
Maschinerie mehr und mehr die Unterschiede der Arbeit verwischt und den
Lohn fast überall auf ein gleich niedriges Niveau herabdrückt. Die
wachsende Konkurrenz der Bourgeois unter sich und die daraus
hervorgehenden Handelskrisen machen den Lohn der Arbeiter immer
schwankender; die immer rascher sich entwickelnde, unaufhörliche
Verbesserung der Maschinerie macht ihre ganze Lebensstellung immer
unsicherer; immer mehr nehmen die Kollisionen zwischen dem einzelnen
Arbeiter und dem einzelnen Bourgeois den Charakter von Kollisionen
zweier Klassen an. Die Arbeiter beginnen damit, Koalitionen
gegen die Bourgeois zu bilden; sie treten zusammen zur Behauptung ihres
Arbeitslohns. Sie stiften selbst dauernde Assoziationen, um sich für
die gelegentlichen Empörungen zu verproviantieren. Stellenweis bricht
der Kampf in Emeuten aus.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;"><b><a name="S471">|471|</a></b> Von Zeit zu Zeit siegen die
Arbeiter, aber nur vorübergehend. Das eigentliche Resultat ihrer Kämpfe
ist nicht der unmittelbare Erfolg, sondern die immer weiter um sich
greifende Vereinigung der Arbeiter. Sie wird befördert durch die
wachsenden Kommunikationsmittel, die von der großen Industrie erzeugt
werden und die Arbeiter der verschiedenen Lokalitäten miteinander in
Verbindung setzen. Es bedarf aber bloß der Verbindung, um die vielen
Lokalkämpfe von überall gleichem Charakter zu einem nationalen, zu einem
Klassenkampf zu zentralisieren. Jeder Klassenkampf ist aber
ein politischer Kampf. Und die Vereinigung, zu der die Bürger des
Mittelalters mit ihren Vizinalwegen Jahrhunderte bedurften, bringen die
modernen Proletarier mit den Eisenbahnen in wenigen Jahren zustande.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Diese Organisation der Proletarier zur Klasse, und damit zur
politischen Partei, wird jeden Augenblick wieder gesprengt durch die
Konkurrenz unter den Arbeitern selbst. Aber sie ersteht immer wieder,
stärker, fester, mächtiger. Sie erzwingt die Anerken+nung einzelner
Interesse der Arbeiter in Gesetzesform, indem sie die Spaltungen der
Bourgeoisie unter sich benutzt. So die Zehnstundenbill in England.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Die Kollisionen der alten Gesellschaft überhaupt fördern mannigfach
den Entwicklungsgang des Proletariats. Die Bourgeoisie befindet sich in
fortwährendem Kampfe: anfangs gegen die Aristokratie; später gegen die
Teile der Bourgeoisie selbst, deren Interessen mit dem Fortschritt der
Industrie in Widerspruch geraten; stets gegen die Bourgeoisie aller
auswärtigen Länder. In allen diesen Kämpfen sieht sie sich genötigt, an
das Proletariat zu appellieren, seine Hülfe in Anspruch zu nehmen und es
so in die politische Bewegung hineinzureißen. Sie selbst führt also dem
Proletariat ihre eigenen Bildungselemente, d.h. Waffen gegen sich selbst, zu.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Es werden ferner, wie wir sahen, durch den Fortschritt der Industrie
ganze Bestandteile der herrschenden Klasse ins Proletariat hinabgeworfen
oder wenigstens in ihren Lebensbedingungen bedroht. Auch sie führen dem
Proletariat eine Masse Bildungselemente zu.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">In Zeiten endlich, wo der Klassenkampf sich der Entscheidung nähert,
nimmt der Auflösungsprozeß innerhalb der herrschenden Klasse, innerhalb
der ganzen alten Gesellschaft, einen so heftigen, so grellen Charakter
an, daß ein kleiner Teil der herrschenden Klasse sich von ihr lossagt
und sich der revolutionären Klasse anschließt, der Klasse, welche die
Zukunft in ihren Händen trägt. Wie daher früher ein Teil des Adels zur
Bourgeoisie überging, so geht jetzt ein Teil der Bourgeoisie zum
Proletariat über, und nament- <a name="S472"><b>|472|</b></a> lich ein
Teil dieser Bourgeoisideologen, welche zum theoretischen Verständnis der
ganzen geschichtlichen Bewegung sich hinaufgearbeitet haben.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Von allen Klassen, welche heutzutage der Bourgeoisie gegenüberstehen,
ist nur das Proletariat eine wirklich revolutionäre Klasse. Die übrigen
Klassen verkommen und gehen unter mit der großen Industrie, das
Proletariat ist ihr eigenstes Produkt.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Die Mittelstände, der kleine Industrielle, der kleine Kaufmann, der
Handwerker, der Bauer, sie alle bekämpfen die Bourgeoisie, um ihre
Existenz als Mittelstände vor dem Untergang zu sichern. Sie sind also
nicht revolutionär, sondern konservativ. Noch mehr, sie sind reaktionär,
sie suchen das Rad der Geschichte zurückzudrehen. Sind sie
revolutionär, so sind sie es im Hinblick auf den ihnen bevorstehenden
Übergang ins Proletariat, so verteidigen sie nicht ihre gegenwärtigen,
sondern ihre zukünftigen Interessen, so verlassen sie ihren eigenen
Standpunkt, um sich auf den des Proletariats zu stellen. </span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Das Lumpenproletariat, diese passive Verfaulung der untersten
Schichten der alten Gesellschaft, wird durch eine proletarische
Revolution stellenweise in die Bewegung hineingeschleudert, seiner
ganzen Lebenslage nach wird es bereitwilliger sein, sich zu reaktionären
Umtrieben erkaufen zu lassen.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Die Lebensbedingungen der alten Gesellschaft sind schon vernichtet in
den Lebensbedingungen des Proletariats. Der Proletarier ist
eigentumslos; sein Verhältnis zu Weib und Kindern hat nichts mehr gemein
mit dem bürgerlichen Familienverhältnis; die moderne industrielle
Arbeit, die moderne Unterjochung unter das Kapital, dieselbe in England
wie in Frankreich, in Amerika wie in Deutschland, hat ihm allen
nationalen Charakter abgestreift. [Wieso ist das ein Problem?] Die Gesetze, die Moral, die Religion
sind für ihn ebenso viele bürgerliche Vorurteile, hinter denen sich
ebenso viele bürgerliche Interessen verstecken.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Alle früheren Klassen, die sich die Herrschaft eroberten, suchten
ihre schon erworbene Lebensstellung zu sichern, indem sie die ganze
Gesellschaft den Bedingungen ihres Erwerbs unterwarfen. Die Proletarier
können sich die gesellschaftlichen Produktivkräfte nur erobern, indem
sie ihre eigene bisherige Aneignungsweise und damit die ganze bisherige
Aneignungsweise abschaffen. Die Proletarier haben nichts von dem Ihrigen
zu sichern, sie haben alle bisherigen Privatsicherheiten und Privatversicherungen zu zerstören. [Voll daneben gegriffen] </span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Alle bisherigen Bewegungen waren Bewegungen von Minoritäten oder im
Interesse von Minoritäten. Die proletarische Bewegung ist die
selbständige Bewegung der ungeheuren Mehrzahl im Interesse der
ungeheuren Mehrzahl. Das Proletariat, die unterste Schicht der jetzigen
Gesellschaft, <a name="S473"><b>|473|</b></a> kann sich nicht erheben,
nicht aufrichten, ohne daß der ganze Überbau der Schichten, die die
offizielle Gesellschaft bilden, in die Luft gesprengt wird. [Warum soll unterste Schicht führen?]<br /></span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Obgleich nicht dem Inhalt, ist der Form nach der Kampf des
Proletariats gegen die Bourgeoisie zunächst ein nationaler. Das
Proletariat eines jeden Landes muß natürlich zuerst mit seiner eigenen
Bourgeoisie fertig werden.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Indem wir die allgemeinsten Phasen der Entwicklung des Proletariats
zeichneten, verfolgten wir den mehr oder minder versteckten Bürgerkrieg
innerhalb der bestehenden Gesellschaft bis zu dem Punkt, wo er in eine
offene Revolution ausbricht und durch den gewaltsamen Sturz der
Bourgeoisie das Proletariat seine Herrschaft begründet. </span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Alle bisherige Gesellschaft beruhte, wie wir gesehen haben, auf dem
Gegensatz unterdrückender und unterdrückter Klassen. Um aber eine Klasse
unterdrücken zu können, müssen ihr Bedingungen gesichert sein,
innerhalb derer sie wenigstens ihre knechtische Existenz fristen kann.
Der Leibeigene hat sich zum Mitglied der Kommune in der Leibeigenschaft
herangearbeitet wie der Kleinbürger zum Bourgeois unter dem Joch des
feudalistischen Absolutismus. Der moderne Arbeiter dagegen, statt sich
mit dem Fortschritt der Industrie zu heben, sinkt immer tiefer unter die
Bedingungen seiner eigenen Klasse herab. Der Arbeiter wird zum Pauper,
und der Pauperismus entwickelt sich noch schneller als Bevölkerung und Reichtum.[Dafür besteht kein Grund?]<br /></span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Es tritt hiermit offen hervor, daß die Bourgeoisie unfähig ist, noch
länger die herrschende Klasse der Gesellschaft zu bleiben und die
Lebensbedingungen ihrer Klasse der Gesellschaft als regelndes Gesetz
aufzuzwingen. Sie ist unfähig zu herrschen, weil sie unfähig ist, ihrem
Sklaven die Existenz selbst innerhalb seiner Sklaverei zu sichern, weil
sie gezwungen ist, ihn in eine Lage herabsinken zu lassen, wo sie ihn
ernähren muß, statt von ihm ernährt zu werden. Die Gesellschaft kann
nicht mehr unter ihr leben, d.h., ihr Leben ist nicht mehr verträglich
mit der Gesellschaft.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Die wesentliche Bedingung für die Existenz und für die Herrschaft der Bourgeoisklasse
ist die Anhäufung des Reichtums in den Händen von Privaten, die Bildung
und Vermehrung des Kapitals; die Bedingung des Kapitals ist die
Lohnarbeit. Die Lohnarbeit beruht ausschließlich auf der Konkurrenz der
Arbeiter unter sich. Der Fortschritt der Industrie, dessen willenloser
und widerstandsloser Träger die Bourgeoisie ist, setzt an die Stelle der
Isolierung der Arbeiter durch die Konkurrenz ihre revolutionäre
Vereini- <a name="S474"><b>|474|</b></a> gung durch die Assoziation. Mit
der Entwicklung der großen Industrie wird also unter den Füßen der
Bourgeoisie die Grundlage selbst hinweggezogen, worauf sie produziert und die Produkte sich aneignet. Sie produziert vor allem ihren eigenen Totengräber. Ihr Untergang und der Sieg des Proletariats sind gleich unvermeidlich. [Stimmt doch überhaupt nicht]<br /></span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><h3 align="CENTER"><span style="font-size: large;"><span style="font-family: arial;"><a name="Kap_II">II</a></span></span></h3><span style="font-size: large;"><span style="font-family: arial;"><a name="Kap_II">
<h3 align="CENTER">Proletarier und Kommunisten</h3>
</a></span></span><p><span style="font-size: large;"><span style="font-family: arial;">In welchem Verhältnis stehen die Kommunisten zu den Proletariern überhaupt? </span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Die Kommunisten sind keine besondere Partei gegenüber den andern Arbeiterparteien. </span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Sie haben keine von den Interessen des ganzen Proletariats getrennten Interessen. </span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Sie stellen keine besonderen Prinzipien auf, wonach sie die proletarische Bewegung modeln wollen.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Die Kommunisten unterscheiden sich von den übrigen proletarischen Parteien nur dadurch, daß sie einerseits in den verschiedenen nationalen Kämpfen der Proletarier die
gemeinsamen, von der Nationalität unabhängigen Interessen des gesamten
Proletariats hervorheben und zur Geltung bringen, andrerseits dadurch,
daß sie in den verschiedenen Entwicklungsstufen, welche der Kampf
zwischen Proletariat und Bourgeoisie durchläuft, stets das Interesse der
Gesamtbewegung vertreten. [Stimmt auch nicht]<br /></span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Die Kommunisten sind also praktisch der entschiedenste, immer
weitertreibende Teil der Arbeiterparteien aller Länder; sie haben
theoretisch vor der übrigen Masse des Proletariats die Einsicht in die
Bedingungen, den Gang und die allgemeinen Resultate der proletarischen
Bewegung voraus.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Der nächste Zweck der Kommunisten ist derselbe wie der aller übrigen
proletarischen Parteien: Bildung des Proletariats zur Klasse, Sturz der
Bourgeoisherrschaft, Eroberung der politischen Macht durch das
Proletariat. Die theoretischen Sätze der Kommunisten beruhen keineswegs
auf Ideen, auf Prinzipien, die von diesem oder jenem Weltverbesserer
erfunden oder entdeckt sind.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;"><b><a name="S475">|475|</a></b> Sie sind nur allgemeine
Ausdrücke tatsächlicher Verhältnisse eines existierenden Klassenkampfes,
einer unter unseren Augen vor sich gehenden geschichtlichen Bewegung.
Die Abschaffung bisheriger Eigentumsverhältnisse ist nichts den <a href="http://www.mlwerke.de/me/me04/me04_459.htm#T36">{36}</a> Kommunismus eigentümlich Bezeichnendes.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Alle Eigentumsverhältnisse waren einem beständigen geschichtlichen
Wandel, einer beständigen geschichtlichen Veränderung unterworfen. </span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Die Französische Revolution z.B. schaffte das Feudaleigentum zugunsten des bürgerlichen ab.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Was den Kommunismus auszeichnet, ist nicht die Abschaffung des
Eigentums überhaupt, sondern die Abschaffung des bürgerlichen Eigentums.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Aber das moderne bürgerliche Privateigentum ist der letzte und
vollendetste Ausdruck der Erzeugung und Aneignung der Produkte, die auf
Klassengegensätzen,<a href="http://www.mlwerke.de/me/me04/me04_459.htm#T37">{37}</a> auf der Ausbeutung der einen durch die andern beruht.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">In diesem Sinn können die Kommunisten ihre Theorie in dem einen Ausdruck: Aufhebung des Privateigentums, zusammenfassen.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Man hat uns Kommunisten vorgeworfen, wir wollten das persönlich
erworbene, selbsterarbeitete Eigentum abschaffen; das Eigentum, welches
die Grundlage aller persönlichen Freiheit, Tätigkeit und Selbständigkeit
bilde. [Ja, das habt ihr immer wieder getan]<br /></span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Erarbeitetes, erworbenes, selbstverdientes Eigentum! Sprecht ihr von
dem kleinbürgerlichen, kleinbäuerlichen Eigentum, welches dem
bürgerlichen Eigentum vorherging? Wir brauchen es nicht abzuschaffen,
die Entwicklung der Industrie hat es abgeschafft und schafft es täglich
ab.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Oder sprecht ihr vom modernen bürgerlichen Privateigentum?</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Schafft aber die Lohnarbeit, die Arbeit des Proletariers ihm
Eigentum? Keineswegs. Sie schafft das Kapital, d.h. das Eigentum,
welches die Lohnarbeit ausbeutet, welches sich nur unter der Bedingung
vermehren kann, daß es neue Lohnarbeit erzeugt, um sie von neuem
auszubeuten. Das Eigentum in seiner heutigen Gestalt bewegt sich in dem
Gegensatz von Kapital und Lohnarbeit. Betrachten wir die beiden Seiten
dieses Gegensatzes.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Kapitalist sein, heißt nicht nur eine rein persönliche, sondern eine
gesellschaftliche Stellung in der Produktion einzunehmen. Das Kapital
ist ein gemeinschaftliches Produkt und kann nur durch eine gemeinsame
Tätigkeit vieler Mitglieder, ja in letzter Instanz nur durch die
gemeinsame Tätigkeit aller Mitglieder der Gesellschaft in Bewegung
gesetzt werden. </span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;"><b><a name="S476">|476|</a></b> Das Kapital ist also keine persönliche, es ist eine gesellschaftliche Macht. </span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Wenn also das Kapital in ein gemeinschaftliches, allen Mitgliedern
der Gesellschaft angehöriges Eigentum verwandelt wird, so verwandelt
sich nicht persönliches Eigentum in gesellschaftliches. Nur der
gesellschaftliche Charakter des Eigentums verwandelt sich. Er verliert
seinen Klassencharakter.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Kommen wir zur Lohnarbeit:</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Der Durchschnittspreis der Lohnarbeit ist das Minimum des
Arbeitslohnes, d.h. die Summe der Lebensmittel, die notwendig sind, um
den Arbeiter als Arbeiter am Leben zu erhalten. Was also der
Lohnarbeiter durch seine Tätigkeit sich aneignet, reicht bloß dazu hin,
um sein nacktes Leben wieder zu erzeugen. Wir wollen diese persönliche
Aneignung der Arbeitsprodukte zur Wiedererzeugung des unmittelbaren
Lebens keineswegs abschaffen, eine Aneignung, die keinen Reinertrag
übrigläßt, der Macht über fremde Arbeit geben könnte. Wir wollen nur den
elenden Charakter dieser Aneignung aufheben, worin der Arbeiter nur
lebt, um das Kapital zu vermehren, nur so weit lebt, wie es das
Interesse der herrschenden Klasse erheischt.[Völlig falsch]<br /></span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">In der bürgerlichen Gesellschaft ist die lebendige Arbeit nur ein
Mittel, die aufgehäufte Arbeit zu vermehren. In der kommunistischen
Gesellschaft ist die aufgehäufte Arbeit nur ein Mittel, um den
Lebensprozeß der Arbeiter zu erweitern, zu bereichern, zu befördern.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">In der bürgerlichen Gesellschaft herrscht also die Vergangenheit über
die Gegenwart, in der kommunistischen die Gegenwart über die
Vergangenheit. In der bürgerlichen Gesellschaft ist das Kapital
selbständig und persönlich, während das tätige Individuum unselbständig
und unpersönlich ist.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Und die Aufhebung dieses Verhältnisses nennt die Bourgeoisie
Aufhebung der Persönlichkeit und Freiheit! Und mit Recht. Es handelt
sich allerdings um die Aufhebung der Bourgeois-Persönlichkeit,
-Selbständigkeit und -Freiheit.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Unter Freiheit versteht man innerhalb der jetzigen bürgerlichen
Produktionsverhältnisse den freien Handel, den freien Kauf und Verkauf.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Fällt aber der Schacher, so fällt auch der freie Schacher. Die
Redensarten vom freien Schacher, wie alle übrigen Freiheitsbravaden
unserer Bourgeoisie,
haben überhaupt nur einen Sinn gegenüber dem gebundenen Schacher,
gegenüber dem geknechteten Bürger des Mittelalters, nicht aber gegenüber
der kommunistischen Aufhebung des Schachers, der bürgerlichen
Produktionsverhältnisse und der Bourgeoisie selbst.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;"><b><a name="S477">|477|</a></b> Ihr entsetzt euch darüber, daß
wir das Privateigentum aufheben wollen. Aber in eurer bestehenden
Gesellschaft ist das Privateigentum für neun Zehntel ihrer Mitglieder
aufgehoben, es existiert gerade dadurch, daß es für neun Zehntel nicht
existiert. Ihr werft uns also vor, daß wir ein Eigentum aufheben wollen,
welches die Eigentumslosigkeit der ungeheuren Mehrzahl der Gesellschaft
als notwendige Bedingung voraussetzt.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Ihr werft uns mit einem Worte vor, daß wir euer Eigentum aufheben wollen. Allerdings, das wollen wir. </span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Von dem Augenblick an, wo die Arbeit nicht mehr in Kapital, Geld,
Grundrente, kurz, in eine monopolisierbare gesellschaftliche Macht
verwandelt werden kann, d.h. von dem Augenblick, wo das persönliche
Eigentum nicht mehr in bürgerliches umschlagen kann, von dem Augenblick
an erklärt ihr, die Person sei aufgehoben.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Ihr gesteht also, daß ihr unter der Person niemanden anders versteht
als den Bourgeois, den bürgerlichen Eigentümer. Und diese Person soll
allerdings aufgehoben werden.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Der Kommunismus nimmt keinem die Macht, sich gesellschaftliche
Produkte anzueignen, er nimmt nur die Macht, sich durch diese Aneignung
fremde Arbeit zu unterjochen.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Man hat eingewendet, mit der Aufhebung des Privateigentums werde alle
Tätigkeit aufhören, und eine allgemeine Faulheit einreißen.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Hiernach müßte die bürgerliche Gesellschaft längst an der Trägheit
zugrunde gegangen sein; denn die in ihr arbeiten, erwerben nicht, und
die in ihr erwerben, arbeiten nicht. [Völlig falsch] Das ganze Bedenken läuft auf die
Tautologie hinaus, daß es keine Lohnarbeit mehr gibt, sobald es kein
Kapital mehr gibt. [Quatsch!]<br /></span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Alle Einwürfe, die gegen die kommunistische Aneignungs- und
Produktionsweise der materiellen Produkte gerichtet werden, sind ebenso
auf die Aneignung und Produktion der geistigen Produkte ausgedehnt
worden. Wie für den Bourgeois das Aufhören des Klasseneigentums das
Aufhören der Produktion selbst ist, so ist für ihn das Aufhören der
Klassenbildung identisch mit dem Aufhören der Bildung überhaupt. </span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Die Bildung, deren Verlust er bedauert, ist für die enorme Mehrzahl die Heranbildung zur Maschine.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Aber streitet nicht mit uns, indem ihr an euren bürgerlichen
Vorstellungen von Freiheit, Bildung, Recht usw. die Abschaffung des
bürgerlichen Eigentums meßt. Eure Ideen selbst sind Erzeugnisse der
bürgerlichen Produktions- und Eigentumsverhältnisse, wie euer Recht nur
der zum Gesetz erhobene Wille eurer Klasse ist, ein Wille, dessen Inhalt
gegeben ist in den materiellen Lebensbedingungen eurer Klasse.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;"><b><a name="S478">|478|</a></b> Die interessierte Vorstellung,
worin ihr eure Produktions- und Eigentumsverhältnisse aus
geschichtlichen, in dem Lauf der Produktion vorübergehenden
Verhältnissen in ewige Natur- und Vernunftgesetze verwandelt, teilt ihr
mit allen untergegangenen herrschenden Klassen. Was ihr für das antike
Eigentum begreift, was ihr für das feudale Eigentum begreift, dürft ihr
nicht mehr begreifen für das bürgerliche Eigentum.-</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Aufhebung der Familie! Selbst die Radikalsten ereifern sich über diese schändliche Absicht der Kommunisten.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Worauf beruht die gegenwärtige, die bürgerliche Familie? Auf dem
Kapital, auf dem Privaterwerb. Vollständig entwickelt existiert sie nur
für die Bourgeoisie; aber sie findet ihre Ergänzung in der erzwungenen
Familienlosigkeit der Proletarier und der öffentlichen Prostitution.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Die Familie der Bourgeois fällt natürlich weg mit dem Wegfallen dieser ihrer Ergänzung,
und beide verschwinden mit dem Verschwinden des Kapitals.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Werft ihr uns vor, daß wir die Ausbeutung der Kinder durch ihre Eltern aufheben wollen? Wir gestehen dieses Verbrechen ein.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Aber, sagt ihr, wir heben die trautesten Verhältnisse auf, indem wir
an die Stelle der häuslichen Erziehung die gesellschaftliche setzen.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Und ist nicht auch eure Erziehung durch die Gesellschaft bestimmt? Durch die gesellschaftlichen Verhältnisse, innerhalb derer <a href="http://www.mlwerke.de/me/me04/me04_459.htm#T42">{42}</a>
ihr erzieht, durch die direktere oder indirektere Einmischung der
Gesellschaft, vermittelst der Schule usw.? Die Kommunisten erfinden
nicht die Einwirkung der Gesellschaft auf die Erziehung; sie verändern
nur ihren Charakter, sie entreißen die Erziehung dem Einfluß der
herrschenden Klasse.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Die bürgerlichen Redensarten über Familie und Erziehung, über das
traute Verhältnis von Eltern und Kindern werden um so ekelhafter, je
mehr infolge der großen Industrie alle Familienbande für die Proletarier
zerrissen und die Kinder in einfache Handelsartikel und
Arbeitsinstrumente verwandelt werden.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Aber ihr Kommunisten wollt die Weibergemeinschaft einführen, schreit uns die ganze Bourgeoisie im Chor entgegen.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Der Bourgeois sieht in seiner Frau ein bloßes Produktionsinstrument.
Er hört, daß die Produktionsinstrumente gemeinschaftlich ausgebeutet
werden sollen, und kann sich natürlich nichts anderes denken, als daß
das Los der Gemeinschaftlichkeit die Weiber gleichfalls treffen wird.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;"><b><a name="S479">|479|</a></b> Er ahnt nicht, daß es sich eben darum handelt, die Stellung der Weiber als bloßer Produktionsinstrumente aufzuheben.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Übrigens ist nichts lächerlicher als das hochmoralische Entsetzen
unserer Bourgeois über die angebliche offizielle Weibergemeinschaft der
Kommunisten. Die Kommunisten brauchen die Weibergemeinschaft nicht
einzuführen, sie hat fast immer existiert.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Unsre Bourgeois, nicht zufrieden damit, daß ihnen die Weiber und
Töchter ihrer Proletarier zur Verfügung stehen, von der offiziellen
Prostitution gar nicht zu sprechen, finden ein Hauptvergnügen darin,
ihre Ehefrauen wechselseitig zu verführen.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Die bürgerliche Ehe ist in Wirklichkeit die Gemeinschaft der
Ehefrauen. Man könnte höchstens den Kommunisten vorwerfen, daß sie an Stelle einer heuchlerisch versteckten eine offizielle, offenherzige Weibergemeinschaft einführen wollten.
Es versteht sich übrigens von selbst, daß mit Aufhebung der jetzigen
Produktionsverhältnisse auch die aus ihnen hervorgehende
Weibergemeinschaft, d.h. die offizielle und nichtoffizielle
Prostitution, verschwindet.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Den Kommunisten ist ferner vorgeworfen worden, sie wollten das
Vaterland, die Nationalität abschaffen. Die Arbeiter haben kein
Vaterland. Man kann ihnen nicht nehmen, was sie nicht haben. Indem das
Proletariat zunächst sich die politische Herrschaft erobern, sich zur
nationalen Klasse <a href="http://www.mlwerke.de/me/me04/me04_459.htm#T45">{45}</a> erheben, sich selbst als Nation konstituieren muß, ist es selbst noch national, wenn auch keineswegs im Sinne der Bourgeoisie.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Die nationalen Absonderungen und Gegensätze der Völker verschwinden
mehr und mehr schon mit der Entwicklung der Bourgeoisie, mit der
Handelsfreiheit, dem Weltmarkt, der Gleichförmigkeit der industriellen
Produktion und der ihr entsprechenden Lebensverhältnisse.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Die Herrschaft des Proletariats wird sie noch mehr verschwinden
machen. Vereinigte Aktion, wenigstens der zivilisierten Länder, ist eine
der ersten Bedingungen seiner Befreiung.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">In dem Maße, wie die Exploitation des einen Individuums durch das
andere aufgehoben wird, wird die Exploitation einer Nation durch die
andere aufgehoben. Mit dem Gegensatz der Klassen im Innern der Nation <a href="http://www.mlwerke.de/me/me04/me04_459.htm#T46">{46}</a> fällt die feindliche Stellung der Nationen gegeneinander.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;"><b><a name="S480">|480|</a></b> Die Anklagen gegen den
Kommunismus, die von religiösen, philosophischen und ideologischen
Gesichtspunkten überhaupt erhoben werden, verdienen keine ausführlichere
Erörterung.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Bedarf es tiefer Einsicht, um zu begreifen, daß mit den
Lebensverhältnissen der Menschen, mit ihren gesellschaftlichen
Beziehungen, mit ihrem gesellschaftlichen Dasein, auch ihre
Vorstellungen, Anschauungen und Begriffe, mit einem Worte auch ihr
Bewußtsein sich ändert? </span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Was beweist die Geschichte der Ideen anders, als daß die geistige
Produktion sich mit der materiellen umgestaltet? Die herrschenden Ideen
einer Zeit waren stets nur die Ideen der herrschenden Klasse.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Man spricht von Ideen, welche eine ganze Gesellschaft
revolutionieren; man spricht damit nur die Tatsache aus, daß sich
innerhalb der alten Gesellschaft die Elemente einer neuen gebildet
haben, daß mit der Auflösung der alten Lebensverhältnisse die Auflösung
der alten Ideen gleichen Schritt hält.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Als die alte Welt im Untergehen begriffen war, wurden die alten
Religionen von der christlichen Religion besiegt. Als die christlichen
Ideen im 18. Jahrhundert den Aufklärungsideen unterlagen, rang die
feudale Gesellschaft ihren Todeskampf mit der damals revolutionären
Bourgeoisie. Die Ideen der Gewissens- und Religionsfreiheit sprachen nur
die Herrschaft der freien Konkurrenz auf dem Gebiete des Wissens <a href="http://www.mlwerke.de/me/me04/me04_459.htm#T47">{47}</a> aus.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">"Aber", wird man sagen, "religiöse, moralische, philosophische,
politische, rechtliche Ideen usw. modifizieren sich allerdings im Lauf
der geschichtlichen Entwicklung. Die Religion, die Moral, die
Philosophie, die Politik, das Recht erhielten sich stets in diesem
Wechsel. Es gibt zudem ewige Wahrheiten, wie Freiheit, Gerechtigkeit
usw., die allen gesellschaftlichen Zuständen gemeinsam sind. Der
Kommunismus aber schafft die ewigen Wahrheiten ab, er schafft die
Religion ab, die Moral, statt sie neu zu gestalten, er widerspricht also
allen bisherigen geschichtlichen Entwicklungen."</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Worauf reduziert sich diese Anklage? Die Geschichte der ganzen
bisherigen Gesellschaft bewegte sich in Klassengegensätzen, die in den
verschiedensten Epochen verschieden gestaltet waren. Welche Form sie
aber auch immer angenommen, die Ausbeutung des einen Teils der
Gesellschaft durch den andern ist eine allen vergangenen Jahrhunderten
gemeinsame Tatsache. Kein Wunder daher, daß das gesellschaftliche
Bewußtsein aller Jahrhunderte, aller Mannigfaltigkeit und
Verschiedenheit zum Trotz, in gewissen gemeinsamen Formen sich bewegt, <a name="S481"><b>|481|</b></a> in <a href="http://www.mlwerke.de/me/me04/me04_459.htm#T48">{48}</a> Bewußtseinsformen, die nur mit dem gänzlichen Verschwinden des Klassengegensatzes sich vollständig auflösen.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Die kommunistische Revolution ist das radikalste Brechen mit den
überlieferten Eigentumsverhältnissen; kein Wunder, daß in ihrem
Entwicklungsgange am radikalsten mit den überlieferten Ideen gebrochen
wird.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Doch lassen wir die Einwürfe der Bourgeoisie gegen den Kommunismus. </span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Wir sahen schon oben, daß der erste Schritt in der Arbeiterrevolution
die Erhebung des Proletariats zur herrschenden Klasse, die Erkämpfung
der Demokratie ist.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Das Proletariat wird seine politische Herrschaft dazu benutzen, der
Bourgeoisie nach und nach alles Kapital zu entreißen, alle
Produktionsinstrumente in den Händen des Staats, d.h. des als
herrschende Klasse organisierten Proletariats, zu zentralisieren und die
Masse der Produktionskräfte möglichst rasch zu vermehren.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Es kann dies natürlich zunächst nur geschehen vermittelst
despotischer Eingriffe in das Eigentumsrecht und in die bürgerlichen
Produktionsverhältnisse, durch Maßregeln also, die ökonomisch
unzureichend und unhaltbar erscheinen, die aber im Lauf der Bewegung
über sich selbst hinaustreiben und als Mittel zur Umwälzung der ganzen
Produktionsweise unvermeidlich sind.[Solche Experimente gab es mehr als genug]<br /></span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Diese Maßregeln werden natürlich je nach den verschiedenen Ländern verschieden sein.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Für die fortgeschrittensten Länder werden jedoch die folgenden ziemlich allgemein in Anwendung kommen können:</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">1. Expropriation des Grundeigentums und Verwendung der Grundrente zu Staatsausgaben.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">2. Starke Progressivsteuer.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">3. Abschaffung des Erbrechts.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">4. Konfiskation des Eigentums aller Emigranten und Rebellen.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">5. Zentralisation des Kredits in den Händen des Staats durch eine Nationalbank mit Staatskapital und ausschließlichem Monopol.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">6. Zentralisation des <a href="http://www.mlwerke.de/me/me04/me04_459.htm#T49">{49}</a> Transportwesens in den Händen des Staats.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">7. Vermehrung der Nationalfabriken, Produktionsinstrumente,
Urbarmachung und Verbesserung aller Ländereien nach einem
gemeinschaftlichen Plan.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">8. Gleicher Arbeitszwang für alle, Errichtung industrieller Armeen, besonders für den Ackerbau.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">9. Vereinigung des Betriebs von Ackerbau und Industrie, Hinwirken auf die allmähliche Beseitigung des Unterschieds von Stadt und Land.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;"><b><a name="S482">|482|</a></b> 10. Öffentliche und
unentgeltliche Erziehung aller Kinder. Beseitigung der Fabrikarbeit der
Kinder in ihrer heutigen Form. Vereinigung der Erziehung mit der
materiellen Produktion usw.</span></span> </p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Sind im Laufe der Entwicklung die Klassenunterschiede verschwunden
und ist alle Produktion in den Händen der assoziierten Individuen
konzentriert, so verliert die öffentliche Gewalt den politischen
Charakter. Die politische Gewalt im eigentlichen Sinne ist die
organisierte Gewalt einer Klasse zur Unterdrückung einer andern. Wenn
das Proletariat im Kampfe gegen die Bourgeoisie sich notwendig zur
Klasse vereint, durch eine Revolution sich zur herrschenden Klasse macht
und als herrschende Klasse gewaltsam die alten Produktionsverhältnisse
aufhebt, so hebt es mit diesen Produktionsverhältnissen die
Existenzbedingungen des Klassengegensatzes, die <a href="http://www.mlwerke.de/me/me04/me04_459.htm#T52">{52}</a> Klassen überhaupt, und damit seine eigene Herrschaft als Klasse auf.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">An die Stelle der alten bürgerlichen Gesellschaft mit ihren Klassen
und Klassengegensätzen tritt eine Assoziation, worin die freie
Entwicklung eines jeden die Bedingung für die freie Entwicklung aller
ist. [Lang lebe das Bürgertum - die Bourgoisie!]<br /></span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><h3 align="CENTER"><span style="font-size: large;"><span style="font-family: arial;"><a name="Kap_III">III</a></span></span></h3><span style="font-size: large;"><span style="font-family: arial;"><a name="Kap_III">
<h3 align="CENTER">Sozialistische und kommunistische Literatur</h3>
</a></span></span><h4 align="CENTER"><span style="font-size: large;"><span style="font-family: arial;">1. Der reaktionäre Sozialismus</span></span></h4><span style="font-size: large;"><span style="font-family: arial;">
</span></span><h5 align="CENTER"><span style="font-size: large;"><span style="font-family: arial;">a) Der feudale Sozialismus</span></span></h5><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Die französische und englische Aristokratie war ihrer geschichtlichen
Stellung nach dazu berufen, Pamphlete gegen die moderne bürgerliche
Gesellschaft zu schreiben. In der französischen Junirevolution von 1830,
in der englischen Reformbewegung war sie noch einmal dem verhaßten
Emporkömmling erlegen. Von einem ernsten politischen Kampfe konnte nicht
mehr die Rede sein. Nur der literarische Kampf blieb ihr übrig. Aber
auch auf dem Gebiete der Literatur waren die alten Redensarten der
Restaurationszeit <a href="http://www.mlwerke.de/me/me04/me04_459.htm#F4">(4)</a> unmöglich geworden. Um Sympathie zu erregen, mußte die Aristokratie scheinbar ihre Interessen aus dem Auge <a href="http://www.mlwerke.de/me/me04/me04_459.htm#T53">{53}</a> verlieren und nur <a href="http://www.mlwerke.de/me/me04/me04_459.htm#T54">{54}</a> im Interesse der exploitierten Arbeiterklasse ihren Anklageakt gegen die Bourgeoisie formu- <a name="S483"><b>|483|</b></a>
lieren. Sie bereitete so die Genugtuung vor, Schmählieder auf ihren
neuen Herrscher zu singen und mehr oder minder unheilschwangere
Prophezeiungen ihm ins Ohr raunen zu dürfen.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Auf diese Art entstand der feudalistische Sozialismus, halb
Klagelied, halb Pasquill, halb Rückhall der Vergangenheit, halb Dräuen
der Zukunft, mitunter die Bourgeoisie ins Herz treffend durch bitteres,
geistreich zerreißendes Urteil, stets komisch wirkend durch gänzliche
Unfähigkeit, den Gang der modernen Geschichte zu begreifen.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Den proletarischen Bettelsack <a href="http://www.mlwerke.de/me/me04/me04_459.htm#T55">{55}</a>
schwenkten sie als Fahne in der Hand, um das Volk hinter sich her zu
versammeln. Sooft es ihnen aber folgte, erblickte es auf ihrem Hintern
die alten feudalen Wappen und verlief sich mit lautem und
unehrerbietigem Gelächter.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Ein Teil der französischen Legitimisten und das Junge England gaben dies Schauspiel zum besten.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Wenn die Feudalen beweisen, daß ihre Weise der Ausbeutung anders
gestaltet war als die bürgerliche Ausbeutung, so vergessen sie nur, daß
sie unter gänzlich verschiedenen und jetzt überlebten Umständen und
Bedingungen ausbeuteten. Wenn sie nachweisen, daß unter ihrer Herrschaft
nicht das moderne Proletariat existiert hat, so vergessen sie nur, daß
eben die moderne Bourgeoisie ein notwendiger Sprößling ihrer
Gesellschaftsordnung war.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Übrigens verheimlichen sie den reaktionären Charakter ihrer Kritik so
wenig, daß ihre Hauptanklage gegen die Bourgeoisie eben darin besteht,
unter ihrem Regime entwickle sich eine Klasse, welche die ganze alte
Gesellschaftsordnung in die Luft sprengen werde.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Sie werfen der Bourgeoisie mehr noch vor, daß sie ein revolutionäres Proletariat, als daß sie überhaupt ein Proletariat erzeugt.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">In der politischen Praxis nehmen sie daher an allen Gewaltmaßregeln
gegen die Arbeiterklasse teil, und im gewöhnlichen Leben bequemen sie
sich, allen ihren aufgeblähten Redensarten zum Trotz die goldnen Äpfel <a href="http://www.mlwerke.de/me/me04/me04_459.htm#T56">{56}</a> aufzulesen und Treue, Liebe, Ehre mit dem Schacher in Schafswolle, Runkelrüben und Schnaps zu vertauschen <a href="http://www.mlwerke.de/me/me04/me04_459.htm#F5">(5)</a>.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Wie der Pfaffe immer Hand in Hand ging mit dem Feudalen, so der pfäffische Sozialismus mit dem feudalistischen. </span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;"><b><a name="S484">|484|</a></b> Nichts leichter, als dem
christlichen Asketismus einen sozialistischen Anstrich zu geben. Hat das
Christentum nicht auch gegen das Privateigentum, gegen die Ehe, gegen
die Staat geeifert? Hat es nicht die Wohltätigkeit und den Bettel, das
Zölibat und die Fleischesertötung, das Zellenleben und die Kirche an
ihrer Stelle gepredigt? Der christliche Sozialismus ist nur das Weihwasser, womit der Pfaffe den Ärger des Aristokraten einsegnet.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><h5 align="CENTER"><span style="font-size: large;"><span style="font-family: arial;"><a name="Kap_III_1_b">b) Kleinbürgerlicher Sozialismus</a></span></span></h5><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Die feudale Aristokratie ist nicht die einzige Klasse, welche durch
die Bourgeoisie gestürzt wurde, deren Lebensbedingungen in der modernen
bürgerlichen Gesellschaft verkümmerten und abstarben. Das
mittelalterliche Pfahlbürgertum und der kleine Bauernstand waren die
Vorläufer der modernen Bourgeoisie. In den weniger industriell und
kommerziell entwickelten Ländern vegetiert diese Klasse noch fort neben
der aufkommenden Bourgeoisie.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">In den Ländern, wo sich die moderne Zivilisation entwickelt hat, hat
sich eine neue Kleinbürgerschaft gebildet, die zwischen dem Proletariat
und der Bourgeoisie schwebt und als ergänzender Teil der bürgerlichen
Gesellschaft stets von neuem sich bildet, deren Mitglieder aber
beständig durch die Konkurrenz ins Proletariat hinabgeschleudert werden,
ja selbst mit der Entwicklung der großen Industrie einen Zeitpunkt
herannahen sehen, wo sie als selbständiger Teil der modernen
Gesellschaft gänzlich verschwinden und im Handel, in der Manufaktur, in
der Agrikultur durch Arbeitsaufseher und Domestiken ersetzt werden.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">In Ländern wie Frankreich, wo die Bauernklasse weit mehr als die
Hälfte der Bevölkerung ausmacht, war es natürlich, daß Schriftsteller,
die für das Proletariat gegen die Bourgeoisie auftraten, an ihre Kritik
des Bourgeoisregimes den kleinbürgerlichen und kleinbäuerlichen Maßstab
anlegten und die Partei der Arbeiter vom Standpunkt des Kleinbürgertums
ergriffen. Es bildete sich so der kleinbürgerliche Sozialismus. Sismondi
ist das Haupt dieser Literatur nicht nur für Frankreich, sondern auch
für England.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Dieser Sozialismus zergliederte höchst scharfsinnig die Widersprüche
in den modernen Produktionsverhältnissen. Er enthüllte die
gleisnerischen <a name="S485"><b>|485|</b></a> Beschönigungen der
Ökonomen. Er wies unwiderleglich die zerstörenden Wirkungen der
Maschinerie und der Teilung der Arbeit nach, die Konzentration der
Kapitalien und des Grundbesitzes, die Überproduktion, die Krisen, den
notwendigen Untergang der kleinen Bürger und Bauern, das Elend des
Proletariats, die Anarchie in der Produktion, die schreienden
Mißverhältnisse in der Verteilung des Reichtums, den industriellen
Vernichtungskrieg der Nationen untereinander, die Auflösung der alten
Sitten, der alten Familienverhältnisse, der alten Nationalitäten.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Seinem posititiven Gehalte nach will jedoch dieser Sozialismus
entweder die alten Produktions- und Verkehrsmittel wiederherstellen und
mit ihnen die alten Eigentumsverhältnisse und die alte Gesellschaft,
oder er will die modernen Produktions- und Verkehrsmittel in den Rahmen
der alten Eigentumsverhältnisse, die von ihnen gesprengt wurden,
gesprengt werden mußten, gewaltsam wieder einsperren. In beiden Fällen
ist er reaktionär und utopisch zugleich. Zunftwesen in der Manufaktur
und patriarchalische Wirtschaft auf dem Lande, das sind seine letzten
Worte.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">In ihrer weiteren Entwicklung hat sich diese Richtung in einen feigen Katzenjammer verlaufen.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><h5 align="CENTER"><span style="font-size: large;"><span style="font-family: arial;"><a name="Kap_III_1_c">c) Der deutsche oder "wahre" Sozialismus</a></span></span></h5><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Die sozialistische und kommunistische Literatur Frankreichs, die
unter dem Druck einer herrschenden Bourgeoisie entstand und der
literarische Ausdruck des Kampfes gegen diese Herrschaft ist, wurde nach
Deutschland eingeführt zu einer Zeit, wo die Bourgeoisie soeben ihren
Kampf gegen den feudalen Absolutismus begann.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Deutsche Philosophen, Halbphilosophen und Schöngeister bemächtigten
sich gierig dieser Literatur und vergaßen nur, daß bei der Einwanderung
jener Schriften aus Frankreich die französischen Lebensverhältnisse
nicht gleichzeitig nach Deutschland eingewandert waren. Den deutschen
Verhältnissen gegenüber verlor die französische Literatur alle
unmittelbar praktische Bedeutung und nahm ein rein literarisches
Aussehen an. Als müßige Spekulation <a href="http://www.mlwerke.de/me/me04/me04_459.htm#T60">{60}</a>
über die Verwirklichung des menschlichen Wesens mußte sie erscheinen.
So hatten für die deutschen Philosophen des 18. Jahrhunderts <a name="S486"><b>|486|</b></a>
die Forderungen der ersten französischen Revolution nur den Sinn,
Forderungen der "praktischen Vernunft" im allgemeinen zu sein, und die
Willensäußerungen der französischen Bourgeoisie bedeuteten in ihren
Augen die Gesetze des reinen Willens, des Willens, wie er sein muß, des
wahrhaft menschlichen Willens. </span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Die ausschließliche Arbeit der deutschen Literaten bestand darin, die
neuen französischen Ideen mit ihrem alten philosophischen Gewissen in
Einklang zu setzen oder vielmehr von ihrem philosophischen Standpunkte
aus die französischen Ideen sich anzueignen. </span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Diese Aneignung geschah in derselben Weise, wodurch man sich überhaupt eine fremde Sache aneignet, durch die Übersetzung. </span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Es ist bekannt, wie die Mönche Manuskripte, worauf die klassischen
Werke der alten Heidenzeit verzeichnet waren, mit abgeschmackten
katholischen Heiligengeschichten überschrieben. Die deutschen Literaten
gingen umgekehrt mit der profanen französischen Literatur um. Sie
schrieben ihren philosophischen Unsinn hinter das französische Original.
Z.B. hinter die französische Kritik der Geldverhältnisse schrieben sie
"Entäußerung des menschlichen Wesens", hinter die französische Kritik
des Bourgeoisstaates schrieben sie "Aufhebung der Herrschaft des
abstrakten Allgemeinen" usw.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Die Unterschiebung dieser
philosophischen Redensarten unter die französischen Entwicklungen
tauften sie "Philosophie der Tat", "wahrer Sozialismus", "deutsche
Wissenschaft des Sozialismus", usw.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Die französische sozialistisch-kommunistische Literatur wurde so
förmlich entmannt. Und da sie in der Hand des Deutschen aufhörte, den
Kampf einer Klasse gegen die andre auszudrücken, so war der Deutsche
sich bewußt, die "französische Einseitigkeit" überwunden, statt wahrer
Bedürfnisse das Bedürfnis der Wahrheit und statt der Interessen des
Proletariers die Interessen des menschlichen Wesens, des Menschen
überhaupt vertreten zu haben, des Menschen, der keiner Klasse, der
überhaupt nicht der Wirklichkeit, der nur dem Dunsthimmel der
philosophischen Phantasie angehört.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Dieser deutsche Sozialismus, der seine unbeholfenen Schulübungen so
ernst und feierlich nahm und so marktschreierisch ausposaunte, verlor
indes nach und nach seine pedantische Unschuld. </span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Der Kampf der deutschen, namentlich der preußischen Bourgeoisie gegen
die Feudalen und das absolute Königtum, mit einem Wort, die liberale
Bewegung wurde ernsthafter.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;"><b><a name="S487">|487|</a></b> Dem "wahren" Sozialismus war
so erwünschte Gelegenheit geboten, der politischen Bewegung die
sozialistische Forderung gegenüberzustellen, die überlieferten Anatheme
gegen den Liberalismus, gegen den Repräsentativstaat, gegen die
bürgerliche Konkurrenz, bürgerliche Preßfreiheit, bürgerliches Recht,
bürgerliche Freiheit und Gleichheit zu schleudern und der Volksmasse
vorzupredigen, wie sie bei dieser bürgerlichen Bewegung nichts zu
gewinnen, vielmehr alles zu verlieren habe. Der deutsche Sozialismus
vergaß rechtzeitig, daß die französische Kritik, deren geistloses Echo
er war, die moderne bürgerliche Gesellschaft mit den entsprechenden
materiellen Lebensbedingungen und der angemessenen politischen
Konstitution vorausgesetzt <a href="http://www.mlwerke.de/me/me04/me04_459.htm#T63">{63}</a>, lauter Voraussetzungen, um deren Erkämpfung es sich erst in Deutschland handelte.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Er diente den deutschen absoluten Regierungen mit ihrem Gefolge von
Pfaffen, Schulmeistern, Krautjunkern und Bürokraten als erwünschte
Vogelscheuche gegen die drohend aufstrebende Bourgeoisie.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Er bildete die süßliche Ergänzung zu den bitteren Peitschenhieben und
Flintenkugeln, womit dieselben Regierungen die deutschen
Arbeiteraufstände bearbeiteten.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Ward der "wahre" Sozialismus dergestalt eine Waffe in der Hand der
Regierungen gegen die deutsche Bourgeoisie, so vertrat er auch
unmittelbar ein reaktionäres Interesse, das Interesse der deutschen
Pfahlbürgerschaft <a href="http://www.mlwerke.de/me/me04/me04_459.htm#T64">{64}</a>.
In Deutschland bildet das vom 16. Jahrhundert her überlieferte und seit
der Zeit in verschiedener Form hier immer neu wieder auftauchende
Kleinbürgertum die eigentliche Grundlage der bestehenden Zustände.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Seine Erhaltung ist die Erhaltung der bestehenden deutschen Zustände.
Von der industriellen und politischen Herrschaft der Bourgeoisie
fürchtet es den sichern Untergang, einerseits infolge der Konzentration
des Kapitals, andrerseits durch das Aufkommen eines revolutionären
Proletariats. Der "wahre" Sozialismus schien ihm beide Fliegen mit einer
Klappe zu schlagen. Er verbreitete sich wie eine Epidemie.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Das Gewand, gewirkt aus spekulativem Spinnweb, überstickt mit
schöngeistigen Redeblumen, durchtränkt von liebesschwülem Gemütstau,
dies überschwengliche Gewand, worin die deutschen Sozialisten ihre paar
knöchernen "ewigen Wahrheiten" einhüllten, vermehrte nur den Absatz
ihrer Ware bei diesem Publikum. </span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Seinerseits erkannte der deutsche Sozialismus immer mehr seinen
Beruf, der hochtrabende Vertreter dieser Pfahlbürgerschaft zu sein. </span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;"><b><a name="S488">|488|</a></b> Er proklamierte die deutsche Nation als die normale Nation und den deutschen Spießbürger <a href="http://www.mlwerke.de/me/me04/me04_459.htm#T65">{65}</a>
als den Normalmenschen. Er gab jeder Niederträchtigkeit desselben einen
verborgenen, höheren, sozialistischen Sinn, worin sie ihr Gegenteil
bedeutete. Er zog die letzte Konsequenz, indem er direkt gegen die
"rohdestruktive" Richtung des Kommunismus auftrat und seine
unparteiische Erhabenheit über alle Klassenkämpfe verkündete. Mit sehr
wenigen Ausnahmen gehört alles, was in Deutschland von angeblich
sozialistischen und kommunistischen Schriften zirkuliert, in den Bereich
dieser schmutzigen, entnervenden Literatur <a href="http://www.mlwerke.de/me/me04/me04_459.htm#F6">(6)</a>.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><h4 align="CENTER"><span style="font-size: large;"><span style="font-family: arial;"><a name="Kap_III_2">2. Der konservative oder Bourgeoissozialismus</a></span></span></h4><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Ein Teil der Bourgeoisie wünscht den sozialen Mißständen abzuhelfen, um den Bestand der bürgerlichen Gesellschaft zu sichern. </span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Es gehören hierher: Ökonomisten, Philantrophen, Humanitäre,
Verbesserer der Lage der arbeitenden Klassen,
Wohltätigkeitsorganisierer, Abschaffer der Tierquälerei,
Mäßigkeitsvereinsstifter, Winkelreformer der buntscheckigsten Art. Und
auch zu ganzen Systemen ist dieser Bourgeoissozialismus ausgearbeitet
worden. </span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Als Beispiel führen wir Proudhons "Philosophie de la misère" an.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Die sozialistischen Bourgeois wollen die Lebensbedingungen der
modernen Gesellschaft ohne die notwendig daraus hervor gehenden Kämpfe
und Gefahren. Sie wollen die bestehende Gesellschaft mit Abzug der sie
revolutionierenden und sie auflösenden Elemente. Sie wollen die
Bourgeoisie ohne das Proletariat. Die Bourgeoisie stellt sich die Welt,
worin sie herrscht, natürlich als die beste Welt vor. Der
Bourgeoissozialismus arbeitet diese tröstliche Vorstellung zu einem
halben oder ganzen System aus. Wenn er das Proletariat auffordert, seine
Systeme zu verwirklichen und <a href="http://www.mlwerke.de/me/me04/me04_459.htm#T66">{66}</a>
in das neue Jerusalem einzugehen, so verlangt er im Grunde nur, daß es
in der jetzigen Gesellschaft stehenbleibe, aber seine gehässigen
Vorstellungen von derselben abstreife.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;"><b><a name="S489">|489|</a></b> Eine zweite, weniger systematische, nur
mehr praktische Form dieses Sozialismus suchte der Arbeiterklasse jede
revolutionäre Bewegung zu verleiden, durch den Nachweis, wie nicht diese
oder jene politische Veränderung, sondern nur eine Veränderung der
materiellen Lebensverhältnisse, der ökonomischen Verhältnisse ihr von
Nutzen sein könne. Unter Veränderung der materiellen Lebensverhältnisse
versteht dieser Sozialismus aber keineswegs Abschaffung der bürgerlichen
Produktionsverhältnisse, die nur auf revolutionärem Wege möglich ist,
sondern administrative Verbesserungen, die auf dem Boden dieser
Produktionsverhältnisse vor sich gehen, also an dem Verhältnis von
Kapital und Lohnarbeit nichts ändern, sondern im besten Fall der
Bourgeoisie die Kosten ihrer Herrschaft vermindern und ihren
Staatshaushalt vereinfachen.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Seinen entsprechenden Ausdruck erreicht der Bourgeoisiesozialismus erst da, wo er zur bloßen rednerischen Figur wird.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Freier Handel! im Interesse der arbeitenden Klasse; Schutzzölle! im
Interesse der arbeitenden Klasse; Zellengefängnisse! im Interesse der
arbeitenden Klasse; das ist das letzte, das einzige ernstgemeinte Wort
des Bourgeoisiesozialismus.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Der Sozialismus der Bourgeoisie besteht eben in der Behauptung, daß die Bourgeois Bourgeois sind - im Interesse der arbeitenden Klasse.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><h4 align="CENTER"><span style="font-size: large;"><span style="font-family: arial;"><a name="Kap_III_3">3. Der kritisch-utopistische Sozialismus oder Kommunismus</a></span></span></h4><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Wir reden hier nicht von der Literatur, die in allen großen modernen
Revolutionen die Forderungen des Proletariats aussprach. (Schriften
Babeufs etc.)</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Die ersten Versuche des Proletariats, in einer Zeit allgemeiner
Aufregung, in der Periode des Umsturzes der feudalen Gesellschaft direkt
sein eigenes Klasseninteresse durchzusetzen, scheiterten notwendig an
der unentwickelten Gestalt des Proletariats selbst wie an dem Mangel der
materiellen Bedingungen seiner Befreiung, die eben erst das Produkt der
bürgerliche Epoche sind. Die revolutionäre Literatur, welche diese
ersten Bewegungen des Proletariats begleitete, ist dem Inhalt nach
notwendig reaktionär. Sie lehrt einen allgemeinen Asketismus und eine
rohe Gleichmacherei.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Die eigentlich sozialistischen und kommunistischen Systeme, die
Systeme St.-Simons, Fouriers, Owens usw., tauchen auf in der ersten,
unentwickelten <a name="S490"><b>|490|</b></a> Periode des Kampfes zwischen Proletariat und Bourgeoisie, die wir oben dargestellt haben. (Siehe Bourgeoisie und Proletariat.)</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Die Erfinder dieser Systeme sehen zwar den Gegensatz der Klassen wie
die Wirksamkeit der auflösenden Elemente in der herrschenden
Gesellschaft selbst. Aber sie erblicken auf der Seite des Proletariats
keine geschichtliche Selbsttätigkeit, keine ihm eigentümliche politische
Bewegung.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Da die Entwicklung des Klassengegensatzes gleichen Schritt hält mit
der Entwicklung der Industrie, finden sie ebensowenig die materiellen
Bedingungen zur Befreiung des Proletariats vor und suchen nach einer
sozialen Wissenschaft, nach sozialen Gesetzen, um diese Bedingungen zu
schaffen. </span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">An die Stelle der gesellschaftlichen Tätigkeit muß ihre persönlich
erfinderische Tätigkeit treten, an die Stelle der geschichtlichen
Bedingungen der Befreiung phantastische, an die Stelle der allmählich
vor sich gehenden Organisation des Proletariats zur Klasse eine eigens
ausgeheckte Organisation der Gesellschaft. Die kommende Weltgeschichte
löst sich für sie auf in die Propaganda und die praktische Ausführung
ihrer Gesellschaftspläne. </span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Sie sind sich zwar bewußt, in ihren Plänen hauptsächlich das
Interesse der arbeitenden Klasse als der leidendsten Klasse zu
vertreten. Nur unter diesem Gesichtspunkt der leidendsten Klasse
existiert das Proletariat für sie.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Die unentwickelte Form des Klassenkampfes wie ihre eigene Lebenslage
bringen es aber mit sich, daß sie weit über jenen Klassengegensatz
erhaben zu sein glauben. Sie wollen die Lebenslage aller
Gesellschaftsglieder, auch der bestgestellten, verbessern. Sie
appellieren daher fortwährend an die ganze Gesellschaft ohne
Unterschied, ja vorzugsweise an die herrschende Klasse. Man braucht ihr
System ja nur zu verstehen, um es als den bestmöglichen Plan der
bestmöglichen Gesellschaft anzuerkennen.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Sie verwerfen daher alle politische, namentlich alle revolutionäre
Aktion, sie wollen ihr Ziel auf friedlichem Wege erreichen und
versuchen, durch kleine, natürlich fehlschlagende Experimente, durch die
Macht des Beispiels dem neuen gesellschaftlichen Evangelium Bahn zu
brechen.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Die phantastische Schilderung der zukünftigen Gesellschaft entspringt
in einer Zeit, wo das Proletariat noch höchst unentwickelt ist, also
selbst noch phantastisch seine eigene Stellung auffaßt, seinem ersten
ahnungsvollen Drängen nach einer allgemeinen Umgestaltung der
Gesellschaft.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Die sozial[istisch}en und kommunistischen Schriften bestehen aber
auch aus kritischen Elementen. Sie greifen alle Grundlagen der
bestehenden Gesellschaft an. Sie haben daher höchst wertvolles Material
zur Aufklärung der <a name="S491"><b>|491|</b></a> Arbeiter geliefert. Ihre positiven Sätze über die zukünftige Gesellschaft, z.B. Aufhebung des Gegensatzes zwischen
Stadt und Land, der Familie, des Privaterwerbs, der Lohnarbeit, die
Verkündigung der gesellschaftlichen Harmonie, die Verwandlung des
Staates in eine bloße Verwaltung der Produktion - alle diese ihre Sätze
drücken bloß das Wegfallen des Klassengegensatzes aus, der eben erst
sich zu entwickeln beginnt, den sie nur noch in seiner ersten
gestaltlosen Unbestimmtheit kennen. Diese Sätze selbst haben daher noch
einen rein utopistischen Sinn.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Die Bedeutung des kritisch-utopistischen Sozialismus oder Kommunismus
steht im umgekehrten Verhältnis zur geschichtlichen Entwicklung. In
demselben Maße, worin der Klassenkampf sich entwickelt und gestaltet,
verliert diese phantastische Erhebung über denselben, diese
phantastische Bekämpfung desselben allen praktischen Wert, alle
theoretische Berechtigung. Waren daher die Urheber dieser Systeme auch
in vieler Beziehung revolutionär, so bilden ihre Schüler jedesmal
reaktionäre Sekten. Sie halten die alten Anschauungen der Meister fest
gegenüber der geschichtlichen Fortentwicklung des Proletariats. Sie
suchen daher konsequent den Klassenkampf wieder abzustumpfen und die
Gegensätze zu vermitteln. Sie träumen noch immer die versuchsweise
Verwirklichung ihrer gesellschaftlichen Utopien, Stiftung einzelner
Phalanstere, Gründung von Home-Kolonien, Errichtung eines kleinen
Ikariens
- Duodezausgabe des neuen Jerusalems -, und zum Aufbau aller dieser
spanischen Schlösser müssen sie an die Philanthropie der bürgerlichen
Herzen und Geldsäcke appellieren. Allmählich fallen sie in die Kategorie
der oben geschilderten reaktionären oder konservativen Sozialisten und
unterscheiden sich nur noch von ihnen durch mehr systematische Pedanterie, durch den fanatischen
Aberglauben an die Wunderwirkungen ihrer sozialen Wissenschaft. </span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Sie treten daher mit Erbitterung aller politischen Bewegung der
Arbeiter entgegen, die nur aus blindem Unglauben an das neue Evangelium
hervorgehen konnte.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;"><b><a name="S492">|492|</a></b> Die Owenisten in England, die Fourieristen in Frankreich reagieren dort gegen die Chartisten, hier gegen die Reformisten.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><h3 align="CENTER"><span style="font-size: large;"><span style="font-family: arial;"> </span></span></h3><h3 align="CENTER"><span style="font-size: large;"><span style="font-family: arial;"><a name="Kap_IV">IV</a></span></span></h3><span style="font-size: large;"><span style="font-family: arial;">
</span></span><h3 align="CENTER"><span style="font-size: large;"><span style="font-family: arial;">Stellung der Kommunisten zu den verschiedenen oppositionellen Parteien</span></span></h3><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Nach Abschnitt II versteht sich das Verhältnis der Kommunisten zu den
bereits konstituierten Arbeiterparteien von selbst, also ihr Verhältnis
zu den Chartisten in England und den agrarischen Reformern in
Nordamerika.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Sie kämpfen für die Erreichung der unmittelbar vorliegenden Zwecke
und Interessen der Arbeiterklasse, aber sie vertreten in der
gegenwärtigen Bewegung zugleich die Zukunft der Bewegung. In Frankreich
schließen sich die Kommunisten an die sozial-demokratische Partei
an gegen die konservative und radikale Bourgeoisie, ohne darum das
Recht aufzugeben, sich kritisch zu den aus der revolutionären
Überlieferung herrührenden Phrasen und Illusionen zu verhalten.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">In der Schweiz unterstützen sie die Radikalen, ohne zu verkennen, daß
diese Partei aus widersprechenden Elementen besteht, teils aus
demokratischen Sozialisten im französischen Sinn, teils aus radikalen
Bourgeois.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Unter den Polen unterstützen die Kommunisten die Partei, welche eine
agrarische Revolution zur Bedingung der nationalen Befreiung macht,
dieselbe Partei, welche die Krakauer Insurrektion von 1846 ins Leben
rief.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">In Deutschland kämpft die Kommunistische Partei, sobald die
Bourgeoisie revolutionär auftritt, gemeinsam mit der Bourgeoisie gegen
die absolute Monarchie, das feudale Grundeigentum und die Kleinbürgerei.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Sie unterläßt aber keinen Augenblick, bei den Arbeitern ein möglichst <a name="S493"><b>|493|</b></a> klares Bewußtsein über den feindlichen Gegensatz zwischen Bourgeoisie und Proletariat herauszuarbeiten, damit die deutschen
Arbeiter sogleich die gesellschaftlichen und politischen Bedingungen,
welche die Bourgeoisie mit ihrer Herrschaft herbeiführen muß, als ebenso
viele Waffen gegen die Bourgeoisie kehren können, damit, nach dem Sturz
der reaktionären Klassen in Deutschland, sofort der Kampf gegen die
Bourgeoisie selbst beginnt. </span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Auf Deutschland richten die Kommunisten ihre Hauptaufmerksamkeit,
weil Deutschland am Vorabend einer bürgerlichen Revolution steht und
weil es diese Umwälzung unter fortgeschrittneren Bedingungen der
europäischen Zivilisation überhaupt und mit einem viel weiter
entwickelten Proletariat vollbringt als England im 17. und Frankreich im
18. Jahrhundert, die deutsche bürgerliche Revolution also nur das
unmittelbare Vorspiel einer proletarischen Revolution sein kann.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Mit einem Wort, die Kommunisten unterstützen überall jede
revolutionäre Bewegung gegen die bestehenden gesellschaftlichen und
politischen Zustände.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">In allen diesen Bewegungen heben sie die Eigentumsfrage, welche mehr
oder minder entwickelte Form sie auch angenommen haben möge, als die
Grundfrage der Bewegung hervor. </span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Die Kommunisten arbeiten endlich überall an der Verbindung und Verständigung der demokratischen Parteien aller Länder.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Die Kommunisten verschmähen es, ihre Ansichten und Absichten zu
verheimlichen. Sie erklären es offen, daß ihre Zwecke nur erreicht
werden können durch den gewaltsamen Umsturz aller bisherigen
Gesellschaftsordnung. Mögen die herrschenden Klassen vor einer
kommunistischen Revolution zittern. Die Proletarier haben nichts in ihr
zu verlieren als ihre Ketten. Sie haben eine Welt zu gewinnen.</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
<i><p align="CENTER">Proletarier aller Länder, vereinigt euch!</p><p align="CENTER"> </p>
</i></span></span><hr noshade="noshade" size="1" /><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Fußnoten von Engels</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;"><a name="F1">(1)</a> und Lohnarbeit ausnutzen. Unter Proletariat die
Klasse der modernen Lohnarbeiter, die, da sie keine eigenen
Produktionsmittel besitzen, darauf angewiesen sind, ihre Arbeitskraft zu
verkaufen, um leben zu können. [Anmerkung von Engels zur englischen
Ausgabe von 1888.] </span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;"><a name="F2">(2)</a> Das heißt, genau gesprochen, die schriftlich
überlieferte Geschichte. 1847 war die Vorgeschichte der Gesellschaft,
die gesellschaftliche Organisation, die aller niedergeschriebenen
Geschichte vorausging, noch so gut wie unbekannt. Seitdem hat Haxthausen
das Gemeineigentum am Boden in Rußland entdeckt, Maurer hat es
nachgewiesen als die gesellschaftliche Grundlage, wovon alle deutschen
Stämme geschichtlich ausgingen, und allmählich fand man, daß
Dorfgemeinden mit gemeinsamem Bodenbesitz die Urform der Gesellschaft
waren von Indien bis Irland. Schließlich wurde die innere Organisation
dieser urwüchsigen kommunistischen Gesellschaft in ihrer typischen Form
bloßgelegt durch Morgans krönende Entdeckung der wahren Natur der Gens
und ihrer Stellung im Stamm. Mit der Auflösung dieser ursprünglichen
Gemeinwesen beginnt die Spaltung der Gesellschaft in besondre und
schließlich einander entgegengesetzte Klassen. Ich habe versucht, diesen
Auflösungsprozeß in "Der Ursprung der Familie, des Privateigenthums und
des Staates" zu verfolgen; 2. Auflage, Stuttgart 1886. [Anmerkung von
Engels zur englischen Ausgabe von 1888.] </span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;"><a name="F3">(3)</a> "Kommune" nannten sich die in Frankreich
entstehenden Städte, sogar bevor sie ihren feudalen Herrn und Meistern
lokale Selbstverwaltung und politische Rechte als "Dritter Stand"
abzuringen vermochten. Allgemein gesprochen haben wir hier als typisches
Land für die ökonomische Entwicklung der Bourgeoisie England, für ihre
politische Entwicklung Frankreich angeführt. [Anmerkung von Engels zur
englischen Ausgabe von 1888.]</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">So nannten die Städtebürger Italiens und Frankreichs ihr städtisches
Gemeinwesen, nachdem sie die ersten Selbstverwaltungsrechte ihren
Feudalherren abgekauft oder abgezwungen hatten. [Anmerkung von Engels
zur deutschen Ausgabe von 1890.]</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;"><a name="F4">(4)</a> Gemeint ist nicht die englische
Restaurationszeit 1660-1689, sondern die französische Restaurationszeit
1814-1830. [Anmerkung von Engels zur englischen Ausgabe von 1888.]</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;"><a name="F5">(5)</a> Dies bezieht sich hauptsächlich auf Deutschland,
wo der Landadel und das Junkertum einen großen Teil ihrer Güter auf
eigene Rechnung durch ihre Verwalter bewirtschaften lassen und daneben
noch Großproduzenten von Rübenzucker und Kartoffelschnaps sind. Die
reicheren englischen Aristokraten sind noch nicht so weit
heruntergekommen; aber auch sie wissen, wie man das Sinken der Rente
wettmachen kann durch die Hergabe ihres Namens an mehr oder weniger
zweifelhafte Gründer von Aktiengesellschaften. [Anmerkung von Engels zur
englischen Ausgabe 1888.]</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;"><a name="F6">(6)</a> Der Revolutionssturm von 1848 hat diese gesamte
schäbige Richtung weggefegt und ihren Trägern die Lust benommen, noch
weiter in Sozialismus zu machen. Hauptvertreter und klassischer Typus
dieser Richtung ist Herr Karl Grün. [Anmerkung von Engels zur deutschen
Ausgabe von 1890.]</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;"><a name="F7">(7)</a> Phalanstere war die Bezeichnung für die von
Charles Fourier geplanten sozialistischen Kolonien; Ikarien nannte Cabet
seine Utopie und später seine kommunistische Kolonie in Amerika.
[Anmerkung von Engels zur englischen Ausgabe von 1888.]</span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Home-Kolonien (Kolonien im Inland) nennt Owen seine kommunistischen
Mustergesellschaften. Phalanstere war der Name der von Fourier geplanten
gesellschaftlichen Paläste. Ikarien hieß das utopische Phantasieland,
dessen kommunistische Einrichtung Cabet schilderte. </span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;"><a name="F8">(8)</a> Die Partei, die damals im Parlament von
Ledru-Rollin, in der Literatur von Louis Blanc und in der Tagespresse
von der "Réforme" vertreten wurde. Der Name "Sozialdemokratie" bedeutete
bei diesen ihren Erfindern eine Sektion der demokratischen oder
republikanischen Partei mit mehr oder weniger sozialistischer Färbung. </span></span></p><span style="font-size: large;"><span style="font-family: arial;">
</span></span><p><span style="font-size: large;"><span style="font-family: arial;">Die damals sich sozialistisch-demokratisch nennende Partei in
Frankreich war die durch Ledru-Rollin politisch und durch Louis Blanc
literarisch vertretene; sie war also himmelweit verschieden von der
heutigen deutschen Sozialdemokratie.</span></span></p><p><span style="font-size: large;"><span style="font-family: arial;">------------------------------------------------------------------------------------</span></span></p><p><span style="font-size: large;"><span style="font-family: arial;">Bitte denken Sie mit darüber nach, was seit Karl Marx weltweit passiert ist. Eines ist klar und offensichtlich. So wie Marx die Entwicklung vorhersah, so verlief sie nicht. Sie wird es auch nicht mehr tun. Die Arbeiterklasse hat nicht übernommen. Anstatt über 80% verfügt sie gerade noch über 8% der Wählerstimmen. Alsbald werden sich ihre letzten Amtsträger verabschieden oder sich beerdigen lassen. Einen Nachwuchs oder einen Ersatz desselben zu erkennen, ist quasi unmöglich.</span></span></p><p><span style="font-size: large;"><span style="font-family: arial;">Von Kapital so zu reden, wie Marx dies tat, das war seine größte Fehlleistung. Das Kapital sind nicht die paar Geldbesitzer, die er entdeckt zu haben glaubte, sondern der Teil des Geldes, der produktiv eingesetzt wird. Es ist das Millionenfache dessen, was Marx vermutete hatte. In einer modernen Wirtschaft, die viel Geld und Knowhow benötigt, sind Kapital das A und O. Jeder sollte seinem Teil der Wirtschaft als Kapitalist dienen, und zwar als Geld- und Ideengeber. Nichts ist verdientsvoller. Er darf dies tun, auch wenn nicht vom Staat verlangt.<br /></span></span></p><p><span style="font-size: large;"><span style="font-family: arial;">Falls - wie Friedrich Engels dies vermutete - </span></span><span style="font-size: large;"><span style="font-family: arial;"><span style="font-size: large;"><span style="font-family: arial;">unter Bourgeoisie die Klasse der modernen
Kapitalisten verstanden wird, die sich als Beschaffer und Besitzer der gesellschaftlichen
Produktionsmittel sehen, dann ist dies ein Ehrentitel. Anstatt eines französischen Titels könnte ihnen die völlig geichwertige deutsche Bezeichnung der Bürgerschaft zurückverliehen werden. <br /></span></span></span></span></p><p><span style="font-size: large;"><span style="font-family: arial;"><br /></span></span></p>Bertal Dresenhttp://www.blogger.com/profile/01435152037884170636noreply@blogger.com0tag:blogger.com,1999:blog-8476761749021763994.post-37712275956625751622020-11-17T12:27:00.012+01:002020-11-20T15:54:32.135+01:00Von Bunga Bunga zu Corona, von Trump zur Bescheidenheit von Regierungen<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span style="font-family: arial; font-size: medium;"><span>Im
SPIEGEL 44/2020 wird eine kürzlich vorgelegte Studie des Kieler Instituts für Weltwirtschaft
besprochen. Die Besprechung ist überschrieben ‚</span><span style="mso-bidi-font-weight: bold;">So schlecht wirtschaften Populisten </span><span style="mso-spacerun: yes;"> </span><span>- Das Bunga-Bunga-Zeitalter‘. Die Autoren
heißen Christoph Trebesch, Manuel Funke und Moritz Schularik. Sie haben alle
bekannten populistischen Systeme der letzten 100 Jahre analysiert. Ihnen ist
gemeinsam, dass Versprechen gemacht wurden, nach denen es dem ‚kleinen Mann‘
besser gehen soll. Ob sie Juan Peron, Silvio Berlusconi, Recep Tayyip Erdogan oder
Donald Trump heißen, in allen Fällen bezahlte das Volk mit einer deutlichen
Abnahme seines Wohlstands. Das krasseste Beispiel sei Argentinien, das einmal
zu den reichsten Ländern der Welt gehörte. Heute kann sein Staat kaum noch
bestehen. Ich finde diese Art von Studie gehört zu den dringend benötigten politischen
</span><span style="mso-spacerun: yes;"> </span><span>Augenöffnern.</span></span></p><span style="font-family: arial; font-size: medium;">
</span><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span style="font-family: arial;"><b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span face=""Arial","sans-serif"" style="font-size: medium;">Trump
als großer Desillusionator</span></i></b></span></p><span style="font-family: arial; font-size: medium;">
</span><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span style="font-family: arial;"><span face=""Arial","sans-serif"" style="font-size: medium;">Wenn es
ein Land gibt, dass gerade nachdenkt und sich neuausrichtet, was der Maßstab
für eine ehrliche und dem Interesse des Volkes dienende Regierung sein müsste,
dann ist gerade das Musterland der Demokratie an der Reihe, die USA.</span></span></p><span style="font-family: arial; font-size: medium;">
</span><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span style="font-family: arial;"><span face=""Arial","sans-serif"" style="font-size: medium;">Mehrmals
beschäftigte ich mich in diesem Blog mit dem Phänomen Donald Trump. Was Peter
Hiemann (1935-2020) und mir zuerst als Eigenschaften eines unreifen Menschen
erschien, haben wir später verstärkt als Nationalismus eingestuft. Seinen Slogan
des ‚Amerika first‘ ahmten später andere Staaten nach, und trieben damit die Kooperation
und den Interessenausgleich in eine bis dahin ungewohnte Richtung. Dass er, der
wie ein Berserker wütete, jetzt isoliert ist und keine Freunde mehr hat, ist
eine Strafe der Geschichte. Trump hielt sich nicht nur für klüger als die
meisten seiner Amtsvorgänger, er hielt sich sicher für klüger als die meisten
seiner Landsleute. Vielleicht sind seine Amtsnachfolger ihm gegenüber gnädig, und
gewähren ihm eine Begnadigung oder Strafmilderung, angesichts der besonders
fordernden Umstände, unter denen er agieren musste. </span></span></p><span style="font-family: arial; font-size: medium;">
</span><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span style="font-family: arial; font-size: medium;"><b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span face=""Arial","sans-serif"">Corona,
die zähe Ernüchterung</span></i></b><b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span face=""Arial","sans-serif""> </span></i></b></span></p><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span style="font-family: arial;"><span face=""Arial","sans-serif"" style="font-size: medium;">Während
die Welt sich gerade auf die Einführung eines Impfstoffes gegen die
Corona-Infektion vorbereitet, können wir versuchen uns klarzumachen, was wir
durch die lange Wartezeit gelernt haben. Nicht nur die Kliniken und
Intensivstationen einzelner Städte fühlten sich überfordert. Was können wir tun.
um unsere Kinder zu beschützen? Diese Frage war in aller Munde. Ist das
Schließen von Schulen überhaupt eine Lösung, wenn das Funktionieren der
Wirtschaft und des öffentlichen Verkehrs nicht in Frage gestellt werden dürfen.
Eine ehemalige Lehrerin an einer Mittelschule schrieb mir:</span></span></p><span style="font-family: arial; font-size: medium;">
</span><p class="MsoNormal"><span style="font-family: arial;"><span lang="DE" style="line-height: 107%;"></span></span></p><blockquote><span style="font-family: arial;"><span style="background-color: white; font-size: medium;"><i>Ein hohes
Ansteckungsrisiko sehe ich in Schulbussen. Was bringen alle Vorsichtsmaßnahmen,
wenn Schüler vor und nach dem Unterricht wie Heringe in der Dose transportiert
werden? Man bedenke, dass die Schulwege auf dem Land oft länger als eine Stunde
dauern.</i></span></span></blockquote><span style="font-family: arial;"><span lang="DE" style="font-size: large; line-height: 107%;"><o:p></o:p></span></span><p></p><span style="font-family: arial; font-size: medium;">
</span><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span style="font-family: arial;"><span face=""Arial","sans-serif"" style="font-size: medium;">Mich dünkt
es, dass wir solche Fragen, sobald einige Leute sich vorbeugend impfen können,
sehr schnell wieder vergessen werden.</span></span></p><div style="line-height: normal; margin-bottom: 0cm; text-align: left;"><span><span style="font-family: arial; font-size: medium;"> </span></span></div><div style="line-height: normal; margin-bottom: 0cm; text-align: left;"><span><span style="font-family: arial; font-size: medium;">Die uns umgebenden Staaten Europas haben im Verhältnis zur Einwohnerzahl mehr Infizierte, mehr Erkrankte und mehr Tote. Thorsten Lehr, ein Professor für Pharmazie der Uni Saarbrücken, meint, dass bis zum Jahresende 2020 die Zahlen bei uns steigen werden. Zuerst wären es die Infizierten, dann die schwer Erkrankten (bis 37.000 im Dezember) und dann die Toten (allein 1000 am ersten Weihnachtstag). Durch den von der Regierung beschlossenen ‚Shutdown light‘ werden die aktuellen Zahlen um Einiges niedriger liegen. Ganz los werden wir das Thema nicht an Weihnachten.</span></span></div><span style="font-family: arial; font-size: medium;">
</span><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span style="font-family: arial; font-size: medium;"><b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span face=""Arial","sans-serif"">Erzwungene
Folgen eines Neuanfangs</span></i></b><b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span face=""Arial","sans-serif""> </span></i></b></span></p><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span style="font-family: arial;"><span face=""Arial","sans-serif"" style="font-size: medium;">Trump
werden wir alsbald vergessen haben, Corona und das Schlagwort Pandemie auch. Dann
diskutieren wir wieder über Bundesliga und Milchpreise. So ist das Leben.
Gewisse Dinge sind uns nah. Diese werden wiederkommen. Andere waren ja nur wie
auf Besuch. Oft hinterließen sie nicht einmal Spuren.</span></span></p><span style="font-family: arial; font-size: medium;">
</span><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span style="font-family: arial; font-size: medium;"><span face=""Arial","sans-serif"">Einen
richtigen Neuanfang erlebten wir Deutsche fast alle einmal pro Generation. Mal
sagten Könige und Kaiser ade. Dann verabschiedete sich der Gröfaz – oder wie
Sie den Postkartenmaler aus Braunau am Inn heute nennen. Den Frauen und Männern,
die es danach an die Spitze ihres Volkes schafften, setzte man nur in wenigen Fällen
eigene Denkmäler. Wir haben ja noch einige vom alten Herrn Bismarck übrig, dem
mit der Blechbüchse anstatt einem Hut auf dem Kopf. Papa Heuß gab sich für
viele zu sehr als Zivilist aus.</span><span face=""Arial","sans-serif""> </span></span></p><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span style="font-family: arial;"><span face=""Arial","sans-serif"" style="font-size: medium;">Vielleicht
sollten wir Neuanfänge stärker ins Gedächtnis rufen. Dreißig Jahre nach dem Mauerfall
in Berlin darf man doch behaupten, dass dies für die Mehrzahl der anliegenden Staaten
und die meisten Deutschen kein Unfall war. Den paar Ausnahmen, den Uneinsichtigen, die damit Schwierigkeiten
haben, sollten wir mit Nachsicht begegnen. Der Preis der Meinungsfreiheit ist ja
eine gewisse Unschärfe der Erkenntnis und Bewertung.</span></span></p><span style="font-family: arial; font-size: medium;">
</span><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span style="font-family: arial; font-size: medium;"><span>Das Bedürfnis,
Denkmäler zu hinterlassen ist nicht unbedingt ein Gütezeichen einer Regierung. Tun
sie es trotzdem, denke ich dabei heute zu allerletzt an Reiterstandbilder. Gewisse
Industrieanlagen wie Flugplätze oder Seehäfen, Müllverbrennungen oer Kläranlagen machen eher Sinn. Auch dabei kann
man sich blamier</span>en, anstatt für den Zweck werbend in Erscheinung zu treten. Mögen
dies die Ausnahmen bleiben.</span></p>
Bertal Dresenhttp://www.blogger.com/profile/01435152037884170636noreply@blogger.com3tag:blogger.com,1999:blog-8476761749021763994.post-84392037118057254982020-10-18T13:55:00.027+02:002020-10-24T12:51:04.810+02:00Vom digitalen Speichermedium zur allgegenwärtigen Datenwolke - meine persönliche Erfahrung<p><!--[if gte mso 9]><xml>
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<p class="MsoNormal" style="margin-bottom: 0cm; text-align: justify;"><span face=""Arial","sans-serif"" style="font-size: 12pt; line-height: 115%; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">In den Jahren 2008/2009, also vor 12 Jahren, raffte ich mich dazu auf, mein
Leben reflektierend zu dokumentieren. Ich konzentrierte mich dabei auf zwei
Themenkreise, meine Reisen durch die Welt und meine fachlichen
Veröffentlichungen. Was nicht in Betracht kam, war mein Familienleben, sowie meine
Gesundheits- oder genauer gesagt − meine Krankheitsgeschichte. Mein beruflicher
Werdegang und die Projekte innerhalb der Firma IBM hatten bereits vorher einen
Niederschlag gefunden, und zwar im Jahre 2001 in dem Buch [1]. Die zwei CDs, die 2008
und 2009 entstanden waren, umfassten je 700 Mbytes. Sie trugen die Bezeichnungen <i style="mso-bidi-font-style: normal;">Kunst und Gunst des Reisens</i> bzw. <i style="mso-bidi-font-style: normal;">Software,</i></span> <i style="mso-bidi-font-style: normal;"><span face=""Arial","sans-serif"" style="font-size: 12pt; line-height: 115%; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Information und Informatik.</span></i></p>
<p class="MsoNormal" style="margin-bottom: 0cm; text-align: justify;"><i style="mso-bidi-font-style: normal;"><span face=""Arial","sans-serif"" style="font-size: 12pt; line-height: 115%; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;"></span></i></p>
<p class="MsoNormal"><span face=""Arial","sans-serif"" style="font-size: 12pt; line-height: 115%; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Seit April 2012 bietet die Firma
Google eine generische Cloud-Storage-Fähigkeit an, die als </span><a href="https://de.wikipedia.org/wiki/Google_Drive"><span face=""Arial","sans-serif"" style="font-size: 12pt; line-height: 115%; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Google Drive</span></a><span face=""Arial","sans-serif"" style="font-size: 12pt; line-height: 115%; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;"> bezeichnet wird. Obwohl Google seine Herkunft im akademischen Bereich hatte, nämlich an der University of Michigan, ist seine Akteptanz nicht unbestritten. Auch dieses Angebot ist sehr lukrativ, ja verführerisch. Die von Privatpersonen
nutzbare kostenlose Speicherkapazität umfasst 15 Gbytes zusammen mit Googles
anderen Diensten (Gmail, Google+). Ähnliche Angebote gibt es von Amazon, IBM,
Microsoft, und Telekom. Wer Speicherplatz in der Wolke verschenkt, muss meine Daten haben wollen und sie missbrauchen - so lautet vielfach das pauschale und meistens negative Urteil. Trotzdem ist der damit verbundene Trend geradezu unaufhaltsam. Er ist marktbestimmend und revolutioniert das Denken der Beteiligten. Offensichtich sind wir auch wieder auf dem Weg zur Naturalienwirtschaft, in der Geld nur eine Nebenrolle spielt.<br /></span></p>
<p class="MsoNormal"><span face=""Arial","sans-serif"" style="font-size: 12pt; font-style: normal; line-height: 115%; mso-ascii-theme-font: major-latin; mso-bidi-font-style: italic; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Dieser Tage machte mir mein Enkel Marcus den Vorschlag, meine beiden
CDs in die Google Cloud zu überführen. Die Verweisstruktur, die reichlichen Gebrauch
von Index-Dateien machte, wurde nicht überarbeitet</span><span face=""Arial","sans-serif"" style="font-size: 12pt; line-height: 115%; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">. </span><span face=""Arial","sans-serif"" style="font-size: 12pt; font-style: normal; line-height: 115%; mso-ascii-theme-font: major-latin; mso-bidi-font-style: italic; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Sie finden das Material inzwischen auf der Web-Plattform </span><a href="http://bertal.mauxos.de/"><span face=""Arial","sans-serif"" style="font-size: 12pt; line-height: 115%; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">http://bertal.mauxos.de/</span></a><span class="MsoHyperlink"><span face=""Arial","sans-serif"" style="font-size: 12pt; line-height: 115%; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;"><span style="text-decoration: none;">. Sie heißen dort <i>Fachveröffentichungen</i> und <i>Reiseberichte</i>. Nur die erstere der beiden ist im Folgenden explizit wiedergegeben.<br /></span></span></span></p><p class="MsoNormal"><span class="MsoHyperlink"><span face=""Arial","sans-serif"" style="font-size: 12pt; line-height: 115%; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;"><span style="text-decoration: none;">Um das Material vor Web Crawlern zu schützen, dient eine einfache Kennung. Der Benutzername heißt <i>bertal</i>, das Passwort <i>blogfreund</i>. Viel Spaß beim Stöbern!</span></span></span></p><p class="MsoNormal"><b><span class="MsoHyperlink"><span face=""Arial","sans-serif"" style="font-size: 12pt; line-height: 115%; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;"><span style="text-decoration: none;"> </span></span></span></b><b style="mso-bidi-font-weight: normal;"><span style="font-family: Arial; font-size: 14pt; mso-bidi-font-family: "Times New Roman";">-----------------------------------------------------------------------------------------------</span></b></p><div class="Section1">
<p class="TitleCover" style="text-align: center;"><span style="font-size: x-large;"><i style="mso-bidi-font-style: normal;"><span style="mso-ansi-language: DE; mso-bidi-font-weight: bold;">Software,
Information und Informatik</span></i></span></p>
<p align="center" class="MsoBodyText" style="text-align: center;"><span style="mso-ansi-language: DE;"></span></p>
<p align="center" class="MsoBodyText" style="text-align: center;"><span style="mso-ansi-language: DE;"></span></p>
<p align="center" class="MsoNormal" style="text-align: center;"><b style="mso-bidi-font-weight: normal;"><span style="font-family: Arial; font-size: 16pt; mso-bidi-font-family: "Times New Roman"; mso-font-kerning: 14.0pt;">Eine Sammlung eigener
Fachveröffentlichungen und Fotos<br />
<br />
aus der Zeit von 1952 bis 2007<br />
</span></b><b style="mso-bidi-font-weight: normal;"><span style="font-family: Arial; font-size: 14pt; mso-bidi-font-family: "Times New Roman"; mso-font-kerning: 14.0pt;">
</span></b></p><p align="center" class="MsoNormal" style="text-align: center;"><b style="mso-bidi-font-weight: normal;"><span style="font-family: Arial; font-size: 14pt; mso-bidi-font-family: "Times New Roman";"></span></b></p>
<p align="center" class="MsoNormal" style="text-align: center;"><b style="mso-bidi-font-weight: normal;"><span style="font-family: Arial; font-size: 14pt; mso-bidi-font-family: "Times New Roman";">kompiliert von</span></b></p>
<p class="TitleCover" style="margin-bottom: .0001pt; margin: 0cm;"><span style="font-size: 14pt; mso-ansi-language: DE;">
</span></p><p class="TitleCover" style="margin: 0cm 0cm 0.0001pt; text-align: center;"><span style="font-size: 20pt; mso-ansi-language: DE;">Albert Endres</span><span style="font-size: 16pt; mso-ansi-language: DE;"><br />
<br />
Sindelfingen, im Jahre 2008</span></p>
<p class="SubtitleCover" style="margin-bottom: .0001pt; margin: 0cm;"><span style="font-size: 16pt; mso-ansi-language: DE;"> <br /></span></p>
<p class="SubtitleCover" style="margin: 0cm 0cm 0.0001pt; text-align: center;"><span style="font-size: 12pt; font-style: normal; mso-ansi-language: DE; mso-bidi-font-style: italic;">Durch Anklicken der entsprechenden Links gelangen Sie zur</span></p>
<p align="center" class="MsoBodyText" style="text-align: center;"><span style="mso-ansi-language: DE;"></span></p>
<p align="center" class="MsoBodyText" style="margin-bottom: 6pt; text-align: center;"><b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span style="font-family: Arial; font-size: 16pt; mso-ansi-language: DE; mso-bidi-font-family: "Times New Roman";"><a href="https://bertal.mauxos.de/fachveroeffentlichungen/3_Einfuehrung.pdf">Einführung</a>, sowie
über die <a href="https://bertal.mauxos.de/fachveroeffentlichungen/2_Inhaltsuebersicht.htm">Inhaltsübersicht</a> </span></i></b></p>
<p align="center" class="MsoBodyText" style="text-align: center;"><b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span style="font-family: Arial; font-size: 16pt; mso-ansi-language: DE; mso-bidi-font-family: "Times New Roman";">zu den einzelnen Fachveröffentlichungen</span></i></b></p>
<p class="SubtitleCover" style="margin: 0cm 0cm 0.0001pt; text-align: center;"><span style="font-size: 12pt; font-style: normal; mso-ansi-language: DE;">oder über
die</span></p>
<p class="SubtitleCover" style="margin: 0cm 0cm 6pt; text-align: center;"><span style="font-size: 12pt; mso-ansi-language: DE;"><br />
</span><b style="mso-bidi-font-weight: normal;"><span style="font-size: 16pt; mso-ansi-language: DE;"><a href="https://bertal.mauxos.de/fachveroeffentlichungen/G_Berufsleben/index.html">Web-Galerie</a> bzw.
die selbst startende</span></b><span style="font-size: 12pt; mso-ansi-language: DE;"> </span><b style="mso-bidi-font-weight: normal;"><span style="font-size: 16pt; mso-ansi-language: DE;"><a href="https://bertal.mauxos.de/fachveroeffentlichungen/P_Berufsleben.pdf">Präsentation</a> </span></b><span style="mso-ansi-language: DE;"></span></p>
<p align="center" class="MsoBodyText" style="text-align: center;"><b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span style="font-family: Arial; font-size: 16pt; mso-ansi-language: DE; mso-bidi-font-family: "Times New Roman";">zu einer der beiden Darstellungsformen der Fotostrecken</span></i></b></p>
<p align="center" class="MsoBodyText" style="text-align: center;"><b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span style="font-family: Arial; font-size: 16pt; mso-ansi-language: DE; mso-bidi-font-family: "Times New Roman";"></span></i></b></p>
<p align="center" class="MsoNormal" style="text-align: center;"><b>________________________________________________________________________</b></p>
<p align="center" class="MsoNormal" style="text-align: center;"><b style="mso-bidi-font-weight: normal;"><span style="font-family: Arial; font-size: 10pt; mso-bidi-font-family: "Times New Roman";">
</span></b><b style="mso-bidi-font-weight: normal;"><span style="font-family: Arial; font-size: 14pt; mso-bidi-font-family: "Times New Roman";">Alle Rechte
vorbehalten.</span></b></p><p align="center" class="MsoNormal" style="text-align: center;"><b style="mso-bidi-font-weight: normal;"><span style="font-family: Arial; font-size: 14pt; mso-bidi-font-family: "Times New Roman";"></span></b></p>
<p align="center" class="MsoNormal" style="text-align: center;"><b style="mso-bidi-font-weight: normal;"><span style="font-family: Arial; font-size: 14pt; mso-bidi-font-family: "Times New Roman";">Autor: Prof. Dr. Albert Endres, Iselerstr.1, D-71067
Sindelfingen; </span></b><b style="mso-bidi-font-weight: normal;"><span lang="IT" style="font-family: Arial; font-size: 14pt; mso-ansi-language: IT; mso-bidi-font-family: "Times New Roman";">E-Mail: <a href="mailto:a.endres@acm.org">a.endres@web.de</a></span></b></p>
<p align="center" class="MsoNormal" style="text-align: center;"><b style="mso-bidi-font-weight: normal;"><span lang="IT" style="font-family: Arial; font-size: 14pt; mso-ansi-language: IT; mso-bidi-font-family: "Times New Roman";"></span></b></p>
<p align="center" class="MsoNormal" style="text-align: center;"><b style="mso-bidi-font-weight: normal;"><span lang="IT" style="font-family: Arial; font-size: 14pt; mso-ansi-language: IT; mso-bidi-font-family: "Times New Roman";"></span></b></p>
<p class="MsoNormal" style="text-align: justify;"><b style="mso-bidi-font-weight: normal;"><span style="font-family: Arial; font-size: 14pt; mso-bidi-font-family: "Times New Roman";">Urheberrechte: Für alle bereits veröffentlichten
Beiträge liegt die Genehmigung zur Wiederverwendung in dieser Sammlung vor
(soweit die Rechteinhaber noch festzustellen sind). Der größte Teil
des hier benutzten Foto-Materials stammt aus eigenem Privatbesitz. Einige
Ergänzungen wurden vorgenommen durch Material, das im Internet frei
angeboten wird.</span></b></p>
<p align="center" class="MsoNormal" style="text-align: center;"><b style="mso-bidi-font-weight: normal;"><span style="font-family: Arial; font-size: 14pt; mso-bidi-font-family: "Times New Roman";"></span></b></p>
<p align="center" class="MsoNormal" style="text-align: center;"><b style="mso-bidi-font-weight: normal;"><span style="font-family: Arial; font-size: 14pt; mso-bidi-font-family: "Times New Roman";"></span></b></p>
<p align="center" class="MsoNormal" style="text-align: center;"><b style="mso-bidi-font-weight: normal;"><span style="font-family: Arial; font-size: 14pt; mso-bidi-font-family: "Times New Roman";"> 2008 Eigenverlag A. Endres,
Sindelfingen</span></b></p>
<p align="center" class="MsoNormal" style="text-align: center;"><b style="mso-bidi-font-weight: normal;"><span style="font-family: Arial; font-size: 14pt; mso-bidi-font-family: "Times New Roman";"></span></b></p>
<p align="center" class="MsoNormal" style="text-align: center;"><b style="mso-bidi-font-weight: normal;"></b></p><p align="center" class="MsoNormal" style="text-align: center;"><b style="mso-bidi-font-weight: normal;"></b></p><div class="separator" style="clear: both; text-align: center;"><b style="mso-bidi-font-weight: normal;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgWadJpgcZSinlBmE2o7NoGQb6XROYKUs91WPgTCuhX3R5aqDoe2N1cuTUdBZI8AFRXn3wXfnn7CZoHtesDVJXU3gcsh2shiyBMl7GeGqcMHZ6q_7dcAw5KknkL78w6O3zuz8niA_xkhqyO/s454/image004.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="244" data-original-width="454" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgWadJpgcZSinlBmE2o7NoGQb6XROYKUs91WPgTCuhX3R5aqDoe2N1cuTUdBZI8AFRXn3wXfnn7CZoHtesDVJXU3gcsh2shiyBMl7GeGqcMHZ6q_7dcAw5KknkL78w6O3zuz8niA_xkhqyO/s320/image004.jpg" width="320" /></a></b></div><b style="mso-bidi-font-weight: normal;"><br /></b><span style="font-family: Arial; font-size: 14pt; mso-bidi-font-family: "Times New Roman";"> </span><b style="mso-bidi-font-weight: normal;"><span style="font-family: Arial; font-size: 14pt; mso-bidi-font-family: "Times New Roman";">------------------------------------------------------------------------------------------------<br /></span></b>
<p class="MsoNormal" style="text-align: left;"><b><span style="font-family: Arial; font-size: 14pt; mso-bidi-font-family: "Times New Roman";">Klicken Sie die Links auf der abgebildeten CD, </span><span style="font-family: Arial; font-size: 14pt; mso-bidi-font-family: "Times New Roman";">um an das </span><span style="font-family: Arial; font-size: 14pt; mso-bidi-font-family: "Times New Roman";"><span style="font-family: Arial; font-size: 14pt; mso-bidi-font-family: "Times New Roman";">entprechende (PW-geschützte) </span></span><span style="font-family: Arial; font-size: 14pt; mso-bidi-font-family: "Times New Roman";"><span style="font-family: Arial; font-size: 14pt; mso-bidi-font-family: "Times New Roman";"><span style="font-family: Arial; font-size: 14pt; mso-bidi-font-family: "Times New Roman";"><span style="font-family: Arial; font-size: 14pt; mso-bidi-font-family: "Times New Roman";">Material </span></span>zu gelangen</span>! </span></b><b style="mso-bidi-font-weight: normal;"><span style="font-family: Arial; font-size: 14pt; mso-bidi-font-family: "Times New Roman";"></span></b></p><p class="MsoNormal" style="text-align: left;"><span style="font-family: Arial; font-size: 14pt; mso-bidi-font-family: "Times New Roman";">Eine </span><span style="font-family: Arial; font-size: 14pt; mso-bidi-font-family: "Times New Roman";">Webgalerie</span><span style="font-family: Arial; font-size: 14pt; mso-bidi-font-family: "Times New Roman";"> ist ein sehr einfaches Arrangement, um Fotos im Web darzustellen. Als Präsentation wird hier eine Anordnung von erklärenden Textstücken gesehen.</span><b style="mso-bidi-font-weight: normal;"><span style="font-family: Arial; font-size: 14pt; mso-bidi-font-family: "Times New Roman";"><br /></span></b></p>
</div><p class="MsoNormal" style="text-align: left;">
</p><p class="MsoNormal" style="text-align: left;"><i><b><span class="MsoHyperlink"><span face=""Arial","sans-serif"" style="font-size: 12pt; line-height: 115%; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Referenz</span></span></b></i><span class="MsoHyperlink"><span face=""Arial","sans-serif"" style="font-size: 12pt; line-height: 115%; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin; text-decoration: none; text-underline: none;"> <br /></span></span></p><p class="MsoNormal"><span class="MsoHyperlink"><span face=""Arial","sans-serif"" style="font-size: 12pt; line-height: 115%; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin; text-decoration: none; text-underline: none;">1.<span style="mso-spacerun: yes;"> </span>Endres,A.:
Die IBM Laboratorien Böblingen: System-Software-Entwicklung. Band 2 der Reihe
Forschung und Entwicklung in der IBM Deutschland. Eigenverlag: Sindelfingen
2001; 144 Seiten; ISBN 3-920799-22-3</span></span></p>
<p> </p>Bertal Dresenhttp://www.blogger.com/profile/01435152037884170636noreply@blogger.com0tag:blogger.com,1999:blog-8476761749021763994.post-79067379830746145312020-10-12T19:44:00.005+02:002020-10-13T09:23:35.419+02:00Also sagte Peter Thiel<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Den Peter Thiel meinen Lesern vorzustellen, hieße Eulen nach Athen
zu tragen. Es<span style="mso-spacerun: yes;"> </span>ist in der Tat überflüssig.
Nur so viel: Er ist gebürtiger US-Amerikaner und Jurist. Reich wurde er als Gründer
von PayPal, dem ersten Internet-Zahlungsdienst. Danach gründete er Palantir,
und erweiterte das Geschäft um das 100-Fache. Er ist Investor bei Facebook,
SpaceX und einer Vielzahl anderer Startups. Einen Vortrag, den er an der
Stanford University hielt, hat ein Zuhörer (Blake Masters) unter dem Titel <i style="mso-bidi-font-style: normal;">Zero to one </i>(2016, 126 S.)
zusammengefasst. Hier einige Sprüche daraus, teilweise etwas wüste.</span></p>
<ul style="text-align: left;"><li><span style="font-family: Symbol; font-size: 12pt; mso-bidi-font-family: Symbol; mso-fareast-font-family: Symbol;"><span style="mso-list: Ignore;"><span style="font: 7pt "Times New Roman";"> </span></span></span><span face=""Arial","sans-serif"" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Es
gibt keine Vorbilder für Neues außer durch Technologie. <br /></span></li><li><span style="font-family: Symbol; font-size: 12pt; mso-bidi-font-family: Symbol; mso-fareast-font-family: Symbol;"><span style="mso-list: Ignore;"><span style="font: 7pt "Times New Roman";"></span></span></span><span face=""Arial","sans-serif"" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Fortschritt
kann horizontal (extensiv) oder vertikal (intensiv) sein, so wie bei China oder
im Silicon Valley.</span></li><li><span style="font-family: Symbol; font-size: 12pt; mso-bidi-font-family: Symbol; mso-fareast-font-family: Symbol;"><span style="mso-list: Ignore;"><span style="font: 7pt "Times New Roman";"></span></span></span><span face=""Arial","sans-serif"" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Ohne
Technologie wäre alles ein Nullsummenspiel.</span></li><li><span face=""Arial","sans-serif"" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Neue
Technik wird immer von kleinen Gruppen erfunden, nicht von großen Unternehmen,
noch von Einzelpersonen. Eine Startup-Mentalität ist erforderlich, die Altes
zerstören und Neues wagen will.</span></li><li><span face=""Arial","sans-serif"" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Vor
1985 war Wirtschaft das beliebteste Fach in Stanford, ab dann Informatik wegen
Internet. (1994 Netscape Navigator; 1995 80% Marktanteil).</span><span face=""Arial","sans-serif"" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;"></span><span style="font-family: Symbol; font-size: 12pt; mso-bidi-font-family: Symbol; mso-fareast-font-family: Symbol;"><span style="mso-list: Ignore;"><span style="font: 7pt "Times New Roman";"> </span></span></span></li><li><span style="font-family: Symbol; font-size: 12pt; mso-bidi-font-family: Symbol; mso-fareast-font-family: Symbol;"><span style="mso-list: Ignore;"><span style="font: 7pt "Times New Roman";"> </span></span></span><span face=""Arial","sans-serif"" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">PayPal
wollte eine Währung neben dem Dollar sein. Man gab 10 US$ für jeden neuen Kunden.</span></li><li><span face=""Arial","sans-serif"" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;"></span><span style="font-family: Symbol; font-size: 12pt; mso-bidi-font-family: Symbol; mso-fareast-font-family: Symbol;"><span style="mso-list: Ignore;"><span style="font: 7pt "Times New Roman";"></span></span></span><span face=""Arial","sans-serif"" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Der Nasdaq-Index
stieg von 4-5/99 von 5 auf 3k US$ (Dotcom-Blase). Von 2000-2003 sank er von 5k auf 1k US$.</span></li><li><span face=""Arial","sans-serif"" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Die
Gewinnspanne von Google ist 100 x der aus der Luftfahrtbranche; es erfolgte ein Sprung <i style="mso-bidi-font-style: normal;">von Zero to one. </i>Die Konkurrenz wurde immer übertrieben dargestellt.</span></li><li><span style="font-family: Symbol; font-size: 12pt; mso-bidi-font-family: Symbol; mso-fareast-font-family: Symbol;"><span style="mso-list: Ignore;"><span style="font: 7pt "Times New Roman";"></span></span></span><span face=""Arial","sans-serif"" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Larry
Ellison (Oracle) wollte Leute von Siebel zurückgewinnen. Elon Musk mit X.com konkurrierte zuerst
gegen PayPal. Es kam zum Merger noch vor dem Dotcom-Crash.</span></li><li><span face=""Arial","sans-serif"" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Twitter
war 2012 beim Börsengang 12 x NY Times wert, hatte jedoch noch keinen Gewinn. Da es ein Monopol ist, kommen die Gewinne
irgendwann - so glaubte man.</span></li><li><span face=""Arial","sans-serif"" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Ein
Monopol sollte eine eigene Technologie (10x besser) haben, sowie Netzwerkeffekte, Größenvorteile und
Markenbildung</span>.</li><li><span style="font-family: Symbol; font-size: 12pt; mso-bidi-font-family: Symbol; mso-fareast-font-family: Symbol;"><span style="mso-list: Ignore;"><span style="font: 7pt "Times New Roman";"></span></span></span><span face=""Arial","sans-serif"" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Die
ganze Eurozone stürzt in die Krise, ohne dass jemand Verantwortung übernimmt. Europäer
genießen Leben in Freizeitmentalität (!).</span></li><li><span style="font-family: Symbol; font-size: 12pt; mso-bidi-font-family: Symbol; mso-fareast-font-family: Symbol;"><span style="mso-list: Ignore;"><span style="font: 7pt "Times New Roman";"></span></span></span><span face=""Arial","sans-serif"" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Von
1840 - 1980 gab es noch konkrete Optimisten. Beispiel-Projekte, die damals realisiert
wurden, waren der Suez- bis Panama-Kanal, sowie der Mondflug. Nicht verwirklicht wurde jedoch der Reber-Plan für San<span style="mso-spacerun: yes;"> </span>Francisco.</span></li><li><span face=""Arial","sans-serif"" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">In
der IT sind Startups leichter als in der Biotechnologie, da die Biologie nicht von Menschen
entwickelt wurde. Viele Bio-Forscher sind nicht loyal zu ihrem Thema. Sie sind<span style="mso-spacerun: yes;"> </span>lieber Profs, anstatt Vollzeitler.</span></li><li><span face=""Arial","sans-serif"" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Heute
überwiegen konkrete Optimisten. US-Bürger sparen nicht; US-Unternehmen
investieren zu wenig.</span></li><li><span style="font-family: Symbol; font-size: 12pt; mso-bidi-font-family: Symbol; mso-fareast-font-family: Symbol;"><span style="mso-list: Ignore;"><span style="font: 7pt "Times New Roman";"></span></span></span><span face=""Arial","sans-serif"" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Das Silicon
Valley plant nicht. Man tastet sich mit Konsensprodukten voran. Lieber wäre ihm <i style="mso-bidi-font-style: normal;">intelligent design</i>. Steve Jobs war eine Ausnahme.</span></li><li><span face=""Arial","sans-serif"" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;"></span><span style="font-family: Symbol; font-size: 12pt; mso-bidi-font-family: Symbol; mso-fareast-font-family: Symbol;"><span style="mso-list: Ignore;"><span style="font: 7pt "Times New Roman";"></span></span></span><span face=""Arial","sans-serif"" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Querdenken ist nur sinnvoll, wenn die Welt nicht alle Geheimnisse preisgegeben hat.</span></li><li><span face=""Arial","sans-serif"" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Der
Unabomber<span style="mso-spacerun: yes;"> </span>(Kaczinski) wollte die Welt
neu aufbauen, und zwar ohne den besseren Teil.</span></li><li><span face=""Arial","sans-serif"" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;"></span><span style="font-family: Symbol; font-size: 12pt; mso-bidi-font-family: Symbol; mso-fareast-font-family: Symbol;"><span style="mso-list: Ignore;"><span style="font: 7pt "Times New Roman";"></span></span></span><span face=""Arial","sans-serif"" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Mit
dem Slogan ‚Invent‘ und dem Produkt Inkjet begann bei HP 1999 der Abstieg. Man ging einen Merger mit
Compaq ein. Der Wert der Firma sank von 135 auf 23 Mrd. US$.</span></li><li><span style="font-family: Symbol; font-size: 12pt; mso-bidi-font-family: Symbol; mso-fareast-font-family: Symbol;"><span style="mso-list: Ignore;"><span style="font: 7pt "Times New Roman";"></span></span></span><span face=""Arial","sans-serif"" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Nur
wer an Geheimnisse glaubt, sucht, und zwar in der Natur und im Menschen. Ein gutes Beispiel
ist die Ernährung. </span></li><li><span style="font-family: Symbol; font-size: 12pt; mso-bidi-font-family: Symbol; mso-fareast-font-family: Symbol;"><span style="mso-list: Ignore;"><span style="font: 7pt "Times New Roman";"></span></span></span><span face=""Arial","sans-serif"" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Ist
der Anfang eines Startups verkorkst, ist alles verkorkst. Der CEO eines
Startups sollte nicht mehr als 150k US$ bekommen. Unternehmensanteile sind
wichtiger.</span></li><li><span face=""Arial","sans-serif"" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Man
sollte sich fragen, warum sollte der 20. Ingenieur bei uns arbeiten und nicht
bei Google. Auch wir lösen Menschheitsproblem (Mission) mit einem guten Team. Wir wollen
eine neue Währung gründen.</span></li><li><span style="font-family: Symbol; font-size: 12pt; mso-bidi-font-family: Symbol; mso-fareast-font-family: Symbol;"><span style="mso-list: Ignore;"><span style="font: 7pt "Times New Roman";"></span></span></span><span face=""Arial","sans-serif"" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Verkäufer
mögen die Berufsbezeichnung Salesman nicht; Account Manager klingt besser. Die
Pfadabhängigkeit entscheidet beim Verkauf, nicht das beste Produkt. </span></li><li><span style="font-family: Symbol; font-size: 12pt; mso-bidi-font-family: Symbol; mso-fareast-font-family: Symbol;"><span style="mso-list: Ignore;"><span style="font: 7pt "Times New Roman";"></span></span></span><span face=""Arial","sans-serif"" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Ein
virales Produkt ist eines, dem mit jedem Verkauf ein anderes folgt. Meist geht es
um kleinste Beträge.</span></li><li><span face=""Arial","sans-serif"" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Paypals
Programm Igor störte die Hacker. Man schrieb 2002 erstmals schwarze Zahlen für
PayPal. Man hatte zum ersten Mal eine sichere Zahlungsmethode für das Internet. Man verkaufte 2002 </span><span face=""Arial","sans-serif"" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">für 1,5 Mrd. an eBay. Elon Musk ging zur ‚eBay-Mafia‘. Die gründeten
SpaceX, YouTube, Yelp u.a.</span></li><li><span face=""Arial","sans-serif"" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Peter Thiel gründete Palantir.
Dessen Umsatz 2014 war 1 Mrd. US$. Mit der Software von Palantir werden </span><span face=""Arial","sans-serif"" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;"><span face=""Arial","sans-serif"" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Telefonate in Afghanistan</span></span><span face=""Arial","sans-serif"" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;"><span face=""Arial","sans-serif"" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;"><span face=""Arial","sans-serif"" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;"><span face=""Arial","sans-serif"" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;"> analysiert</span></span>, sowie gegen Kinderpornos und gegen Kreditkartenbetrug </span></span><span face=""Arial","sans-serif"" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;"><span face=""Arial","sans-serif"" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;"><span face=""Arial","sans-serif"" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;"><span face=""Arial","sans-serif"" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">auf der ganzen Welt </span></span>ermittelt.<br /></span></span></li><li><span style="font-family: Symbol; font-size: 12pt; mso-bidi-font-family: Symbol; mso-fareast-font-family: Symbol;"><span style="mso-list: Ignore;"><span style="font: 7pt "Times New Roman";"></span></span></span><span face=""Arial","sans-serif"" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Die CIA
besitzt zu viele ungenutzte Daten, die NSA zu wenig qualifizierte Ermittler. <br /></span></li><li><span style="font-family: Symbol; font-size: 12pt; mso-bidi-font-family: Symbol; mso-fareast-font-family: Symbol;"><span style="mso-list: Ignore;"><span style="font: 7pt "Times New Roman";"></span></span></span><span face=""Arial","sans-serif"" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Rund
97% aller Personalabteilungen benutzen LinkedIn für die Personalsuche. Vor allem Informatiker
glauben an lernende Computer. Hier spielt Wunschdenken eine Rolle.</span></li><li><span style="font-family: Symbol; font-size: 12pt; mso-bidi-font-family: Symbol; mso-fareast-font-family: Symbol;"><span style="mso-list: Ignore;"><span style="font: 7pt "Times New Roman";"></span></span></span><span face=""Arial","sans-serif"" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Für
die Anhänger von Big Data ist Technologie ein Götze.</span></li><li><span face=""Arial","sans-serif"" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Tesla
hat sieben Stärken: gute Technologie (allerdings keinen Faktor 10), gutes Timing
(schon 2009 im Markt), ein Monopol (zuerst nur bei Sportwagen), ein gutes Team, einen starken
Vertrieb (selbst), Haltbarkeit und genügend Geheimnisse. </span></li></ul>
Bertal Dresenhttp://www.blogger.com/profile/01435152037884170636noreply@blogger.com0tag:blogger.com,1999:blog-8476761749021763994.post-30008545292301670142020-09-27T16:08:00.007+02:002020-09-29T12:35:00.603+02:00Her mit den ökonomisch denkenden Menschen<p><!--[if !mso]>
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<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 12pt;"><i style="mso-bidi-font-style: normal;">Abschied vom Homo Oeconomicus </i>(2020,
216 S.)<i style="mso-bidi-font-style: normal;"> </i>so heißt eines der drei
Bücher, mit denen mein Ex-Kollege </span><a href="https://de.wikipedia.org/wiki/Gunter_Dueck"><span face=""Arial","sans-serif"" style="font-size: 12pt;">Gunter Dueck</span></a><span face=""Arial","sans-serif"" style="font-size: 12pt;"> (*1951) dieses Jahr
seine treuen Leser beglückte. Ich muss gestehen, dass dies sein erstes Buch
ist, das ich las. Dafür sind mir seine Kolumnen im Informatik-Spektrum umso stärker in Erinnerung.</span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 12pt;">Für
mich ist der Homo Oeconomicus ein Mensch, den es interessiert und daher auch
wenigstens teilweise versteht, wie die Wirtschaft funktioniert. Er sieht sich
als wirtschaftliches Subjekt an, das die Dinge antreibt anstatt sich von den
Dingen treiben zu lassen. Er denkt selbständig und agiert meistens verantwortungsvoll.
Es besteht nicht der geringste Grund, warum wir uns von diesem Menschenschlag
verabschieden sollten. Ich kann mir kaum vorstellen, dass Autoren wie Dueck dies
wollen. Vielleicht wollen Dueck und andere, indem sie ihren Mitmenschen
einreden, dumm und einfältig zu sein, nur erreichen, dass dadurch ihr Stern
umso mehr zum Glühen gelangt. Wie Sie sehen, las ich das Buch genau andersherum,
als es verfasst ist. Vielleicht ist das Ganze aber auch nur als Satire
aufzufassen gewesen – wer weiß?</span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 12pt;"></span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span face=""Arial","sans-serif"" style="font-size: 12pt;">Bloß eine
nette Theorie</span></i></b></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 12pt;">Der
Homo Oeconomicus sei bestenfalls eine Theorie für nette Vorlesungen – so heißt
es gleich am Anfang des Buches. In Wirklichkeit sei es das Bauchgefühl, das
unser Denken diktiert. Unsere Eingeweide würden uns lenken. Wir hielten uns für
rational, wenn wir uns wie Lemminge verhalten.</span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 12pt;"></span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 12pt;">John Maynard
Keynes (1883-1946), der berühmte britische Ökonom, habe gewollt, dass der Staat
vernünftig sei, dann wenn die Bürger es nicht sind. In schlechten Zeiten regiere
nämlich die Kopflosigkeit. Im Bazar sei Qualität nur durch Herunterhandeln des Preises
feststellbar. </span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 12pt;"></span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span face=""Arial","sans-serif"" style="font-size: 12pt;">Spreizung
der Güter</span></i></b></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 12pt;"></span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 12pt;">Alles
liefe immer mehr in Richtung einer Zweiteilung der wirtschaftlichen Angebote. Nur noch die Extreme
seien interessant. An einem Ende sei dies Armani, am anderen ALDI. Es gäbe die Stars
− ob im Sport, der Mode oder der Kunst – und das Gebrauchsgut (engl. <i style="mso-bidi-font-style: normal;">commodity). </i>Der luxuriösen Villa stünde
das Hochhaus-Appartement gegenüber; der Bourgeoisie das Proletariat.</span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 12pt;">NB: Unter
Stress verschwinden Liebe, Ehre, Wahrheit, Sinn, Würde und Ethik.</span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 12pt;"></span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span face=""Arial","sans-serif"" style="font-size: 12pt;">Fünf
Kondratieff-Zyklen</span></i></b></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 12pt;"></span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 12pt;">Der russische
Wirtschaftswissenschaftler <a href="https://de.wikipedia.org/wiki/Kondratjew-Zyklus">Nikolai Kondratjew</a> (1892-1938)
entwickelte die Theorie der zyklischen Wirtschaftsentwicklung in langen Wellen.
Ausgangspunkt für die Langen Wellen sind Paradigmenwechsel und die damit
verbundenen innovationsinduzierten Investitionen. Es wird massenhaft in neue
Techniken investiert und damit ein Aufschwung hervorgerufen. Nachdem sich die
Innovation allgemein durchgesetzt hat, verringern sich die damit verbundenen
Investitionen drastisch und es kommt zu einem Abschwung. </span></p>
<p align="center" class="MsoNormal" style="line-height: normal; margin-bottom: 0cm; text-align: center;"><span face=""Arial","sans-serif"" style="font-size: 12pt; mso-fareast-language: DE; mso-no-proof: yes;">
</span><span face=""Arial","sans-serif"" style="font-size: 12pt;"></span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0.0001pt; text-align: center;"><span face=""Arial","sans-serif"" style="font-size: 12pt;"> <img alt="" height="303" 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" width="434" /></span></p>
<p align="center" class="MsoNormal" style="line-height: normal; margin-bottom: 0cm; text-align: center;"><span face=""Arial","sans-serif"" style="font-size: 10pt;">Kondratieff-Zyklen (Quelle: Wikipedia)</span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 12pt;"></span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 12pt;">Populär
gemacht wurde die Darstellung von dem Österreicher Joseph Schumpeter (1883-1950).
Die Nutznießer von Kondratieff 5 seien die Chinesen und Inder, die massenhaft
in Arbeit gebracht wurden. Die Frage stellt sich, was wohl den nächsten Zyklus
auslösen könnte, nämlich Kondratieff 6. Dueck tippt auf Erfolge der Medizin und
der Kosmetik, die den Effekt hätten, die Gesundheit und das Aussehen des Menschen
grundlegend zu verbessern. Hier gäbe es ein enormes Potential. Schauen mir mal!</span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 12pt;"></span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span face=""Arial","sans-serif"" style="font-size: 12pt;">Maslow-Pyramide
und McGregors Theorie</span></i></b></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 12pt;"></span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 12pt;">Abraham
Maslow (1908-1970) hatte in fünf Stufen die Grundbedürfnisse des Menschen
definiert. Auf der Spitze lag die Selbstverwirklichung. Dueck sagt, das sei
widerlegt. Ich weiß nicht mehr wie und von wem.</span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 12pt;"></span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 12pt;">Douglas
McGregor (1906-1964) war ein MIT-Professor, dessen X,Y-Theorie von 1964 weltweit
alle Management-Seminare Jahrzehnte lang beschäftigte. Sein Gedankengebäude
wurde 1981 von William Ouchi (*1943) um die Theorie Z erweitert. </span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 12pt;"></span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 12pt;">NB: Mathematik
ist genau so abstrakt wie VWL, nur behauptet sie nicht, Antworten geben zu
können.</span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 12pt;"></span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span face=""Arial","sans-serif"" style="font-size: 12pt;">Ökonomie
2.0</span></i></b></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 12pt;"></span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 12pt;">Es ist
längst schon so, dass sich auf vielen Gebieten Arbeitsgemeinschaften über
Ländergrenzen hinweg entwickeln. Bei vielen Projekten wird ehrenamtliche Arbeit
eingebracht, und zwar in großem Stil. Es komme die Zeit, wo neue Kirchen und
neue Staaten entstehen, die sich wie englische Clubs gebärden. Das Beispiel
Second Life hatte großen Erfolg mit seiner eigenen Währung, den Linden-Dollars [Mir
scheint es eher sehr ruhig geworden zu sein. Ich weiß nicht warum]. Noch gibt
es keine nur im Internet vorhandenen Staaten mit eigenen Steuern und Armenhilfe.
Sie würden Heimat und Gemeinschaft anbieten [Darüber wird schon des Längeren
geredet. Passiert ist nichts dergleichen. Vielleicht waren die Zeiten zu
unruhig. Auch hier konnte Corona bremsend wirken]. </span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 12pt;"></span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 12pt;">NB: Dass
es Altersheime in Hochhäusern oder in Osteuropa geben soll, darüber wird zwar
gemunkelt, aber nicht offen dafür geworben. </span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 12pt;"></span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span face=""Arial","sans-serif"" style="font-size: 12pt;">Neue Geschäftsmodelle</span></i></b></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 12pt;"></span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 12pt;">Der Autor
kann sich vorstellen, dass Firmen wie IBM sich als Gemeinschaften freier
Entwickler entpuppen. Sie ergäben die Grundpfeiler (engl. <i style="mso-bidi-font-style: normal;">keystone)</i>, an denen sich andere, vor allem kleinere Firmen anlehnen
könnten. Sie würden Kooperation anstatt Konkurrenz als Grundmodell pflegen.</span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 12pt;">Anstatt
Managern würden Leader gebraucht. Sie führen anstatt nur anzutreiben. Sie
ließen sich dabei von McGregors Menschenbild Y leiten. Die Projektteilnehmer
könnten Bewertungspunkte sammeln ähnlich wie bei eBay, um Vertrauen aufzubauen.
Kooperative Infrastrukturen böten sich auf vielen Gebieten an, etwa in der Telemedizin.
Das von Toyota hochgehaltene Kaizen-Prinzip sollte Schule machen, damit Qualität
die Regel wird und Schund vermieden wird. Ein mittlerer Weg zwischen Großinvestition
und Nachhaltigkeit sollte angestrebt werden. </span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 12pt;"></span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span face=""Arial","sans-serif"" style="font-size: 12pt;">Phasischer
Instinkt</span></i></b></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 12pt;"></span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 12pt;">Es sei
ein phasischer Instinkt (engl. <i style="mso-bidi-font-style: normal;">phasic
instinct</i>), der uns beherrsche. Was damit gemeint ist, konnte ich selbst
nach einigem Suchen nicht herausfinden. Alles würde sich damit ändern.</span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 12pt;"></span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 12pt;">NB: Noch
gibt es keine mathematischen Modelle, die den Instinkt mit einbeziehen.</span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 12pt;"></span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span face=""Arial","sans-serif"" style="font-size: 12pt;">Nach-Corona-Zukunft</span></i></b></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 12pt;"></span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 12pt;">Die Corona-Zeit
hindert uns daran, manche der bisherigen Pläne zu realisieren. Vielleich
vermeiden wir das Drehen des Hamsterrads, ohne auch Wohlstand und Gesundheit zu
verbessern. Vielleicht entdecken wir sogar in 20 Jahren einen Nachholbedarf in Büroneubauten.</span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 12pt;"></span></p>
<p><span face=""Arial","sans-serif"" style="font-size: 12pt;">NB: Ich
werde in der Corona-Zeit und vermutlich auch danach nie ganz auf die Ideen des Ex-Kollegen
Dueck abfahren. Dueck stammt aus der Bielefelder Gegend, ich aus der Südeifel. Er wurde Mathematiker, ich</span><span face=""Arial","sans-serif"" style="font-size: 12pt;"><span face=""Arial","sans-serif"" style="font-size: 12pt;"> Ingenieur.</span> Das erklärt aber die unterschiedlichen Prägungen nur zum Teil. </span> <br /></p>Bertal Dresenhttp://www.blogger.com/profile/01435152037884170636noreply@blogger.com0tag:blogger.com,1999:blog-8476761749021763994.post-40382282076459305562020-09-14T10:58:00.010+02:002020-09-16T08:44:14.365+02:00Moria und die Moral der Flüchtlingspolitik<p></p><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 18pt;">Es
geschieht derzeit jede Woche, dass mir die Süddeutsche Zeitung (SZ) den </span><a href="https://www.sueddeutsche.de/politik/fluechtlinge-moria-bibel-1.5030372"><span face=""Arial","sans-serif"" style="font-size: 18pt;">Leitartikel</span></a><span face=""Arial","sans-serif"" style="font-size: 18pt;"> ihres
Star-Kolumnisten Heribert Prantl zuschickt. Obwohl die SZ als Massenmedium
anzusehen ist, werde ich meistens vom Autor persönlich angesprochen.
Personalisierte Massensendungen sind für mich nichts Neues. Das konnte man
schon vor 30 Jahren.</span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 18pt;"></span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 18pt;">Dieses
Wochenende erhielt ich – wer weiß warum – den Leitartikel vom 2. August 2020,
überschrieben mit dem Titel <i style="mso-bidi-font-style: normal;">Moria, das
Brandopfer</i>. Vielleicht ist der Grund, dass man diesen Text auswählte, die
Überzeugung der<span style="mso-spacerun: yes;"> </span>Werbeabteilung der SZ,
dass das Thema Flüchtlinge von allgemeinem Interesse ist, und dass Prantls
Aussagen sehr treffend sind. Mit beiden Annahmen liegt man richtig. Obwohl ich
die SZ seit über einem Jahr im Abo beziehe, wundert es mich, warum ich immer
noch mit Einzelartikeln beworben werde, die ich zum Erscheinungszeitpunkt
gelesen hatte. Dies besagt, dass die Werbung bei vorhandenen Kunden besser
durchdacht werden sollte. Das nur nebenbei.</span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 18pt;"></span><b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span face=""Arial","sans-serif"" style="font-size: 18pt;">Dilemma
der Flüchtlingspolitik</span></i></b></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 18pt;"></span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 18pt;">Die
Aussage des Beitrags gipfelt in den Satz: .<i style="mso-bidi-font-style: normal;">Es
gibt eine Politik, die den Tod von Menschen wegen angeblicher Sachzwänge, wegen
höherer Interessen in Kauf nimmt. Diese Politik heißt Flüchtlingspolitik.‘ </i></span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><i style="mso-bidi-font-style: normal;"><span face=""Arial","sans-serif"" style="font-size: 18pt;"></span></i></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 18pt;">Heribert
Prantl zieht eine Parallele zu den antiken Religionen, bei denen Menschenopfer
zum Ritual gehörten. Sie dienten dazu, die Götter zu besänftigen. Die heutige
Flüchtlingspolitik gehorcht zwar keinen Göttern, sie nimmt jedoch massenhaft
Menschenopfer in Kauf.</span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 18pt;"></span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span face=""Arial","sans-serif"" style="font-size: 18pt;">Schreiende
Bilder</span></i></b></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 18pt;"></span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 18pt;">In
regelmäßigen Abständen bieten uns die Medien Bilder an, die sich nur in ihrer Dramatik
unterscheiden. Mal ist es ein Fischerkahn, der mit schwarzen Körpern überladen
ist und gerade zu versinken droht. Mal ist es ein 8-jähriger Junge, der allein
und tot am Strand liegt. Diese Bilder sichern den Medien Massenauflagen und
sind der Gesprächsstoff ganz Europas für eine Woche. Danach setzt sich der alte
Trott weiter fort oder es folgt der Bericht über eine neue Pandemie.</span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 18pt;">Alle Politiker,
die gerade eine Rede halten müssen, sagen, dass endlich etwas geschehen müsse,
um diese Art von Bildern in Zukunft zu vermeiden. Sofern sie ehrlich sind,
sagen die Politiker, dass sie entweder nicht wissen, was zu tun sei, oder aber,
dass das Problem nur an seiner Wurzel angegangen werden könnte.</span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 18pt;"></span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span face=""Arial","sans-serif"" style="font-size: 18pt;">Des Volkes
Reaktion</span></i></b></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 18pt;"></span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 18pt;">Nehmen Politiker
die Vorschläge der Presse (und der Kirchen und der sozialen Verbände) ernst, werden
sie von ihren Wählern schnell eines Besseren belehrt. Es muss eine der
schmerzlichsten Erfahrungen von Angela Merkel gewesen sein, dass sie im Jahre
2015 plötzlich vor einem Scherbenhaufen stand. ‚Wir schaffen das‘ hatte sie
gesagt, als sie Deutschlands Grenzen für Flüchtlingsströme öffnen ließ. Sie
musste sich auf der Straße beschimpfen und anpöbeln lassen und hat seither eine
Konkurrenzpartei mehr, die AfD.</span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 18pt;"></span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span face=""Arial","sans-serif"" style="font-size: 18pt;">Lehren
von 2015</span></i></b></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 18pt;"></span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 18pt;">Keine
deutsche Partei wagt es noch, offen für die Aufnahme von Flüchtlingen
einzutreten. Grüne und Linke drucksen sich um das Problem herum. Die Parteien
in anderen europäischen Ländern wie Polen, Ungarn und Österreich sprechen sich
dafür aus, ihre Grenzen gegenüber Flüchtlingen ganz zu schließen. Alle sagen,
dass es ihre primäre Aufgabe sei, auf ihre eigenen Bürger zu hören und diese zu
schützen.</span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 18pt;">Angela Merkel
gelang es, ein Lösung auszuhandeln, die kaum zu überbieten ist, wenn von Realpolitik
geredet wird. Sie verhandelte mit Recep Tayyip Erdogan einen Milliarden-Vertrag,
nach dem die Türkei Flüchtlinge, die nach Europa möchten, zurückhält. Hin und
wieder droht Erdogan damit, diesen Vertrag zu lockern.</span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 18pt;"></span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span face=""Arial","sans-serif"" style="font-size: 18pt;">Moria
und die Moral</span></i></b></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 18pt;"></span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 18pt;">Wer das
Flüchtlingslager Moria auf der Insel Lesbos in Brand steckte, ist unklar. Es
ist Griechenland zuzutrauen, aber auch den Flüchtlingen selbst. In beiden Fällen
ist anzunehmen, dass die Flüchtlinge sich in kleinen Gruppen in Richtung Mitteleuropa
in Bewegung setzen werden.</span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 18pt;"></span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face=""Arial","sans-serif"" style="font-size: 18pt;">Flüchtlinge
haben oft keine Moral. Sie stellen nur Forderungen: ‚Helft mir oder ich mache Euch
Ärger‘. Peinliche Bilder ist nur der eine Weg. Der andere heißt: ‚Wir
blockieren Eure Grenzen und Verkehrswege. Oder wir verunsichern Eure Ortszentren‘.
Sie wollen und können nicht verhandeln, weil sie über keine Gruppenstruktur
verfügen, die über Klein-Familien hinausgeht. <br /></span></p><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span style="font-family: arial;"><span face=""Arial","sans-serif"" style="font-size: 18pt;"><b><i><span style="font-size: large;">Ein erster Nachtrag vom 14.9.2020 </span><br /></i></b></span></span></p><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span style="font-size: large;"><span style="font-family: arial;"><span face=""Arial","sans-serif""><i><span>Gabor Steingard schrieb: Alle verantwortungsbewussten Politiker wissen, dass die einfache
Lösung - die schnelle Aufnahme und Verteilung von 12.000 Migranten – in
Wahrheit keine Lösung, sondern nur die Verschärfung des Problems bringt. Noch bevor die Bäume in Lesbos die Blätter werfen, wäre das Lager Moria 2 wieder gefüllt. Die Chefs der Schleuserbanden warten nur darauf, dass ihre Außendienstmitarbeiter auf Lesbos melden: läuft. </span></i></span></span></span></p><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"></p><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span style="font-size: large;"><i><b><span><span style="font-family: arial;"><span face=""Arial","sans-serif""><span>Noch ein Nachtrag vom 15.9.2020<br /></span></span></span></span></b></i></span></p><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span style="font-size: large;"><span style="font-family: arial;"><span face=""Arial","sans-serif""><span>Bei jedem Pauschalurteil. das man über größere Personengruppen fällt, liegt man unweigerlich in Teilen daneben. Das passierte auch in diesem Beitrag mit der als Flüchtlinge bezeichneten Gruppe. Weltweit gibt es Millionen von Flüchtlingen. Das sind Personen, die ihren angestammten Wohnsitz meist unter Zwang verlassen mussten. Die Haltung, die ich hier allen Flüchtlingen unterstellte - dass sie nämlich nur fordernd auftreten - ist keineswegs generell vorherrschend. An zwei Beipielen will ich das Gegenteil beweisen.</span></span></span></span><span style="font-size: large;"><i><b><span><span style="font-family: arial;"><span face=""Arial","sans-serif""><span> <br /></span></span></span></span></b></i></span></p><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span style="font-size: large;"><span style="font-family: arial;"><span face=""Arial","sans-serif""><span>Im Sommer des Jahres 1945 wurden die aus Osteuropa vertriebenen Personen von den Behörden in Westdeutschland ein Wohnsitz zugewiesen. Die Behörden hatten Nachrichten-Anschläge gemacht, die besagten, dass an einen bestimmten Tag der folgenden Woche zwei Familien meinem Heimatdorf zugeteilt würden. Mein Dorf liegt nur wenige Kilometer von der Luxemburgischen Grenze entfernt. Genau am vorher angekündigten Tag, etwa gegen 10 Uhr, wurden die beiden Familien mit einem Kleinbus gebracht und in der Dorfmitte ausgeladen. Der Ortsbürgermeister war zur Stelle, sowie sein Stellvertreter, aber auch etwa ein Dutzend Kinder im Alter zwischen 8-12 Jahren. Das Dorf hatte damals etwa 300 Einwohner, auf 30-40 Einfamilienhäusern verteilt. Für beide Familien hatte die Gemeinde Wohnraum geschaffen und provisorisch möbliert. Das Eine war ein ehemaliges Schulgebäude, genau in der Dorfmitte, das abgerisssen werden sollte, nachdem die Gemeinde am Ortsrand ein größeres Schulgebäude errichtet hatte. Es hatte 3-4 Jahre lang leergestanden. </span></span></span></span></p><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span style="font-size: large;"><span style="font-family: arial;"><span face=""Arial","sans-serif""><span>Die Familie, der dieses Gebäude zugewiesen wurde, stammte aus Pommern und hatte zwei Kinder zwischen 10-14 Jahren. Die Kinder gingen mit uns anderen Kindern in die Dorfschule. Sie spielten mit uns und lernten unseren Dialekt. Später lernte der Junge den Schlosserberuf und das Mädchen wurde Krankenschwester. Die Eltern halfen bei den Bauern als Erntehelfer. Die zweite Familie stammte aus Schlesien und hatte Kinder, die noch nicht schulpflichtig waren. Ihnen wurde ein von der deutschen Wehrmacht am Dorfrand errichtetes Einfamilienhaus zugewiesen. Diese Familie wohnt heute noch dort, d.h. eines ihrer Kinder mit seiner Familie. Die andere Familie baute sich ein kleines Eigenheim, ebenfalls am Dorfrande. Beide Familien haben sich voll integriert. Nur die Namen hören sich polnisch an.<br /></span></span></span></span></p><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span style="font-size: small;"><span style="font-family: arial;"><span face=""Arial","sans-serif""><span style="font-size: medium;"><span style="font-size: large;">Mit dem zweiten Fall kam ich rund 30 Jahre später in Berührung. Als 1978 der Vietnamkrieg zu Ende ging, flohen viele Menschen per Boot aufs Meer hinaus. Dort lagen Rettungsschiffe, wie z. B. die deutsche Cap Anamur des Rupert Neudeck, um diese Menschen (engl. <i>boat people</i>) in Empfang zu nehmen. Ein bestimmter Prozentsatz fand Aufnahme in Deutschland. Darunter war ein junger Mann, der anschließend in Deutschland ein Informatik-Studium abschloss. Er bewarb sich bei der Firma, wo ich tätig war, und wurde eingestellt. Er war ein stets freundlicher, sehr gewissenhafter Kollege, dem technische Aufgaben sehr viel Freude machten. Er blieb bei dieser Firma bis zu seiner Pensionierung, also mindestens 20 Jahre. Vor Kurzem erfuhr ich, dass seine Tochter in Deutschland ein Ingenieurstudium absolviert hat und inzwischen bei der Europäischen Raumfahrtbehörde (ESA) eine Hauptabteilung leitet.</span></span><i><br /></i></span></span></span></p>
Bertal Dresenhttp://www.blogger.com/profile/01435152037884170636noreply@blogger.com0tag:blogger.com,1999:blog-8476761749021763994.post-75450826970953360572020-09-06T14:22:00.017+02:002020-09-08T19:56:39.450+02:00Wo 10-fache Verbesserungen möglich und/oder erstrebenswert sind<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Frank Thelen (*1976) ist ein aus Bonn stammender
Wagniskapitalgeber, der mit einem Buch für seine Ideen wirbt. Das Buch heißt <i style="mso-bidi-font-style: normal;">10xDNA: Das Mindset der Zukunft (</i>2020, 255
Seiten). Mit dem Buch will er erklären, welche Technologien und vor allem
welche Denkweisen in den kommenden Jahrzehnten zum wirtschaftlichen Erfolg
führen. Thelen ist TV-Zuschauern bekannt, weil er dort bis vor kurzem eine
populäre Sendung anbot.</span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;"></span><b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Technologien mit 10x-Zukunft</span></i></b></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;"></span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">In früheren Beiträgen dieses Blogs wurde über Technologien
gesprochen, die eine besondere Bedeutung für die Zukunft haben werden. In
dem Buch von Thelen geht es primär um solche Technologien, die das Potential eines 10x-Effekts
haben. Gemeint ist ihre Wirkung auf Verarbeitungsleistung, Energieersparnis,
Anschaffungskosten, Platzbedarf, Verlässlichkeit und Sicherheit. Traditioell gab man sich mit einer Verbesserung von 8-10% zufrieden, wenn man ein neues Verfahren einführte. Das sei konservatives Denken und immer seltener attraktiv und rentabel. Der Autor bemüht sich, komplex erscheinende Techniken für Laien
verständlich zu erklären. So vergleicht er Quantencomputer mit einer Münze, die
hoch geworfen wurde. </span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face="" style="font-size: 10pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Die Münze (= das Qubit) befindet sich während des Flugs zwischen
‚Kopf‘ und ‚Zahl‘ und nimmt erst bei der Landung einen Wert ein. Solange
verbleibt sie in der Superposition. Beim normalen Computer liegt die Münze (=
der Transistor) nur auf ‚Kopf‘ oder auf ‚Zahl‘.“</span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;"></span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Mit derselben Herangehensweise werden 3D-Drucker und Blockchain behandelt. Ob allein
durch die Auflistung der Beispiele bereits ein „neues Mindset“ entsteht, ist
fraglich. Hier hätte ich mehr erwartet als einen vagen Aufruf, „die Chancen
neuer Technologien mutig und konsequent umzusetzen“, um auch in Zukunft
erfolgreich zu bleiben.</span><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;"> </span>
</p><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Vergangene Beispiele</span></i></b><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;"> </span>
</p><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Diejenigen Technologien und Firmen, die Europa wirtschaftlich in
den Hintergrund drängten, basierten auf einer 10x-Mentalität. Das galt für
Apple und Google. Das neueste Beispiel ist Tesla. Diese Firma ist inzwischen
mehr wert als VW und BMW zusammen. Es muss aber nicht die Technologie sein, die
den Unterschied macht. Dass die vielen Videotheken verschwanden, lag daran,
dass Netflix ein überlegenes Geschäftsmodell besaß. Die Hilfe durch die
Technologie (Streaming) kam später. Amazon hat technologisch nichts Besonderes
zu bieten, statt dessen gibt es 23 Kategorien von Service.</span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Konkrete Beispiele für die Zukunft<br /></span></i></b></p>
<p class="MsoListParagraph" style="line-height: normal; margin-bottom: 0cm; mso-add-space: auto;"><b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">KI
und Robotik: </span></i></b><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Die KI hat das Potential in sehr
vielen Bereichen als großer Beschleuniger in Erscheinung zu treten. In
Gastronomie und Pflege kann die Kombination mit Fortschritten in der Robotik
eine Breitenwirkung auslösen. (Ein früherer Eintrag war diesem Anwendungsgebiet gewidmet) Eine sogenannte Starke KI hält man für unwahrscheinlich,
stattdessen empfiehlt man mehr Kooperation mit schwacher KI.</span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;"></span></p>
<p class="MsoListParagraph" style="line-height: normal; margin-bottom: 0cm; mso-add-space: auto;"><b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Block
Chain: </span></i></b><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Die Block Chain ermöglicht eine
Sicherheit für Geldgeschäfte aller Art, wie sie uns bisher nicht möglich war. Sie
erlaubt neue Unternehmensformen, so die Dezentrale Autonome Organisation
(DAO).</span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;"></span></p>
<p class="MsoListParagraph" style="line-height: normal; margin-bottom: 0cm; mso-add-space: auto;"><span style="font-family: Symbol; font-size: 12pt; mso-bidi-font-family: Symbol; mso-fareast-font-family: Symbol;"><span style="mso-list: Ignore;"><span style="font: 7pt "times new roman";"></span></span></span><b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">3D-Drucker: </span></i></b><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Wir können uns kaum noch einen
Baustoff vorstellen, der nicht von 3D-Druckern verarbeitet werden kann. <span style="mso-spacerun: yes;"> </span>Begonnen hat es mit Kunststoff, Keramik,
Metallen, aber auch Papier, es folgten Glas, Beton und Knochen. Neuere
Experimente wagen sich an organisches, ja lebendes Material. Der große Vorteil
ist, dass die Fertigung rein additiv ist. Es werden dadurch Materialkosten bis
zu 90% gespart. Auch die Prozess- und Verarbeitungskosten fallen stetig. Es
werden keine Werkzeuge mehr benötigt, die je nach Werkstück gewechselt werden
müssen. Man kann verschiedene Materialien (Metall, Polymere) in einem Schritt
verarbeiten. Dem gegenüber steht, dass es keine Mengenvorteile (engl. <span style="mso-spacerun: yes;"> </span><i style="mso-bidi-font-style: normal;">economy
of scale) </i>mehr gibt.<i style="mso-bidi-font-style: normal;"> </i>Im Buch
enthalten sind Fotos von Wohnhäusern, die auf einem 3D-Drucker entstanden sind.</span></p>
<p class="MsoListParagraph" style="line-height: normal; margin-bottom: 0cm; mso-add-space: auto;"><span style="font-family: Symbol; font-size: 12pt; mso-bidi-font-family: Symbol; mso-fareast-font-family: Symbol;"><span style="mso-list: Ignore;"><span style="font: 7pt "times new roman";"></span></span></span><b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Bionik,
Genetik und Medizintechnik: </span></i></b><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Bionik ist ein sogenanntes
Kofferwort, gebildet aus Biologie und Technik. Gesucht werden Lösungen oder
Prinzipien, die sich von der Biologie auf die Technik übertragen lassen. Ein
Beispiel ist der von dem Schweizer Georges de Mestral nach dem Vorbild von
Kletten erfundenen Klettverschluss.</span></p>
<p class="MsoListParagraphCxSpFirst" style="line-height: normal; margin-bottom: 0cm; mso-add-space: auto;"><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Das </span><a href="https://de.wikipedia.org/wiki/CRISPR/Cas-Methode"><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">CRISPR</span></a><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">-Verfahren
(engl: <i style="mso-bidi-font-style: normal;">Clustered Regulary Interspaced
Short Palidromic Repeats</i>) gestattet es, Gene gezielt zu zerschneiden. Es
wurde von LOCUS Biosciences entdeckt. Das Verfahren erlaubt es, dass Gene
eingefügt, entfernt oder ausgeschaltet werden können. Wegen seiner einfachen
Durchführung, der Skalierbarkeit hinsichtlich unterschiedlicher Zielsequenzen
und der geringen Kosten wird die Methode zunehmend in der Forschung eingesetzt.
</span></p>
<p class="MsoListParagraphCxSpMiddle" style="line-height: normal; margin-bottom: 0cm; mso-add-space: auto;"><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;"></span></p>
<p class="MsoListParagraphCxSpLast" style="line-height: normal; margin-bottom: 0cm; mso-add-space: auto;"><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Von Endoprothesen spricht man beim
Ersatz von Gelenken durch dauernd im Körper verbleibende Implantate. Am
häufigsten sind in Deutschland die künstlichen Hüftgelenke. Sie sind bei uns um
ein Vielfaches häufiger als in anderen Ländern. Ähnlich ist es bei künstlichen
Kniegelenken. Die Anfertigung beider per 3D-Drucker ist naheliegend. Die für
den menschlichen Körper per 3D-Drucker zu erzeugenden Ersatzteile müssen sich
nicht auf Knochen beschränken. Zellen und Blutgefäße kommen ebenfalls in Frage.</span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;"></span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Kernfusion als langfristige Energiequelle</span></i></b></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;"><span style="mso-spacerun: yes;"></span></span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Die Abhängigkeit von fossiler Energie wird noch eine Weile
anhalten. Leider sind die Sonnen- und Windenergie nur sehr unstete Quellen.
Langfristig bietet sich nur die Kernfusion als echte Lösung unseres
Energieproblems an. Bei der Kernfusion liefert 1 g Wasserstoff die gleiche
Energie wie 11 Tonnen Steinkohle oder 10.000 l Heizöl. Der Betrieb eines
Fusionsmeilers benötigt eine Temperatur von 100 Mio. Grad Celsius. Das
französische Projekt ITER soll 2025 in Betrieb gehen.</span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;"></span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Neue Nahrungsmittel</span></i></b></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;"></span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Heute muss Fleisch nicht ausschließlich von Tieren stammen. Es
kann auf der Basis von Erbsen, Reis oder Sonnenblumen mit gleicher Qualität
hergestellt werden. Es gibt dies bereits als Whopper bei Burger King. </span><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Ausgezeichnete Salate können aus einem stillgelegten Bunker oder aus
einem U-Bahn-Schacht stammen. Für die Aufzucht stehen spezielle LEDs zu
Verfügung.</span>
</p><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;"></span><b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Neue Verkehrsmittel</span></i></b></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;"></span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Das nächste Jahrzehnt wird voller Disruptionen sein, besonders im Verkehrswesen.
Von E-Autos reden alle, die selbstfahrenden LKWs der schwedischen Firma Einride beeindrucken die Experten. Endlich werden wir es schaffen, den Verkehr
von der Straße weg zu bringen. Flugtaxis und Drohnen sind dafür die Lösung, gleich ob
von Menschen gesteuert oder selbst-steuernd. Zu erwarten ist ein City-Airbus von
der Firma Uber ab 2023. Er wird ein Senkrechtstarter im doppelten Sinne werden,
im Gelände und an der Börse.</span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;"></span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Beispiel Freigeist Capital</span></i></b></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">W<span style="mso-spacerun: yes;"></span>as mit 10x-Denken möglich
ist, zeigt Thelen anhand der Investitionen seiner Firma<span style="mso-spacerun: yes;"> </span>Freigeist Capital. Sie unterstützt die
folgenden europäischen Gründer</span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;"></span></p>
<ul style="text-align: left;"><li><span style="font-family: Symbol; font-size: 12pt; mso-bidi-font-family: Symbol; mso-fareast-font-family: Symbol;"><i>Lilium
Aviation</i> bietet einen Lufttaxi-Dienst an (hat bereits 500 Mitarbeiter),<span style="mso-list: Ignore;"><span style="font: 7pt "times new roman";"> <br /></span></span></span></li><li><i><span style="font-family: Symbol; font-size: 12pt; mso-bidi-font-family: Symbol; mso-fareast-font-family: Symbol;"><span style="mso-list: Ignore;"><span style="font-family: "times new roman"; font-feature-settings: normal; font-kerning: auto; font-language-override: normal; font-optical-sizing: auto; font-size-adjust: none; font-size: 7pt; font-stretch: normal; font-variant: normal; font-variation-settings: normal; font-weight: normal; line-height: normal;"> </span></span></span></i><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;"><i>Hardt Hyperloop</i> ermöglicht Transport mittels unterirdischer
Röhren,</span></li><li><span style="font-family: Symbol; font-size: 12pt; mso-bidi-font-family: Symbol; mso-fareast-font-family: Symbol;"><span style="mso-list: Ignore;"><span style="font: 7pt "times new roman";"> </span></span></span><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;"><i>Kraftblock</i> ist ein Energiespeicher,</span></li><li><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;"><i>Neufund </i>betreibt eine Blockchain, </span></li><li><span style="font-family: Symbol; font-size: 12pt; mso-bidi-font-family: Symbol; mso-fareast-font-family: Symbol;"><i>Smartlane</i> bietet KI-Lösungen für die Logistik,<span style="mso-list: Ignore;"><span style="font: 7pt "times new roman";"> <br /></span></span></span></li><li><span style="font-family: Symbol; font-size: 12pt; mso-bidi-font-family: Symbol; mso-fareast-font-family: Symbol;"><span style="mso-list: Ignore;"><span style="font: 7pt "times new roman";"> </span></span></span><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;"><i>EnduroSat</i> baut und startet Nanosatelliten,</span></li><li><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;"><i>Yfood</i> liefert Mahlzeiten aus, </span></li><li><span style="font-family: Symbol; font-size: 12pt; mso-bidi-font-family: Symbol; mso-fareast-font-family: Symbol;"><span style="mso-list: Ignore;"><span style="font: 7pt "times new roman";"> </span></span></span><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;"><i>Air
up</i> fügt Wasser Duftstoffe bei.</span></li></ul>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><i><b><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Beimessung von Werten </span></b></i></p><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Wenn immer wir uns für eine Sache engagieren, so sollte es sich vorzugsweise um Dinge mit Wert handeln. Es ist durchaus nicht trivial festzustellen oder festzulegen, wie Werte bemessen werden. Ein Wert existiert nicht an sich, sondern primär im Auge eines Betrachters. Dinge, die teuer sind in ihrer Herstellung, haben nicht immer einen hohen Wert. Ebenso gilt das Umgekehrte: Ein Gegenstand, der relativ leicht herzustelllen ist, kann teuer verkauft werden, also als wertvoll angesehen werden. </span></p><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Ein Stein oder ein Stück Holz, das von einem angesehenen Künstler bearbeitet wurde, steigt im Wert, auch dann, wenn die Bearbeitung innerhalb von nur 10 Minuten abgeschlossen war. Einer Firma wie Apple gelingt es, Telefone, für die andere Lieferanten weniger als 70 Euro nehmen, für mehr als 700 Euro zu verkaufen. Sie bringen ihren Ruf, den sie anderswo erorben haben, mit zur Geltung.</span></p><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Fast als skandalös ist das Verhalten von Firmen zu bezeichnen, die die Anzahl hergestellter Produkte künstlich begrenzen, um den Preis hochzuhalten. Dass bei einem berühmten Künstler die Produktivität durch seine geistigen und physischen Kräfte limitiert ist, ist selbstverständlich. Da seine Lebensdauer endlich ist, kann sein Tod den Wert seiner Werke noch einmal in die Höhe treiben. Von Wert und Preis als unterschiedliche Begriffe zu reden, ist nicht sehr hilfreich.<br /></span></p><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"></p><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Zwei mysteriöse Begriffe</span></i></b></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;"></span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Der Autor hält es für angebracht, zwei Begriffe zu erklären, die
in diesem Zusammenhang immer wieder auftauchen.</span></p>
<ul style="text-align: left;"><li><span style="font-family: Symbol; font-size: 12pt; mso-bidi-font-family: Symbol; mso-fareast-font-family: Symbol;"><span style="mso-list: Ignore;"><span style="font: 7pt "times new roman";"></span></span></span><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Serendipität
(engl. <i style="mso-bidi-font-style: normal;">serendipity</i>): Erfolg bei
Zufallsentdeckungen. Vermutlich geht der Ausdruck auf das persische Märchen der
drei Prinzen von Serendip zurück. Gemeint war damit die heute als Sri Lanka
bezeichnete Insel. Als Beispiele von Serendipität gelten die Entdeckung Amerikas
1492 durch Columbus und die Entdeckung des Penicillins 1928 durch Flemming.</span></li><li><span face="" style="font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Denken
nach Ersten Prinzipien (engl. <i style="mso-bidi-font-style: normal;">First principles
thinking</i>). Der Ausdruck geht auf den Philosophen Aristoteles zurück, der
forderte, dass unser Denken frei von Widersprüchen sein müsste. Neuerdings wird
der Ausdruck vor allem von Elon Musk (*1971) propagiert, dem Gründer von Tesla und SpaceX.</span></li></ul>
Bertal Dresenhttp://www.blogger.com/profile/01435152037884170636noreply@blogger.com3tag:blogger.com,1999:blog-8476761749021763994.post-66096310145972879932020-08-29T19:11:00.010+02:002020-09-03T13:02:41.224+02:00Gabor Steingarts Sozialstaatsmodell und Europa-Narrativ
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span style="font-family: arial; font-size: small;"><span>Fast täglich lese (oder höre) ich derzeit Texte des Autors </span><a href="https://de.wikipedia.org/wiki/Gabor_Steingart"><span>Gabor
Steingart</span></a><span> (*1962). Nicht immer haben sie mich derart beeindruckt wie die
beiden Texte, die soeben in seinem Hörbuch mit dem Titel <i>Die unbequeme Wahrheit</i> (2020, 220 Seiten, 4:14 h Dauer) erschienen.
Das Buch hat den Untertitel <i>Eine Rede zur
Lage unserer Nation</i>. Beide Themen werden am Schluss dieses Buches behandelt.</span></span></p><span style="font-family: arial; font-size: small;">
</span><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span style="font-family: arial; font-size: small;"><span><b><i><span>Ein neues Modell für den deutschen Sozialstaat</span></i></b></span></span></p><span style="font-family: arial; font-size: small;">
</span><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span style="font-family: arial; font-size: small;"><span> Bekanntlich sind wir Deutsche besonders stolz auf unsern
Sozialstaat. Niemand fällt durch das Netz, das im Laufe der Jahrzehnte
aufgebaut wurde, sollte er in wirtschaftliche Schwierigkeiten geraten, sei es
aus gesundheitlichen oder andern Gründen, Kaum ein Politiker − der nicht gerade
zur FPD oder AfD gehört − versäumt es, dies bei jeder Gelegenheit rühmlich
hervorzuheben. Unterschlagen wird dabei fast immer, dass diese Absicherung auf
Grundlagen beruht, die alles andere als stabil oder optimal sind. </span></span></p><span style="font-family: arial; font-size: small;">
</span><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span style="font-family: arial; font-size: small;"><span></span></span></p><span style="font-family: arial; font-size: small;">
</span><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span style="font-family: arial; font-size: small;"><span>An erster Stelle steht hier die sogenannte Rentenformel. Danach
richtet sich die Höhe der Rente nach der Dauer der Beschäftigung und der Höhe
des am Ende erreichten Lohnes oder Gehaltes. Die Rentenversicherung macht keine
Rücklagen aufgrund der zu erwartenden Ansprüche, sondern finanziert sich aus
den Beiträgen der noch aktiv im Arbeitsprozess befindlichen Mitglieder. <span> </span>Wegen des Geburtenrückgangs verbunden mit der zunehmenden
Lebensdauer der Alten übersteigt die Anzahl der Rentner die Anzahl der aktiven
Mitglieder immer mehr. Eigentlich müssten die Renten laufend gekürzt und/oder
die Versicherungsbeiträge laufend erhöht werden. Da dies politisch nicht
durchsetzbar ist, griff man schon vor längerer Zeit auf einen Ausgleich mit
Hilfe von Steuergeldern zurück. Die Allgemeinheit garantiert sozusagen, was der
Staat einzelnen Bürgern versprochen hat.</span></span></p><span style="font-family: arial; font-size: small;">
</span><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span style="font-family: arial; font-size: small;"><span>Das Hauptproblem unserer heutigen Lösung besteht darin, dass die
Altersversicherung mit dem Lohn- und Gehaltssystem gekoppelt, also an den
lokalen Arbeitsmarkt gebunden ist. Eine Alternative wäre eine Absicherung durch
eine Kapitaldeckung. Diesen Weg geht bekanntlich Norwegen seit Jahrzehnten. Die
hier gewählte Form ist die eines Staatsfonds. Der große Vorteil ist, dieser
Fonds ist von der Leistung der norwegischen Wirtschaft unabhängig. Anlagen
werden da getätigt, wo gerade die Wirtschaft wächst und floriert. Das kann in
Amerika, Afrika <span> </span>oder Asien sein. Das
einzige zu lösende Problem besteht darin, die notwendigen Experten zu gewinnen.</span></span></p><span style="font-family: arial; font-size: small;">
</span><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span style="font-family: arial; font-size: small;"><span></span></span></p><span style="font-family: arial; font-size: small;">
</span><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span style="font-family: arial; font-size: small;"><b><i><span>Ein Narrativ für Deutschland und Europa</span></i></b></span></p><span style="font-family: arial; font-size: small;">
</span><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span style="font-family: arial; font-size: small;"><b><i><span></span></i></b></span></p><span style="font-family: arial; font-size: small;">
</span><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span style="font-family: arial; font-size: small;"><span>Es gehört schon fast zum ständigen Klagegesang, dass es uns
Europäern an der zündenden Idee für den Zusammenschluss mangelt. Vielleicht ist
sie uns im Laufe der Jahre, in denen die Kriegserinnerungen in der Versenkung
landeten, abhandengekommen. Gerade in Deutschland scheinen die Pessimisten und
Grießkrämer die Wortführer zu sein. Es gibt so viele Dinge, vor denen Deutsche
sich derzeit angeblich fürchten. Beispiele sind der Islam, Überflutung durch
Afrikaner, Donald Trump, der technische Fortschritt, Datenmissbrauch und eine
zweite Corona-Welle.</span></span></p><span style="font-family: arial; font-size: small;">
</span><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span style="font-family: arial; font-size: small;"><span>Dem allen könnte durch ein neues deutsches und gleichzeitig
europäisches Narrativ entgegengetreten werden. In Frage käme ein kraftvolles
Bekenntnis zu Europas Vielfalt und Eigenverantwortlichkeit. So käme kein
anderer Erdteil an Europa heran, was die Vielfalt seiner im Weltmarkt aktiven
Klein- und Mittelunternehmen betrifft. Rund 10.000 Unternehmen seien Familienunternehmen,
die teilweise Weltmarktführer (engl. <i>hidden
champions</i>) sind. Der Anteil dieser Firmen sei in Frankreich 80%, Spanien
83%, in Italien 85% und in Deutschland 90%. Ihnen seien etwa 60% aller
Arbeitsplätze zu verdanken. </span></span></p><span style="font-family: arial; font-size: small;">
</span><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span style="font-family: arial; font-size: small;"><span></span></span></p><span style="font-family: arial; font-size: small;">
</span><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span style="font-family: arial; font-size: small;"><span>Die europäische Politik habe sich bisher oft zu großen Versprechungen
verstiegen, an die man sich später nicht hielt, zuletzt im Vertrag von Lissabon
im Jahre 2007. Würde man sich auf ein Narrativ im oben erwähnten Sinne einigen,
hätten Europas Politiker Veranlassung, sich über die damit verbundenen Aufgaben
Gedanken zu machen und ihre Politik drauf auszurichten. Das wäre ein
signifikanter Fortschritt gegenüber den heutigen Gewohnheiten. Es versteht
sich, dass ein Narrativ nur der Anfang einer breiten und lebhaften Diskussion sein
kann. Wohin diese führt ist unklar, aber sie wäre für das Projekt Europa sehr befruchtend.
</span></span></p><span style="font-family: arial; font-size: small;">
</span><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span style="font-family: arial; font-size: small;"><span>Es ist die chinesische Geschichte, die ein sehr eindrucksvolles Beispiel
dafür liefert, welche Rolle Narrative haben können. Der <a href="https://de.wikipedia.org/wiki/Zheng_He">Admiral Zheng He</a> (1371-1435)
hatte mit einer großen Flotte sieben Expeditionen im Pazifik und im Indischen Ozean
unternommen und dabei über 50.000 km zurückgelegt. Nach seinem Tode entschloss
sich die Regierung die großen Seereisen einzustellen und die Flotte zu
verkleinern. Wenig später tauchten die ersten portugiesischen und britischen Schiffe
vor Chinas Küsten auf. Sie übernahmen den Auslandshandel, vor allem den Handel
mit Opium. Sie zwangen China in die Rolle eines Junior-Partners, eine Rolle,
die China erst nach über 500 Jahren wieder abwarf. </span></span></p><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><!--[if gte mso 9]><xml>
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</p><p class="MsoNormal"><b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span face="" style="font-size: 14pt; line-height: 115%; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Nachtrag vom 31.8.2020</span></i></b></p>
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von Anregungen und Spitzen gegen Politik, Wirtschaft und Gesellschaft. Ich will
noch einige davon erwähnen.</span></p>
<p class="MsoNormal"><span face="" style="font-size: 12pt; line-height: 115%; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Wir werden von einer
Apokalypsen-Regierung regiert und haben das RKI in unseren Köpfen (RKI =
Robert-Koch-Institut, d.h. Deutschlands oberste Seuchenbehörde).</span></p>
<p class="MsoNormal"><span face="" style="font-size: 12pt; line-height: 115%; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Ein weit verbreitetes Unbehagen
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ändert.</span></p>
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<p class="MsoNormal"><span face="" style="font-size: 12pt; line-height: 115%; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Wir werden von der Bundeskanzlerin
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pflegt seine produktiven Kerne, etwa in Shenzhen.</span></p>
<p class="MsoNormal"><span face="" style="font-size: 12pt; line-height: 115%; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Der Fluss vom produktiven Kern zur
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<p class="MsoNormal"><span face="" style="font-size: 12pt; line-height: 115%; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Der Versuch Komplexität zu
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<p class="MsoNormal"><span face="" style="font-size: 12pt; line-height: 115%; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Der Staat kann die Wirtschaft
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<p class="MsoNormal"><span face="" style="font-size: 12pt; line-height: 115%; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Nur die USA und Israel versprechen
Immigranten eine erfolgreiche Zukunft. Beide Länder ziehen einen großen Nutzen daraus.</span></p>
Bertal Dresenhttp://www.blogger.com/profile/01435152037884170636noreply@blogger.com4tag:blogger.com,1999:blog-8476761749021763994.post-19534434680321256942020-08-26T20:24:00.018+02:002020-08-28T12:05:29.872+02:00KI aus Sicht einer in Deutschland lebenden Ausländerin<p><!--[if !mso]>
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</p><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face="" style="mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Kenza (196x) ist eine gebürtige Marokkanerin, die in Berlin lebt.
Ihr voller Name lautet Kenza Ait Si Abbou Lyadini. Sie ist als Senior Manager
Robotics and Artifical Intelligence bei der Deutschen Telekom in deren IT-Bereich
tätig. Sie hat ein Buch vorgelegt mit dem Titel <i style="mso-bidi-font-style: normal;">Keine Panik, ist nur Technik (2020, 224 Seiten). </i>Das Buch hat den
Untertitel: <i style="mso-bidi-font-style: normal;">Warum man auf Algorithmen
super tanzen kann und wie wir ihnen den Takt vorgeben.</i> Es ist ein Einstieg
für alle, denen die Angst vor Technik zu schaffen macht.</span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face="" style="mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;"></span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span face="" style="mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Mehr über die Autorin</span></i></b></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face="" style="mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Die Autorin sagt von sich, dass sie als kleines Mädchen ihre
Mutter gebeten habe, ihr Rechenaufgaben zu geben, sowie ein Heft mit Stift, um
Lösungen einzutragen. Diese Faszination fürs Rechnen habe sie später auf den PC
übertragen. Heute brenne sie für die
Themen KI (künstliche Intelligenz), Diversity und Networking. </span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face="" style="mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Sie genoss eine Ausbildung zum <i style="mso-bidi-font-style: normal;">Bachelor
of Engineering</i> an der Universität Valencia. Daran schloss sich ein <i style="mso-bidi-font-style: normal;">Master of Engineering </i>an<i style="mso-bidi-font-style: normal;"> </i>der Technischen Universität Berlin. Sie
nahm am Führungskräfteentwicklungsprogramm der Deutschen Telekom AG teil.
Außerdem besitzt sie den Titel <i style="mso-bidi-font-style: normal;">Certified
Scrum Master</i> der Scrum.org. Ihr Berufsweg führte von der Telecom S.L. in
Valencia und Barcelona zur T-Systems, einer Tochter der Deutschen Telekom in
Berlin. Sie war hier zunächst als <i style="mso-bidi-font-style: normal;">Senior
Project Manager - Line Office of Strategic Deals & Solutions </i>tätig.
Zwischendurch arbeitete sie als freier Mitarbeiter (engl. Freelance) für Porsche,
Volkswagen, Audi, Air Berlin, Hermès, L’Oréal, und IBM. Die Autorin engagiert
sich in der Werbung für MINT-Berufe bei Frauen und tritt in Vorträgen und
Diskussionsbeiträgen ein für Frauen und Technik.</span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span face="" style="mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Ausgewählte Themen</span></i></b></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face="" style="mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Die 13 von der Autorin ausgewählten Themen sind in der folgenden
Liste wiedergegeben. Sie kreisen zwar um das das Unterthema KI, adressieren aber auch
Fragen der Technik-Akzeptanz im weiteren Sinne.</span></p>
<p class="MsoNormal" style="text-align: left;"></p><ul style="text-align: left;"><li><span face="" style="line-height: 115%; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Die kunterbunte Welt der Technik (Unbegründete Ängste)</span></li><li><span face="" style="line-height: 115%; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Denk doch mal nach, Maschine! (Codes und Algorithmen)</span></li><li><span face="" style="line-height: 115%; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Wie künstliche Intelligenz das Tanzen lernt (Was KI von uns braucht)</span></li><li><span face="" style="line-height: 115%; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Leider entsprechen Sie nicht unseren Anforderungen (Wie Daten verzerrt werden)</span></li><li><span face="" style="line-height: 115%; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Auch Maschinen wollen nur das eine (Programme entscheiden über Geld)</span></li><li><span face="" style="line-height: 115%; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Die Kunst, Angst in Zahlen auszudrücken (Anwendungen in der Versicherungsbranche)</span></li><li><span face="" style="line-height: 115%; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">'Sie kenne ich doch. Sind sie nicht gestern bei Rot über die Ampel gegangen?' (Gesichtserkennung)</span></li><li><span face="" style="line-height: 115%; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">'Baby, you can drive my car' (Autonomes Fahren)</span></li><li><span face="" style="line-height: 115%; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Man erntet, was man codet (Roboter in der Ernährung)</span></li><li><span face="" style="line-height: 115%; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Mit KI gegen Stürme, Eis und Hitzewellen (Anwendung im Umweltschutz)</span></li><li><span face="" style="line-height: 115%; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Chefvisite beim RoboDoc (Digitalisierung im Gesundheitswesen)</span></li><li><span face="" style="line-height: 115%; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Computer wie wir (Liebe in Zeiten der Algorithmen)</span></li><li><span face="" style="line-height: 115%; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Ich hack mir die Welt, wie sie mir gefällt (Besseres Leben dank Technik)</span></li></ul><p></p>
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<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span face="" style="mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;"></span></i></b></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span face="" style="mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Bewertung einiger KI-Techniken im Hinblick auf ihre
Anwendungstauglichkeit</span></i></b></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face="" style="mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Auf zwei KI-Anwendungen verlässt die Autorin sich fast täglich.
Sie macht häufigen Gebrauch von <i style="mso-bidi-font-style: normal;">Jelbi</i>.
Das ist ein KI-System der Berliner Verkehrsbetriebe, das für die jeweilige
Tageszeit die schnellste Verbindung zwischen zwei Punkten im Berliner Verkehrsverbund
berechnet. Sie verlässt sich zu 100% darauf, dass aller Spam aus ihren E-Mails
entfernt wurde. Das war noch vor 10 Jahren eine lästige Angelegenheit, bevor sich
eine KI-basierte Lösung durchsetzte.</span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face="" style="mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Nicht ganz so weit haben es einige Anwendungen gebracht, über die
schon lange gesprochen wird. Die Autorin sieht in ihnen jedoch ein großes
Potential. Zwei Beispiele: An der Gesichtserkennung wird an vielen Stellen
gearbeitet. Offensichtlich wurden bisher nur Teilerfolge erzielt. Alle Welt
träumt davon, dass der Vergleich mit dem Passbild demnächst zur Identifizierung
ausreicht. Das würde eine Unzahl neuer Anwendungen ermöglichen, von der
Eingangskontrolle zu Gebäuden bis zum Abschluss von Handelsgeschäften. Sehr
bezeichnend ist die Tatsache, dass die besten Ergebnisse bei weißen Männern
erreicht werden. Afrikaner, Asiaten und Frauen schneiden schlechter ab. Das
liege am Fehlen von Testdaten. Dass der Kühlschrank aufgrund seines Inhalts
einen Essensvorschlag macht, wird wohl noch eine Weile Zukunftsmusik sein.</span></p>
<div style="border: medium none; mso-border-bottom-alt: solid windowtext .75pt; mso-element: para-border-div; padding: 0cm 0cm 1pt;"><span face="" style="mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;"> </span><b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span face="" style="mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;"> </span></i></b></div><div style="border: medium none; mso-border-bottom-alt: solid windowtext .75pt; mso-element: para-border-div; padding: 0cm 0cm 1pt;"><b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span face="" style="mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Hoffnungen und Mängel</span></i></b>
<p class="MsoNormal" style="border: medium none; line-height: normal; margin-bottom: 0cm; mso-border-bottom-alt: solid windowtext .75pt; mso-padding-alt: 0cm 0cm 1.0pt 0cm; padding: 0cm;"><b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span face="" style="mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;"></span></i></b></p>
<p class="MsoNormal" style="border: medium none; line-height: normal; margin-bottom: 0cm; mso-border-bottom-alt: solid windowtext .75pt; mso-padding-alt: 0cm 0cm 1.0pt 0cm; padding: 0cm;"><span face="" style="mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Man spricht von Starker KI, wenn die
Maschine mehrere Intelligenzen besitzt. Das gibt es vielleicht in 30 Jahren,
wenn überhaupt. Es gibt (noch) keine KI, die aus verzerrten Trainingsdaten
nicht-verzerrte Ergebnisse erzielt.</span></p>
<p class="MsoNormal" style="border: medium none; line-height: normal; margin-bottom: 0cm; mso-border-bottom-alt: solid windowtext .75pt; mso-padding-alt: 0cm 0cm 1.0pt 0cm; padding: 0cm;"><b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span face="" style="mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;"></span></i></b></p>
<p class="MsoNormal" style="border: medium none; line-height: normal; margin-bottom: 0cm; mso-border-bottom-alt: solid windowtext .75pt; mso-padding-alt: 0cm 0cm 1.0pt 0cm; padding: 0cm;"><span face="" style="mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Die Autorin hält sich für eine
Verfechterin für Gleichberechtigung und Diversität. Ihr missfällt es, dass die
Attribute ‚durchsetzungsfähig‘ und ‚zielstrebig‘ hauptsächlich auf Männer
bezogen werden. Sie kommen bei Bewerbungen von Frauen noch kaum vor. Wenn alle
Bewerbungen von derselben Jobbörse vermittelt werden, sei die Gleichbehandlung
von Männern und Frauen nicht zu erreichen. besonders dann, wenn KI-Software eine
entscheidende Rolle spielt. Lerndaten können zu einer Einseitigkeit (engl. <i>bias</i>) führen, wenn sie
vorwiegend von männlichen Bewerbern stammen. Auch die automatische
Gesichtserkennung und Spracherkennung leiden darunter, dass mehr getan wird für
Männer als für Frauen.</span></p>
<p class="MsoNormal" style="border: medium none; line-height: normal; margin-bottom: 0cm; mso-border-bottom-alt: solid windowtext .75pt; mso-padding-alt: 0cm 0cm 1.0pt 0cm; padding: 0cm;"><span face="" style="mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;"></span><b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span face="" style="mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Neuere Anwendungen</span></i></b></p>
<p class="MsoNormal" style="border: medium none; line-height: normal; margin-bottom: 0cm; mso-border-bottom-alt: solid windowtext .75pt; mso-padding-alt: 0cm 0cm 1.0pt 0cm; padding: 0cm;"><span face="" style="mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;"></span></p>
<p class="MsoNormal" style="border: medium none; line-height: normal; margin-bottom: 0cm; mso-border-bottom-alt: solid windowtext .75pt; mso-padding-alt: 0cm 0cm 1.0pt 0cm; padding: 0cm;"><span face="" style="mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Durch KI wird ein Präzisions-Ackerbau
ermöglicht. Die Firma Microsoft hat sich damit in Indien engagiert. Für einen
Einsatz zur Pränatalen Feindiagnostik per Ultraschall wäre die Autorin ein
interessierter Kandidat. Dass Roboter im OP dem Arzt dabei helfen, indem sie
ein Endoskop mit einer kleinen Kamera führen, findet sie in Ordnung. Jeder, der
über KI redet, erwähnt das Selbstfahrer-Dilemma (engl. <i style="mso-bidi-font-style: normal;">trolley problem). </i>Das ist die Frage, wer im Zweifelsfall Vorrang
bekommt − wenn nur einer überleben kann − das Kind oder die Oma. Es ginge dabei
um Prinzipienethik (Kant) versus Nutzenethik (Utilitarismus).</span></p>
<p class="MsoNormal" style="border: medium none; line-height: normal; margin-bottom: 0cm; mso-border-bottom-alt: solid windowtext .75pt; mso-padding-alt: 0cm 0cm 1.0pt 0cm; padding: 0cm;"><span face="" style="mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;"></span></p>
<p class="MsoNormal" style="border: medium none; line-height: normal; margin-bottom: 0cm; mso-border-bottom-alt: solid windowtext .75pt; mso-padding-alt: 0cm 0cm 1.0pt 0cm; padding: 0cm;"><b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span face="" style="mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Stolpersteine</span></i></b></p>
<p class="MsoNormal" style="border: medium none; line-height: normal; margin-bottom: 0cm; mso-border-bottom-alt: solid windowtext .75pt; mso-padding-alt: 0cm 0cm 1.0pt 0cm; padding: 0cm;"><span face="" style="mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;"></span></p>
<p class="MsoNormal" style="border: medium none; line-height: normal; margin-bottom: 0cm; mso-border-bottom-alt: solid windowtext .75pt; mso-padding-alt: 0cm 0cm 1.0pt 0cm; padding: 0cm;"><span face="" style="mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Nicht allgemein bekannt sind
einige der Fehlleistungen, auf die das Buch aufmerksam macht. Die Autorin muss
die Kenntnis darüber in ihrer praktischen Arbeit gewonnen haben. Zwei
Beispiele: Wer mit einem iPhone oder iPad von Apple ein Hotelzimmer bucht, muss
möglicherweise mehr für das Zimmer bezahlen als jemand, der-ein Gerät eines
anderen Herstellers verwendet. Obwohl WhatsApp für die Anwendung End-zu-End-Verschlüsselung
bietet,<span style="mso-spacerun: yes;"> </span>ist es nicht auszuschließen,
dass Werbung generiert wird, der das Gesagte als Basis dient.</span></p>
<p class="MsoNormal" style="border: medium none; line-height: normal; margin-bottom: 0cm; mso-border-bottom-alt: solid windowtext .75pt; mso-padding-alt: 0cm 0cm 1.0pt 0cm; padding: 0cm;"><span face="" style="mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;"></span></p>
<p class="MsoNormal" style="border: medium none; line-height: normal; margin-bottom: 0cm; mso-border-bottom-alt: solid windowtext .75pt; mso-padding-alt: 0cm 0cm 1.0pt 0cm; padding: 0cm;"><b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span face="" style="mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Selbst-Darstellung</span></i></b></p><span face="" style="mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;"> </span></div><div style="border: medium none; mso-border-bottom-alt: solid windowtext .75pt; mso-element: para-border-div; padding: 0cm 0cm 1pt;"><span face="" style="mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Lassen wir am Schluss Kenza Ait Si
Abbou selbst zu Wort kommen, die ja schon seit 15 Jahren in der IT-Branche
arbeitet:</span>
<p><span face="" style="mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Wir müssen nicht plötzlich alle
programmieren können – aber wir müssen all unsere Erfahrung einbringen. Damit
die Technik den Menschen bestmöglich unterstützen kann. Damit Artifical
Intelligence Aufgaben übernehmen kann, die uns freier in unserer Zeit- und Zukunftsgestaltung
machen. Dies kann umso besser gelingen, je mehr Informationen wir für die
Robotik zur Verfügung stellen können. Durch authentische und diverse Teams, die
die Vielfalt der Zukunftswünsche und auch –ängste spiegeln. Als Frau bringe ich
hier eine andere Sichtweise als meine oft männlichen Kollegen ein. Meine
internationale Erfahrung gibt mir die Möglichkeit des Perspektivwechsels. Meine
Erfahrungen aus Job, Familie und Lernen bieten mir eine fundierte Basis. Das
ist es, was ich in meinen Vorträgen, Talks und Workshops weitergebe.</span> <br /></p></div>Bertal Dresenhttp://www.blogger.com/profile/01435152037884170636noreply@blogger.com1tag:blogger.com,1999:blog-8476761749021763994.post-13008943860634353652020-08-23T12:08:00.003+02:002020-08-23T12:16:28.164+02:00Leserbrief Informatik Spektrum<p><!--[if gte mso 9]><xml>
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<![endif]--></p><p class="MsoNormal"><span face="" style="font-family: "arial", "sans-serif"; font-size: 12pt; line-height: 115%;">Der nachfolgende kurze Text ging heute als Leserbrief zu Informatik
Spektrum 43,4 (August 2020) an den Springer-Verlag. Bis zu seinen Erscheinen
kann noch einige Zeit vergehen. Er kann auch gar nicht erscheinen.</span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face="" style="font-family: "arial", "sans-serif"; font-size: 12pt;"></span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face="" style="font-family: "arial", "sans-serif"; font-size: 12pt;">Mit
großem Interesse las ich die Beiträge in der Jubiläumsausgabe des
Informatik-Spektrums. Lediglich der Beitrag des Kollegen Wolfgang Reisig reizt
mich zu einer Reaktion. Der Beitrag hat den Titel<span style="mso-spacerun: yes;"> </span><i style="mso-bidi-font-style: normal;">Informatik
– eine eigenständige Wissenschaft? </i>Durch zwei darin behandelte Unterthemen
fühlte ich mich direkt angesprochen. Es sind dies die Abschnitte 4 (Invarianten
in der Informatik) und 5 (Informationsbegriff). In Beidem kommt ein
grundlegender Unterschied zwischen Theoretikern und Praktikern zum Vorschein,
was die Herangehensweise an die Informatik betrifft. Theoretiker suchen in der
Informatik manchmal Dinge, die für Naturwissenschaften Sinn machen, aber in
einer Ingenieurwissenschaft keine Relevanz haben. </span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face="" style="font-family: "arial", "sans-serif"; font-size: 12pt;"></span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span face="" style="font-family: "arial", "sans-serif"; font-size: 12pt;">Thema
Invarianten</span></i></b></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face="" style="font-family: "arial", "sans-serif"; font-size: 12pt;"> Reisig
empfiehlt die Suche nach sogenannten Invarianten bei den sieben gelisteten
Aufgaben: <br /></span></p>
<ul style="text-align: left;"><li><i style="mso-bidi-font-style: normal;"><span face="" style="font-family: "arial", "sans-serif"; font-size: 12pt;">ein Reisebüro eine Reise bucht,</span></i><span style="font-family: Symbol; font-size: 12pt; mso-bidi-font-family: Symbol; mso-fareast-font-family: Symbol;"><span style="mso-list: Ignore;"><span style="font: 7pt "times new roman";"> </span></span></span></li><li><span style="font-family: Symbol; font-size: 12pt; mso-bidi-font-family: Symbol; mso-fareast-font-family: Symbol;"><span style="mso-list: Ignore;"><span style="font: 7pt "times new roman";"> </span></span></span><i style="mso-bidi-font-style: normal;"><span face="" style="font-family: "arial", "sans-serif"; font-size: 12pt;">ein Bankkunde an
einem Automaten Bargeld abhebt,</span></i></li><li><span style="font-family: Symbol; font-size: 12pt; mso-bidi-font-family: Symbol; mso-fareast-font-family: Symbol;"><span style="mso-list: Ignore;"><span style="font: 7pt "times new roman";"> </span></span></span><i style="mso-bidi-font-style: normal;"><span face="" style="font-family: "arial", "sans-serif"; font-size: 12pt;">eine
Lebensversicherung einen bestehenden Vertrag auf eine neue Hardware umstellt,</span></i></li><li><i style="mso-bidi-font-style: normal;"><span face="" style="font-family: "arial", "sans-serif"; font-size: 12pt;">eine Autoversicherung
einen Schaden reguliert</span></i></li><li><i style="mso-bidi-font-style: normal;"><span face="" style="font-family: "arial", "sans-serif"; font-size: 12pt;">ein Rechenzentrum das
Wetter von morgen berechnet,</span></i></li><li><i style="mso-bidi-font-style: normal;"><span face="" style="font-family: "arial", "sans-serif"; font-size: 12pt;">ein Betriebssystem
den Speicher aufräumt,</span></i></li><li><i style="mso-bidi-font-style: normal;"><span face="" style="font-family: "arial", "sans-serif"; font-size: 12pt;">ein Compiler ein Programm übersetzt.</span></i></li></ul>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face="" style="font-family: "arial", "sans-serif"; font-size: 12pt;"></span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face="" style="font-family: "arial", "sans-serif"; font-size: 12pt;">Natürlich
ist es sinnvoll, ja notwendig ein gemeinsames grammatikalisches Modell zu
verwenden, damit eine Übertragung auf Programmierkonzepte möglich ist. Dass da
viel mehr dahinter stecken könnte als das, was zum Modellieren und
Programmieren nützlich sein könnte, leuchtet mir nicht ein. Ich weiß auch
nicht, wozu es nützlich wäre. Reisig spekuliert irgendwie drauf los: ‚<i style="mso-bidi-font-style: normal;">Derzeit ist das alles Spekulation; es loht
aber, systematisch nach Modellierungstechniken zu suchen, die im Vergleich mit
bisherigen Konzepten weit abstraktere und weniger naheliegende, aber dennoch
intuitiv verständliche Begriffe und Invarianten verwenden.‘‘ </i>Nach meiner
Meinung lohnt sich das wirklich nicht. Wir sollten uns davor hüten, andere
Kollegen – vor allem jüngere – in die Irre zu leiten. </span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face="" style="font-family: "arial", "sans-serif"; font-size: 12pt;"></span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span face="" style="font-family: "arial", "sans-serif"; font-size: 12pt;">Thema Informationsbegriff</span></i></b></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face="" style="font-family: "arial", "sans-serif"; font-size: 12pt;">Reisig
schreibt: <i style="mso-bidi-font-style: normal;">‚Eine konstruktive Definition
eines solchen Informationsbegriffs ist nicht in Sicht…. Man sollte präzise
formulieren können, was genau sich ändert und was gleich bleibt beim Kopieren,
Löschen oder Zusammenfügen von Informationen oder Dokumenten. …Eine weitere
interessante Eigenschaft eines solchen Informationsbegriffs sind
informationserhaltende Operationen: … Vielleicht gelingt die Charakterisierung
spezieller Informationsbegriffe über die Operationen, die mit ihnen in einem
jeweils gegebenen Kontext möglich oder erlaubt sind.‘</i></span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><i style="mso-bidi-font-style: normal;"><span face="" style="font-family: "arial", "sans-serif"; font-size: 12pt;"></span></i><span face="" style="font-family: "arial", "sans-serif"; font-size: 12pt;">Auch
hier kann ich Reisig nicht folgen. Für mich ist Information das Tupel bestehend
aus Benennendem und Benanntem [1]. Auch mit vielen anderen
Informationsbegriffen konnte ich bisher nichts anfangen. Wenn einer der beiden Konstituenten
des Tupels fehlt, oder falsch geschrieben wurde, ist die Definition
unzutreffend und unzulässig. Das mag einem Theoretiker missfallen, entspricht
aber der Realität am meisten.</span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face="" style="font-family: "arial", "sans-serif"; font-size: 12pt;"></span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span face="" style="font-family: "arial", "sans-serif"; font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">Referenz</span></i></b></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"> <span face="" style="font-family: "arial", "sans-serif"; font-size: 12pt; mso-ascii-theme-font: major-latin; mso-bidi-theme-font: major-latin; mso-hansi-theme-font: major-latin;">1. Informationsbegriff nach Hans Diel, Albert Endres und Peter
Hiemann: </span></p><a href="https://bertalsblog.blogspot.com/2011/09/information-in-der-informatik-erneuter_12.html"><span face="" style="font-family: "arial", "sans-serif"; font-size: 12pt;">https://bertalsblog.blogspot.com/2011/09/information-in-der-informatik-erneuter_12.html</span></a><span face="" style="font-family: "arial", "sans-serif"; font-size: 12pt;"></span>Bertal Dresenhttp://www.blogger.com/profile/01435152037884170636noreply@blogger.com0tag:blogger.com,1999:blog-8476761749021763994.post-51835986886516713932020-08-18T19:55:00.104+02:002020-09-16T18:31:47.786+02:00Erinnerungen an Peter Hiemann (1935 - 2020)<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face="" lang="DE" style="font-size: 12pt;">Die Nachricht, dass Peter
Hiemann verstorben ist, hat mich sehr getroffen. Peter Hiemann war einer meiner
langjährigen Kollegen und Freunde. Zusammen mit </span><span lang="DE"><a href="https://bertalsblog.blogspot.com/2019/10/erinnerungen-hans-diel-1942-2019.html"><span face="" style="font-size: 12pt;">Hans Diel</span></a></span><span face="" lang="DE" style="font-size: 12pt;">, der im Oktober
2019 starb, bildeten wir ein Dreierblatt, das sich in den letzten 10-15 Jahren
sehr intensiv austauschte und sehr ähnliche Interessen verfolgte.</span></p><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face="" lang="DE" style="font-size: 12pt;"><br /></span></p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEh4h8P0LmPko_CtNL4idSHGQITNBPujWkrpPz4APOdQfe33IO2I_ltYvlYVtDLohyQOgEe2JDahYY1Ej7ER0SJaU3Y-c5UAcqfCM0SODGaXhhibmKj_u9VHt43xcqDeXE1-bVrOeaSyspBx/s602/P1050638.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="602" data-original-width="399" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEh4h8P0LmPko_CtNL4idSHGQITNBPujWkrpPz4APOdQfe33IO2I_ltYvlYVtDLohyQOgEe2JDahYY1Ej7ER0SJaU3Y-c5UAcqfCM0SODGaXhhibmKj_u9VHt43xcqDeXE1-bVrOeaSyspBx/d/P1050638.jpg" /></a></div><div style="line-height: normal; margin-bottom: 0cm; text-align: center;"><br /></div><div style="line-height: normal; margin-bottom: 0cm; text-align: center;"><span face="" style="font-style: italic;">Hiemann in Grasse 2010</span></div>
<h3 style="line-height: normal; margin-bottom: 0cm; text-align: left;"><span face="" lang="DE" style="font-size: 12pt;"><i></i></span></h3><h3 style="line-height: normal; margin-bottom: 0cm; text-align: left;"><span face="" lang="DE" style="font-size: 12pt;"><i>DDR-Zeit</i></span></h3>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face="" lang="DE" style="font-size: 12pt;">Hiemann wurde in Dresden geboren. Er mochte diese Stadt und Ihre Menschen sehr. Er zeigte gerne den Teil
der sächsischen Mentalität, die wir Deutsche schätzen. Er war stets pünktlich
und verlässlich, und mit Elan bei allem, was er anfing. Er verschonte seine
Mitmenschen von der oft bei Sachsen anzutreffenden Hochnäsigkeit und Penetranz.<o:p></o:p></span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face="" lang="DE" style="font-size: 12pt;">Wie ein belastender Albtraum verfolgten ihn sein ganzes Leben lang die Erfahrungen, die er mit dem
Gesellschaftssystem der damaligen DDR machen musste. Ihm behagte weder die
politische Einseitigkeit, die von der Sozialistischen Einheitspartei (SED)
vorgegeben und durchgesetzt wurde, noch schätzte er die Vorgaben und
Beschränkungen, die ihm und allen DDR-Bürgern bezüglich ihrer wirtschaftlichen
und gesellschaftlichen Betätigung auferlegt wurden. Er zog – so wie viele
andere junge Menschen – die einzige sinnvolle Konsequenz und verließ die DDR –
sobald er konnte – fluchtartig in Richtung Westen. Kurz nach Beendigung seines
Mathematik-Studiums verließ er seine Heimat und suchte eine Anstellung in
München. Diese übte er nur kurze Zeit aus, bevor er sich im IBM Labor in Böblingen
bewarb.<o:p></o:p></span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm; text-align: center;"><i><span face="" lang="DE"><span face=""><span style="font-size: 12pt;"><b> </b></span></span></span></i></p><div class="separator" style="clear: both; font-family: "arial", sans-serif; font-size: 12pt; font-weight: bold; text-align: center;"><i><span face="" lang="DE"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEh6Wopy6hD1FbdDIJs_wzb7lnDwJoj8L1Ekkrhrwfa7N9-ewaJQ6r8x5eYoErJQtEeN41iTysyd37Dcp4gbc4_CEuHVE-kCERHtUpogJHNZcRL0PX6qdRZl4nvbtDNr70khZwKrCDuYcdKt/s422/P1050624.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="422" data-original-width="422" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEh6Wopy6hD1FbdDIJs_wzb7lnDwJoj8L1Ekkrhrwfa7N9-ewaJQ6r8x5eYoErJQtEeN41iTysyd37Dcp4gbc4_CEuHVE-kCERHtUpogJHNZcRL0PX6qdRZl4nvbtDNr70khZwKrCDuYcdKt/s0/P1050624.jpg" /></a></span></i></div><div class="separator" style="clear: both; text-align: center;"><i><span face="" lang="DE"><br /></span></i></div><div class="separator" style="clear: both; text-align: center;"><i><span face="" lang="DE"><span face="">Hiemann und meine inzwischen verstorbene Frau</span></span></i></div><p></p>
<h3 style="line-height: normal; margin-bottom: 0cm; text-align: left;"><span face="" lang="DE" style="font-size: 12pt;"><i></i></span></h3><h3 style="line-height: normal; margin-bottom: 0cm; text-align: left;"><span face="" lang="DE" style="font-size: 12pt;"><i>IBM-Zeit</i></span></h3>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face="" lang="DE" style="font-size: 12pt;">Ich muss einer der IBM-Kollegen gewesen sein, der ein Einstellungsgespräch mit Hiemann führte.
Jedenfalls bewog es Hiemann, am Wochenende vor seinem Arbeitsantritt meine
Familie und mich in unserer Privatwohnung zu besuchen. Wir wohnten in einem der
Nachbardörfer von Böblingen. Vielleich fand er meine Adresse im örtlichen
Telefonbuch. Er begründete den Besuch mit dem Wunsch, zu erfahren wie ich
lebte. Meine Frau und meine Kinder fanden den Besucher umgänglich und interessiert
und gaben zu allem, was er wissen wollte, ausführliche Auskunft. Von den
zahlreichen Neueinstellungen, die ich vornehmen durfte, ist mir kein anderer
Fall in Erinnerung, der den Dingen in solcher Weise auf den Grund ging.<o:p></o:p></span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face="" lang="DE" style="font-size: 12pt;">Hiemann durchlief innerhalb von 2-3 Jahren eine Laufbahn als Software-Entwickler für die vom
Labor Böblingen betreuten Systeme. Es handelte sich dabei um Rechnersysteme,
die etwa die Größe eines Schreibtischs hatten, und meist bei kleinen und
mittelgroßen Unternehmen im Einsatz waren. Neben der Entwicklertätigkeit war
Hiemann auch an administrativen und Führungsaufgaben interessiert.</span></p><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm; text-align: center;"><span face="" lang="DE"><span face=""><span style="font-size: 12pt;"> </span></span></span></p><div class="separator" style="clear: both; font-family: "arial", sans-serif; font-size: 12pt; text-align: center;"><span face="" lang="DE"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEigX19b49hRToudIoKhvU-6CYirjy2j4ucymA_hjV5tEq3ORbn8ztsWR4O8FvJmlHMbgcY3rlJ_zNSKwJx1G80qw6c5DrinTAHaemrY7F_K74xy5Y8BwBUjPE8tFnQNV3MSP3aHsvwu0XA6/s518/P1050629.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="517" data-original-width="518" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEigX19b49hRToudIoKhvU-6CYirjy2j4ucymA_hjV5tEq3ORbn8ztsWR4O8FvJmlHMbgcY3rlJ_zNSKwJx1G80qw6c5DrinTAHaemrY7F_K74xy5Y8BwBUjPE8tFnQNV3MSP3aHsvwu0XA6/s0/P1050629.jpg" /></a></span></div><div class="separator" style="clear: both; text-align: center;"><span face="" lang="DE"><br /></span></div><div class="separator" style="clear: both; text-align: center;"><span face="" lang="DE"><span face="" style="font-style: italic;">Auf Terasse zusammen mit Ehefrau </span><span face=""><i>Geneviève</i></span></span></div><p></p><span face="" lang="DE" style="font-size: 12pt;">Diejenige
Management-Aufgabe, die Hiemann mit großer Umsicht und besonders viel
Leidenschaft ausübte, betraf die Leitung des World Trade Systems Center (WTSC)
in Böblingen. Das WTSC war eine Art Bindeglied zwischen Entwicklung und
Vertrieb. Böblingen war das einzige solche Zentrum in Europa. Zentren in den
USA waren an vier Orten: Raleigh, NC, Rochester, MN; Boca Raton, FL und Palo
Alto, CA. Es war die Aufgabe eines WTSC vor der Ankündigung eines neuen
Produkts dafür zu sorgen, dass alle Länder und Vertriebsregionen die
entsprechenden Ausbildungskapazitäten und Verteilungswege für Systemliteratur
aufgebaut hatten. Auch wurden Installations-Tipps und Nutzererfahrungen
gesammelt und dokumentiert (Rote Bücher). Die Mitarbeiter arbeiteten teilweise
auf Basis von temporären Abordnungen, und kamen aus der ganzen Welt. Böblingen
hatte einen Stab von 12-15 Mitarbeitern.</span>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face="" lang="DE" style="font-size: 12pt;">Nach mehreren Jahren in der Leitung des WTSC Böblingen wechselte Hiemann zu einem internationalen
Prestige-Projekt. Das Projekt <i>Amadeus</i>
hatte das Ziel, ein gemeinsames Flugreservierungssystem für alle europäischen
Fluglinien wie Lufthansa, Air France und Iberia zu schaffen. Hiemann übernahm
die Leitung des Projektbüros mit Sitz in Antibes, Frankreich. Das Projekt wurde
ein Erfolg. Das vor 30 Jahren den Fluggesellschaften übergebene System ist
heute noch im Einsatz.</span></p><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face="" lang="DE" style="font-size: 12pt;"><br /></span></p><div class="separator" style="clear: both; text-align: center;"><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjMF17kDRVzG7hlV0V_FbyjdhjTWSbO7GAAn9XnmHDCmpLb-73aRz2vzdnHaq3Qa44AMs2UqSomSa5R3ILaVaTdkDBzwZ7V6geIPfQVlZih4jyruIq7DwxBAJUfk_z_MQKwmPmXl9HI2bwS/s780/P1050406.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="518" data-original-width="780" height="340" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjMF17kDRVzG7hlV0V_FbyjdhjTWSbO7GAAn9XnmHDCmpLb-73aRz2vzdnHaq3Qa44AMs2UqSomSa5R3ILaVaTdkDBzwZ7V6geIPfQVlZih4jyruIq7DwxBAJUfk_z_MQKwmPmXl9HI2bwS/w512-h340/P1050406.jpg" width="512" /></a></div><div class="separator" style="clear: both; text-align: center;"><br /></div><div class="separator" style="clear: both; text-align: center;"><span face="" style="font-style: italic;">Erfrischungen</span></div><div class="separator" style="clear: both; text-align: center;"><span face="" style="font-style: italic;"> </span></div><i><b><span face="" lang="DE" style="font-size: 12pt;">Unruhestand</span></b></i>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face="" lang="DE" style="font-size: 12pt;">Nach 30-jähriger IBM-Zugehörigkeit
trat Hiemann in den Ruhestand. Er hat seinen Lebensmittelpunkt und seine zweite
Frau an der französischen Riviera-Küste gefunden. Er lebte in Grasse, am Abhang der Seealpen. <br /></span></p>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face="" lang="DE" style="font-size: 12pt;">Wie bei mehreren Kollegen so gelang es auch ihm, sich in einen geistigen Unruhezustand zu
begeben. Er las sehr viel und verfolgte vielseitige Themen. Ich muss mir
zugutehalten, dass ich Hiemanns Interesse für den deutschen Soziologen Niklas
Luhmann (1927-1998) entfacht habe. In vielen seiner Blog-Beiträge machte er
sich Luhmanns Gesellschaftsmodell zu eigen. Aber auch andere Soziologen und
Philosophen fanden seine Beachtung, so Bruno Latour, Douglas Hofstadter und –
vor allem – Konfuzius. Die Sprüche des Konfuzius aus der Zeit von 500 vor Chr.
hatten es ihm besonders angetan.</span></p><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face="" lang="DE" style="font-size: 12pt;">Nichts bestimmte Hiemanns Sicht der Welt mehr als die neueren Erkenntnisse der Molelular-Biologie. Er war auf diesem Gebiet sehr belesen und war bemüht allen Ereignissen eine streng wissenschaftliche Erkärung zu geben. Manchmal hatte ich den Eindruck, dass er die Grenzen biologischen Denkens weit über das hinauszog, was dem Stand des Wissens entspricht.<br /></span></p><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face="" lang="DE" style="font-size: 12pt;"></span></p><b><span face="" lang="DE" style="font-size: 12pt;"><i>Interessensgebiete</i></span>
</b><span face="" lang="DE" style="font-size: 12pt; line-height: 115%; mso-ansi-language: DE; mso-bidi-language: AR-SA; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: EN-US; mso-fareast-theme-font: minor-latin;"><div><span face="" lang="DE" style="font-size: 12pt; line-height: 115%; mso-ansi-language: DE; mso-bidi-language: AR-SA; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: EN-US; mso-fareast-theme-font: minor-latin;"><br /></span></div>Ohne
die über 100 Beiträge, die aus Hiemanns Feder stammen, hätte Bertals Blog nicht
die Breite und die Aktualität, die er bekommen hat. Die nachfolgende Liste der
20 letzten Hiemann-Beiträge vermittelt ein Gefühl für die von ihm behandelten
Themen. Der überwiegende Teil der Kommentare zu meinen Einträgen stammt
ebenfalls von Hiemann. Wir befanden uns sozusagen in einem andauernden Dialog,
wobei die Entfernung sich innerhalb von Sekunden auflöste.</span><div><span face=""><br /></span><table style="border-collapse: collapse; border: 1px solid black; margin-left: auto; margin-right: auto; text-align: center;">
<tbody style="border: 1px solid black;">
<tr style="border: 1px solid black;">
<th style="border: 1px solid black;"> Titel </th>
<th style="border: 1px solid black;"> Datum </th>
</tr>
<tr style="border: 1px solid black;">
<td style="border: 1px solid black;"><a href="https://bertalsblog.blogspot.com/2020/08/14.html" target="_blank">Entscheiden: Über Wahrnehmung und Denk- und Verhaltensweisen</a></td>
<td style="border: 1px solid black;"> 11.08.2020 </td>
</tr>
<tr style="border: 1px solid black;">
<td style="border: 1px solid black;"><a href="https://bertalsblog.blogspot.com/2020/06/peter-hiemann-zum-thema.html" target="_blank">Peter Hiemann zum Thema Selbstorganisation</a></td><td style="border: 1px solid black;">22.06.2020</td>
</tr>
<tr style="border: 1px solid black;">
<td style="border: 1px solid black;"><a href="https://bertalsblog.blogspot.com/2020/06/peter-hiemann-uber-nachhaltigkeit.html" target="_blank">Peter Hiemann über Nachhaltigkeit</a></td>
<td style="border: 1px solid black;">17.06.2020</td>
</tr>
<tr style="border: 1px solid black;">
<td style="border: 1px solid black;"><a href="https://bertalsblog.blogspot.com/2020/05/von-individueller-orientierung-zur.html" target="_blank">Von individueller Orientierung zur gesellschaftlichen Kultur</a></td>
<td style="border: 1px solid black;">28.05.2020</td>
</tr>
<tr style="border: 1px solid black;">
<td style="border: 1px solid black;"><a href="https://bertalsblog.blogspot.com/2020/05/ethik-moral-und-recht-als-basis-von.html" target="_blank">Ethik, Moral und Recht als Basis von Wertvorstellungen</a></td><td style="border: 1px solid black;">11.05.2020</td>
</tr>
<tr style="border: 1px solid black;">
<td style="border: 1px solid black;"><a href="https://bertalsblog.blogspot.com/2020/03/denk-und-verhaltensweisen-in-corona.html" target="_blank">Denk- und Verhaltensweisen in Corona-Zeiten</a></td>
<td style="border: 1px solid black;">26.03.2020</td>
</tr>
<tr style="border: 1px solid black;">
<td style="border: 1px solid black;"><a href="https://bertalsblog.blogspot.com/2020/01/cest-la-vie-oder-der-philosoph-im.html" target="_blank">C'est la Vie (oder der Autor im Krankenbett)</a></td>
<td style="border: 1px solid black;">23.01.2020</td>
</tr>
<tr style="border: 1px solid black;">
<td style="border: 1px solid black;"><a href="https://bertalsblog.blogspot.com/2019/12/okosoziale-orientierung-essay-von-peter.html" target="_blank">Ökosoziale Orientierung</a></td>
<td style="border: 1px solid black;">12.12.2019</td>
</tr>
<tr style="border: 1px solid black;">
<td style="border: 1px solid black;"><a href="https://bertalsblog.blogspot.com/2019/10/sinnsuche-des-individuums-essay-von.html" target="_blank">Sinnsuche des Individuums</a></td>
<td style="border: 1px solid black;">22.10.2019</td>
</tr>
<tr style="border: 1px solid black;">
<td style="border: 1px solid black;"><a href="https://bertalsblog.blogspot.com/2019/10/okosoziale-planung-nach-niklas-luhmann.html" target="_blank">Ökosoziale Planung nach Niklas Luhmann und Bruno Latour</a></td>
<td style="border: 1px solid black;">11.10.2019</td>
</tr>
<tr style="border: 1px solid black;">
<td style="border: 1px solid black;"> <a href="https://bertalsblog.blogspot.com/2019/07/evolutionstheorie-im-kreuzfeuer-der.html" target="_blank">Evolutionstheorie im Kreuzfeuer der Kritik – wenn auch etwas verspätet</a> </td>
<td style="border: 1px solid black;">24.07.2019</td>
</tr>
<tr style="border: 1px solid black;">
<td style="border: 1px solid black;"><a href="https://bertalsblog.blogspot.com/2019/07/ziele-und-methoden-globaler-politik.html" target="_blank">Ziele und Methoden globaler Politik</a></td>
<td style="border: 1px solid black;">15.07.2019</td>
</tr>
<tr style="border: 1px solid black;">
<td style="border: 1px solid black;"><a href="https://bertalsblog.blogspot.com/2019/07/meinungsbildung-und-orientierung-in.html" target="_blank">Meinungsbildung und Orientierung in Europas Gesellschaften</a></td><td style="border: 1px solid black;">03.07.2019</td>
</tr>
<tr style="border: 1px solid black;">
<td style="border: 1px solid black;"><a href="https://bertalsblog.blogspot.com/2019/06/auf-den-spuren-des-geistes-essay-von.html" target="_blank">Auf den Spuren des Geistes</a></td>
<td style="border: 1px solid black;">14.06.2019</td>
</tr>
<tr style="border: 1px solid black;">
<td style="border: 1px solid black;"><a href="https://bertalsblog.blogspot.com/2019/04/wert-orientierte-und-erkenntnis.html" target="_blank">Wert-orientierte und erkenntnis-orientierte Vorstellungen</a></td><td style="border: 1px solid black;">12.04.2019</td>
</tr>
<tr style="border: 1px solid black;">
<td style="border: 1px solid black;"><a href="https://bertalsblog.blogspot.com/2019/03/perspektiven-des-denkens-ein.html" target="_blank">Perspektiven des Denkens - ein Zettelkasten</a></td>
<td style="border: 1px solid black;">22.03.2019</td>
</tr>
<tr style="border: 1px solid black;">
<td style="border: 1px solid black;"><a href="https://bertalsblog.blogspot.com/2018/11/technologie-und-okonomie-essay-von.html" target="_blank">Technologie und Ökonomie</a></td><td style="border: 1px solid black;">18.11.2018</td></tr>
<tr style="border: 1px solid black;">
<td style="border: 1px solid black;"><a href="https://bertalsblog.blogspot.com/2018/10/einschatzung-moderner.html" target="_blank">Einschätzung moderner Computertechnologie</a></td>
<td style="border: 1px solid black;">08.10.2018</td>
</tr>
<tr style="border: 1px solid black;">
<td style="border: 1px solid black;"><a href="https://bertalsblog.blogspot.com/2018/07/sind-wenn-dann-fragen-nutzlos-und-daher.html" target="_blank">Sind Wenn-Dann-Fragen nutzlos und daher zu vermeiden?</a></td>
<td style="border: 1px solid black;">31.07.2018</td>
</tr>
</tbody></table><p align="center" class="MsoNormal" style="line-height: normal; margin-bottom: 0cm; text-align: center;"><i style="mso-bidi-font-style: normal;"><span face="" lang="DE" style="font-size: 10pt;">Hiemanns Blog-Beiträge der letzten 2 Jahre</span></i></p><p align="center" class="MsoNormal" style="line-height: normal; margin-bottom: 0cm; text-align: center;"><i style="mso-bidi-font-style: normal;"><span face="" lang="DE" style="font-size: 10pt;"> </span></i></p><p align="center" class="MsoNormal" style="line-height: normal; margin-bottom: 0cm; text-align: center;"><i style="mso-bidi-font-style: normal;"><span face="" lang="DE" style="font-size: 10pt;"> <img alt="" height="400" src="data:image/jpeg;base64,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width="529" /></span></i></p><p align="center" class="MsoNormal" style="line-height: normal; margin-bottom: 0cm; text-align: center;"><i style="mso-bidi-font-style: normal;"><span face="" lang="DE" style="font-size: 10pt;"> Abschied <br /></span></i></p><p align="center" class="MsoNormal" style="line-height: normal; margin-bottom: 0cm; text-align: center;"></p>
<div><b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span face="" lang="DE" style="font-size: 12pt;"></span></i></b></div><h3 style="line-height: normal; margin-bottom: 0cm; text-align: left;"><b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span face="" lang="DE" style="font-size: 12pt;">Gesundheit und
Hinscheiden</span></i></b></h3>
<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span face="" lang="DE" style="font-size: 12pt;">Hiemanns letzte Jahrzehnte wurden durch ein Krebsleiden überschattet, das ihn am Sprechen
hinderte. Bei meinem letzten Besuch in Grasse vor 10 Jahren bediente er
sich einer Sprechhilfe. Man verspürte die Mühe, die dies bereitete. Umso
erstaunlicher ist es, mit welcher Ausführlichkeit und Schnelligkeit er
schriftliche Texte verfasste. Hiemann verstarb am letzten Sonntag, den 16.8.,
bei sich zuhause, in Anwesenheit mehrerer Familienangehöriger. Ihnen gilt mein aufrichtiges Beileid und Mitgefühl.<o:p></o:p></span></p><br /></div>Marcushttp://www.blogger.com/profile/01175903697403722050noreply@blogger.com6tag:blogger.com,1999:blog-8476761749021763994.post-78375461641361484532020-08-16T17:17:00.009+02:002020-08-28T14:23:23.022+02:00Dringender Aufruf die Welt neu zu sehen<p><!--[if gte mso 9]><xml>
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<p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span style="font-family: arial;">Maja Göpel (*1976) ist eine deutsche Politökonomin, die sich selbst als Transformationsforscherin und als Nachhaltigkeitswissenschaftlerin bezeichnet. Ihr Buch Unsere Welt neu denken (2020, 208 Seiten) schaffte es kurz nach Erscheinen auf die Bestsellerliste des SPIEGEL. Göpel ist im Hauptberuf Generalsekretärin des Wissenschaftlichen Beirats der Bundesregierung Globale Umweltveränderungen (WBGU). Zudem ist sie Hochschullehrerin, zuletzt im Rahmen einer Honorarprofessur an der Leuphana Universität Lüneburg. Sie schloss sich der von Greta Thunberg inspirierten Aktivisten-Gruppe Scientists for Future an.</span></p><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span style="font-family: arial;"><b>Noch ein Buch mit ökosozialem Anliegen</b></span></p><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span style="font-family: arial;">Wie bei vielen Büchern, besonders denen die von jungen Menschen auf den Markt gebracht wurden, steht das Thema Klimawandel im Mittelpunkt der Diskussion. Gemeint ist damit die Erderwärmung oder das Schmelzen der Gletscher. Göpel sieht das Thema etwas breiter. Für sie sind auch Demokratie und Wohlstand betroffen. Ehe man sich des Klimawandels und der andern globalen Umweltschäden bewusst wurde, glaubte man, dass die Natur, ihre Ressourcen und die Widerstandsfähigkeit des Planeten unbegrenzt seien. Es war eine Illusion zu glauben, dass alles weiter wachsen kann, und dass es die Hauptaufgabe des Menschen sei, sich die Erde untertan zu machen.</span></p><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span style="font-family: arial;"><b>Von der leeren zur vollen Erde</b></span></p><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span style="font-family: arial;">Das Farbfoto der aufgehenden Erde, das uns die Astronauten Frank Borman, William Anders und James Lovell im Dezember 1968 von Apollo 8 aus sandten, vermittelte zum ersten Mal ein anschauliches Bild, wie klein und empfindlich der Himmelskörper ist, auf dem die Menschheit lebt. Damals waren es 3,6 Mrd. Menschen. Ende 2019 lebten 7,7 Mrd. Menschen auf der Erde, also mehr als doppelt so viele. Der Planet hat noch (fast) exakt dieselbe Größe. Eine Ausweichmöglichkeit auf einen zweiten Himmelskörper ist nicht in Sicht. Was auch immer unsere Technik leisten mag, um das Ernährungsproblem in den Griff zu bekommen, ich bin sicher, dass dies auf Dauer nicht ausreichen wird.</span></p><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span style="font-family: arial;">Soll die Wirtschaft so weiter wachsen wie bisher, wird ein immer höher werdender Preis dafür zu zahlen sein, sei es in Form von Landverbrauch und Umweltverschmutzung. Aus der einst leeren Erde, auf der Sippen und Völker herumwandern, aber auf Distanz von einander bleiben konnten, ist eine volle Erde geworden, und sie füllt sich weiter. Viele spüren, dass unsere Welt an einem Kipp-Punkt steht. Es kann so nicht weitergehen.</span></p><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span style="font-family: arial;">Einerseits geht es uns so gut wie nie, andererseits zeigen sich Verwerfungen, Zerstörung und Krise, wohin wir sehen. Ob Umwelt oder Gesellschaft – scheinbar gleichzeitig sind unsere Systeme unter Stress geraten. Wir ahnen: So wie es ist, wird und kann es nicht bleiben. Wie finden wir zu einer Lebensweise, die das Wohlergehen des Planeten mit dem der Menschheit versöhnt?</span></p><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span style="font-family: arial;"><b>Aktuelle Diskussionen</b></span></p><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span style="font-family: arial;">Diskussionen darüber, was zu tun ist, gibt es viele. Die Lösungen, die vorgeschlagen werden, sind meistens Extreme. Es wird eine Wahl suggeriert. Entweder Wohlstand oder Klimaschutz; entweder Kapitalismus oder Ökodiktatur; entweder Freiheit oder Verbote. Das führt dazu, dass einige Leute in Angst versetzt werden, dass es ihnen ans Eingemachte geht. Sie versperren sich und lassen die Diskussionen auflaufen. Es werden zu wenige Vorschläge gemacht, die einen Kompromiss darstellen. Man sollte fragen, was es ist, worum sich die Leute sorgen, was für sie essentiell ist.</span></p><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span style="font-family: arial;">Wir müssen uns fragen, wie wir den Kuchen anders backen und verteilen. Unser Wohlstand darf nicht die Ursache für die Armut anderer Menschen sein, unsere Freiheit nicht der Grund dafür, dass andere ihre Heimat verlassen müssen.</span></p><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span style="font-family: arial;"><b>Suche nach dem Mittelweg</b></span></p><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span style="font-family: arial;">Es sei durchaus möglich soziale Belange und Umweltfragen miteinander zu verbinden. Wer weiß schon, wo der Weg liegt zwischen Verbotsregime und Schuldfragen auf der einen und Wachstumswahn und Technikversprechen auf der anderen Seite?</span></p><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span style="font-family: arial;">Das Soziale und das Ökologische miteinander zu versöhnen würde uns nicht nur beim Klima helfen. Es ist die Grundlage dafür, dass die Menschheit überhaupt weiter in Frieden auf dem Planeten leben kann. Die künstliche Trennung − hier der Mensch, da die Umwelt − lieferte in der Vergangenheit die Begründung dafür, warum die natürlichen Ressourcen so rücksichtslos ausgeplündert werden durften, als könne der Mensch ohne Umwelt existieren. Heute beeinflusst die Menschheit die natürlichen Entwicklungsprozesse der gesamten Erde. Daraus entsteht eine neue Verantwortung. Wir brauchen ein neues Weltbild, aber auch ein neues Selbstbild, um dieser Verantwortung gerecht zu werden.</span></p><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span style="font-family: arial;"><b>Was ist zu tun?</b></span></p><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span style="font-family: arial;">Es sollte angestrebt werden, dass der teils unsinnige Verbrauch von Ressourcen verringert wird. Wozu braucht man z. B. einen zwei Tonnen schweren Tesla, außer um damit Autorennen zu fahren? Viele Dinge lassen sich nachhaltig gestalten, ohne dass sie teurer werden oder Funktionalität einbüßen. Die fast maßlos betriebene Externalisierung von Kosten sollte unterbunden werden. Das Roden des Regenwalds, um billig Bio-Sprit für Europa zu gewinnen, sollte verhindert werden.</span></p><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span style="font-family: arial;"><b>Einordnung und Bewertung</b></span></p><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span style="font-family: arial;">Das Buch fällt dadurch auf, dass es eine klare Vorgabe definiert bezüglich dessen, was erreicht werden soll. Es hält sich jedoch weitgehend zurück, was konkrete Vorschläge für den Weg dorthin betrifft. Der Grund hierfür ist mir nicht ersichtlich. Vielleicht hängt es damit zusammen, dass Fallstudien typischerweise firmen- oder branchenspezifisch ausfallen und dass diese Daten in lokalen Seminaren Verwendung finden. Oder ist dieser Blick auf die Problematik noch zu ungewohnt? <br /></span></p><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span style="font-family: arial;">Ein anderer Gutachter bedauerte, dass in diesem Buch Karl Marx leider nicht vorkommt. </span></p><p class="MsoNormal" style="line-height: normal; margin-bottom: 0cm;"><span style="font-family: arial;">Ich habe mich darüber eher gefreut.</span><span face="" style="font-size: x-large;"> </span></p>Bertal Dresenhttp://www.blogger.com/profile/01435152037884170636noreply@blogger.com0tag:blogger.com,1999:blog-8476761749021763994.post-81446976790498050112020-08-11T17:37:00.012+02:002020-08-13T12:20:02.513+02:00Entscheiden: Über Wahrnehmung und Denk- und Verhaltensweisen (von Peter Hiemann) <div><p><!--[if gte mso 9]><xml>
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</p><p class="MsoNormal"><span style="mso-ansi-language: DE;">Die Annahme, dass wir uns
in jeder Situation über die existierenden Verhältnisse bewusst sind, ist ein
weit verbreiteter Irrtum. Der Neurowissenschaftlers António Damásio erkannte
einen grundlegenden Irrtum René Descartes. Damasio widerlegte Descartes'
Annahme, dass Materie und Geist unterschiedlichen Welten angehören und getrennt
voneinander betrachtet werden können Für den Soziologen Bruno Latour sind
menschliche Denk- und Verhaltensweisen fortwährend Irrtümern ausgesetzt.
Latour<span style="mso-spacerun: yes;"> </span>vertritt eine<span style="mso-spacerun: yes;"> </span>Akteur-Netzwerk-Theorie, in der die gängige
Unterscheidung zwischen Natur und Kultur aufgehoben ist. Ein Akteur im Sinne
Latours kann sowohl ein Mensch, als auch ein Ding, ein Tier oder eine Pflanze
sein, denn deren Welten lassen sich nicht voneinander trennen. </span><span lang=""></span></p>
<p class="MsoNormal"><span style="mso-ansi-language: DE;"> Es ist offensichtlich,
dass eine 'rechte' Denkweise im Sinne eines absoluten Begriffs nicht existiert.
Vielmehr sind Denkweisen individuelle Angelegenheiten. Jeder entscheidet im
Interesse seiner selbst, wie er komplexe Verhältnisse einschätzt, und was er in
einer gegebenen Situation für angebracht hält. Hier wird versucht, einige
typische privilegierte und allgemeine Entscheidungsprozesse in
unterschiedlichen Situationen zu beleuchten. </span></p>
<p class="MsoNormal"><span style="mso-ansi-language: DE;"> Entscheidungsprozesse
können mehr oder weniger 'sichtbar' gemacht werden, indem man<span style="mso-spacerun: yes;"> </span>individuelle Erzählweisen unter die Lupe
nimmt. Es ist heute ein offenes Geheimnis, dass vermittels Geschichten versucht
wird, andere Menschen zu beeindrucken und zu beeinflussen.<span style="mso-spacerun: yes;"> </span></span></p>
<p class="MsoNormal"><span style="mso-ansi-language: DE;"> Zum Beispiel:</span></p>
<p class="MsoNormal"></p>
<ul style="margin-top: 0cm;" type="disc"><li class="MsoNormal" style="mso-list: l0 level1 lfo1; tab-stops: list 36.0pt;"><span style="mso-ansi-language: DE;">Politische und ökonomische Führungskräfte
erzählen Geschichten, um<span style="mso-spacerun: yes;">
</span>Meinungshoheit zu erringen – aber oft so, dass sie die wahren
Gründe ihrer Entscheidungen verheimlichen oder gar Unwahrheiten
verbreiten. </span></li><li class="MsoNormal" style="mso-list: l0 level1 lfo1; tab-stops: list 36.0pt;"><span style="mso-ansi-language: DE;">Gerhard Polt erzählt Geschichten, indem er
sich selber zur Diskussion<span style="mso-spacerun: yes;"> </span>stellt –
aber so, dass verwerfliche Denkweisen sichtbar werden.</span></li><li class="MsoNormal" style="mso-list: l0 level1 lfo1; tab-stops: list 36.0pt;"><span style="mso-ansi-language: DE;">Georg Schramm erzählt Geschichten, indem er
Kunstfiguren sprechen lässt – aber so, dass Denkweisen kritisch und
tiefgründig hervorgehoben werden.</span></li><li class="MsoNormal" style="mso-list: l0 level1 lfo1; tab-stops: list 36.0pt;"><span style="mso-ansi-language: DE;">Volker Pispers erzählt Geschichten, indem er
Fragen stellt – aber so, dass jeder die Antwort selber finden könnte, wenn
er ein wenig mehr Logik zur Geltung brächte.</span></li><li class="MsoNormal" style="mso-list: l0 level1 lfo1; tab-stops: list 36.0pt;"><span style="mso-ansi-language: DE;">Die Pianistin Helene Grimaud erzählt
Geschichten, indem sie konzentrierte Dialoge voller Emotionen mit einem Orchester führt. <span style="mso-spacerun: yes;">
</span></span></li></ul>
<p class="MsoNormal"></p>
<p align="LEFT" lang="" style="margin-bottom: 0cm;">Wir alle erzählen
Geschichten auf unterschiedliche Weise: Nachfolgend
sei
auf ein paar typische Denk- und Verhaltensweisen hingewiesen. Sie
unterscheiden sich oft wesentlich dadurch, dass sie die Sicht
Privilegierter oder die Sichtweise der Allgemeinheit
repräsentieren.
Hinsichtlich einer privilegierten Sichtweise ist nicht von
vornherein
ersichtlich, ob ein tatsächliches Privileg vorliegt, weil jemand
über Wissen verfügt, von dem die Allgemeinheit ausgeschlossen ist.
Ob jemand nur annimmt privilegiert zu sein, muss jeder für sich
selbst beurteilen, indem er seine Denk- und Verhaltensweisen
reflektiert (hinterfragt). Folgende
Optionen sind typisch:</p>
<p class="MsoNormal"><span style="mso-ansi-language: DE;"> (1)<span style="mso-spacerun: yes;"> </span>Eine bevorzugte Denkweise vertreten: </span></p>
<p class="MsoNormal" style="margin-left: 54pt; mso-list: l1 level2 lfo2; tab-stops: list 54.0pt; text-indent: -18pt;"><span style="font-family: Symbol; mso-ansi-language: DE; mso-bidi-font-family: Symbol; mso-fareast-font-family: Symbol;"><span style="mso-list: Ignore;">-<span style="font: 7pt "times new roman";">
</span></span></span><span style="mso-ansi-language: DE;">Privilegierte
tendieren dazu, vermittels gewohnter Rituale alternative Denkweisen zu
verdrängen, und individuelle Denkweisen hervorzuheben.</span></p>
<p class="MsoNormal" style="margin-left: 54pt; mso-list: l1 level2 lfo2; tab-stops: list 54.0pt; text-indent: -18pt;"><span lang="" style="font-family: Symbol; mso-bidi-font-family: Symbol; mso-fareast-font-family: Symbol;"><span style="mso-list: Ignore;">-<span style="font: 7pt "times new roman";">
</span></span></span><span style="mso-ansi-language: DE;">Die
Allgemeinheit tendiert zu der Denkweise: Don't worry, be happy. </span><span lang=""></span></p>
<p class="MsoNormal"><span lang=""> </span><b><span lang="" style="mso-ansi-language: DE;"><span style="mso-spacerun: yes;"> </span></span></b><span style="color: black; mso-ansi-language: DE; mso-fareast-font-family: "Arial Unicode MS";">(2) Wahrnehmungen nicht
ernst nehmen: </span></p>
<p class="MsoNormal" style="margin-left: 54pt; mso-list: l4 level2 lfo5; tab-stops: list 54.0pt; text-indent: -18pt;"><span style="color: black; font-family: Symbol; mso-ansi-language: DE; mso-bidi-font-family: Symbol; mso-fareast-font-family: Symbol;"><span style="mso-list: Ignore;">-<span style="font: 7pt "times new roman";">
</span></span></span><span style="color: black; mso-ansi-language: DE; mso-fareast-font-family: "Arial Unicode MS";">Privilegierte tendieren dazu, kritische
gesellschaftliche Situationen zwar zu erkennen, sie aber nicht ernst zu nehmen
(man wird ja sehen).</span></p>
<p class="MsoNormal" style="margin-left: 54pt; mso-list: l4 level2 lfo5; tab-stops: list 54.0pt; text-indent: -18pt;"><span style="color: black; font-family: Symbol; mso-ansi-language: DE; mso-bidi-font-family: Symbol; mso-fareast-font-family: Symbol;"><span style="mso-list: Ignore;">-<span style="font: 7pt "times new roman";">
</span></span></span><span style="color: black; mso-ansi-language: DE; mso-fareast-font-family: "Arial Unicode MS";">Die Allgemeinheit tendiert dazu,
Wahrnehmungen zu vernachlässigen, direkt angebrachte Aktionen auf später zu
verschieben und erforderliche Aktionen am Ende zu vergessen.</span></p>
<p class="MsoNormal"><span style="color: black; mso-ansi-language: DE; mso-fareast-font-family: "Arial Unicode MS";"> (3) Eine gewohnte Denkweise unter
unterschiedlichen Umständen zulassen: </span></p>
<p class="MsoNormal" style="margin-left: 54pt; mso-list: l2 level2 lfo3; tab-stops: list 54.0pt; text-indent: -18pt;"><span style="font-family: Symbol; mso-ansi-language: DE; mso-bidi-font-family: Symbol; mso-fareast-font-family: Symbol;"><span style="mso-list: Ignore;">-<span style="font: 7pt "times new roman";">
</span></span></span><span style="mso-ansi-language: DE;">Privilegierte
tendieren dazu, an traditionellen Vorstellungen festzuhalten, auch wenn sich
die Umstände verändert haben.</span></p>
<p class="MsoNormal" style="margin-left: 54pt; mso-list: l2 level2 lfo3; tab-stops: list 54.0pt; text-indent: -18pt;"><span style="font-family: Symbol; mso-ansi-language: DE; mso-bidi-font-family: Symbol; mso-bidi-font-weight: bold; mso-fareast-font-family: Symbol;"><span style="mso-list: Ignore;">-<span style="font: 7pt "times new roman";"> </span></span></span><span style="mso-ansi-language: DE;">Die Allgemeinheit tendiert dazu, sich vorwiegend
an Wahrnehmungen zu orientieren, vielseitige Dynamik zwar sehen, sie jedoch
ignorieren.<span style="mso-spacerun: yes;"> </span></span></p>
<p class="MsoNormal"><b><span style="mso-ansi-language: DE;"> </span></b><span style="color: black; mso-ansi-language: DE; mso-fareast-font-family: "Arial Unicode MS";">(4) Eine Situation sowohl unter dem passiven
Aspekten 'Ja, aber' als auch unter dem <span style="mso-spacerun: yes;">
</span>aktiven Aspekt 'Warum denn nicht' betrachten: </span></p>
<p class="MsoNormal" style="margin-left: 54pt; mso-list: l3 level2 lfo4; tab-stops: list 54.0pt; text-indent: -18pt;"><span style="font-family: Symbol; mso-ansi-language: DE; mso-bidi-font-family: Symbol; mso-fareast-font-family: Symbol;"><span style="mso-list: Ignore;">-<span style="font: 7pt "times new roman";">
</span></span></span><span style="mso-ansi-language: DE;">Privilegierte
tendieren dazu, Probleme zwar zu erkennen, Gelegenheiten für Gewinn aber unter
allen Umständen wahrzunehmen.</span></p>
<p class="MsoNormal" style="margin-left: 54pt; mso-list: l3 level2 lfo4; tab-stops: list 54.0pt; text-indent: -18pt;"><span style="font-family: Symbol; mso-ansi-language: DE; mso-bidi-font-family: Symbol; mso-bidi-font-weight: bold; mso-fareast-font-family: Symbol;"><span style="mso-list: Ignore;">-<span style="font: 7pt "times new roman";"> </span></span></span><span style="mso-ansi-language: DE;">Die Allgemeinheit tendiert dazu, Situationen
reflexhaft destruktiv zu kritisieren, jedoch am Ende Situationen nicht
ausreichend zu reflektieren.<span style="mso-spacerun: yes;"> </span></span></p>
<p class="MsoNormal"><b><span style="mso-ansi-language: DE;"> </span></b><span style="color: black; mso-ansi-language: DE; mso-fareast-font-family: "Arial Unicode MS";">(5) Alternative Aspekte lediglich erörtern:</span></p>
<p class="MsoNormal" style="margin-left: 54pt; mso-list: l5 level2 lfo6; tab-stops: list 54.0pt; text-indent: -18pt;"><span style="color: black; font-family: Symbol; mso-ansi-language: DE; mso-bidi-font-family: Symbol; mso-fareast-font-family: Symbol;"><span style="mso-list: Ignore;">-<span style="font: 7pt "times new roman";">
</span></span></span><span style="mso-ansi-language: DE;">Privilegierte
t</span><span style="color: black; mso-ansi-language: DE; mso-fareast-font-family: "Arial Unicode MS";">endieren dazu, gesellschaftliche Probleme zwar
wahrzunehmen, jedoch mögliche Lösungen lediglich unter dem Aspekt zu
betrachten: So könnte es vielleicht auch funktionieren. </span></p>
<p class="MsoNormal" style="margin-left: 40px; text-align: left;"><span style="color: black; font-family: Symbol; mso-ansi-language: DE; mso-bidi-font-family: Symbol; mso-fareast-font-family: Symbol;"><span style="mso-list: Ignore;"> -<span style="font: 7pt "times new roman";">
</span></span></span><span style="color: black; mso-ansi-language: DE; mso-fareast-font-family: "Arial Unicode MS";">Die Allgemeinheit tendiert dazu, sich über
Probleme Sorgen zu machen, jedoch <span style="mso-spacerun: yes;"> </span>Lösungsvorschläge nicht
ernsthaft in Betracht zu ziehen.<span style="mso-spacerun: yes;"> </span></span></p>
<p class="MsoNormal"><b><span style="mso-ansi-language: DE;"> </span></b><span style="color: black; mso-ansi-language: DE; mso-fareast-font-family: "Arial Unicode MS";">(6) Bisherige Denk- und Verhaltensweisen müssen
sich ändern</span></p>
<p class="MsoNormal" style="margin-left: 54pt; mso-list: l6 level2 lfo7; tab-stops: list 54.0pt; text-indent: -18pt;"><span style="color: black; font-family: Symbol; mso-ansi-language: DE; mso-bidi-font-family: Symbol; mso-fareast-font-family: Symbol;"><span style="mso-list: Ignore;">-<span style="font: 7pt "times new roman";">
</span></span></span><span style="color: black; mso-ansi-language: DE; mso-fareast-font-family: "Arial Unicode MS";">Privilegierte tendieren dazu,
gesellschaftliche Polarisierungen als Hinweis auf sich ändernde
Gesellschaftsstrukturen zu interpretieren, und sind überzeugt, dass sich
gesellschaftliche Denk- und Verhaltensweisen<span style="mso-spacerun: yes;">
</span>langfristig grundlegend ändern müssen.</span></p>
<p class="MsoNormal" style="margin-left: 54pt; mso-list: l5 level2 lfo6; tab-stops: list 54.0pt; text-indent: -18pt;"><span style="color: black; font-family: Symbol; mso-ansi-language: DE; mso-bidi-font-family: Symbol; mso-fareast-font-family: Symbol;"><span style="mso-list: Ignore;">-<span style="font: 7pt "times new roman";">
</span></span></span><span style="color: black; mso-ansi-language: DE; mso-fareast-font-family: "Arial Unicode MS";">Die Allgemeinheit tendiert dazu anzunehmen,
dass sie sich gesellschaftliche Problemsituationen langfristig vermittels
technologischer Fortschritte von selbst auflösen werden. </span></p>
<p class="MsoNormal"><span style="mso-ansi-language: DE;">Geschichten, die
Betroffene katastrophaler Situationen erzählen, offenbaren die<span style="mso-spacerun: yes;"> </span>verworrenen, historischen
Entscheidungsprozesse, die zu solchen Situationen geführt haben. In Anhang 1
erzählen Opfer der Atombomben in Japan ihre Geschichten. In Anhang 2 wird die
Geschichte der radioaktiven Strahlung und speziell der Opfer der atomaren
Strahlung nach der Reaktorkatastrophe in Fukushima erzählt. </span></p>
<p class="MsoNormal"></p>
<p class="MsoNormal"><span style="mso-ansi-language: DE;">In Anhang 3 wird die
überraschende Geschichte erzählt, dass prominente Vertreter der Gesellschaft
schon seit Langem vor Erdzerstörung warnten, sich aber bisher gegen<span style="mso-spacerun: yes;"> </span>kommerzielle Interessenvertreter nicht
durchsetzen konnten. Einer, der wusste, wie ein gesellschaftlich bindender
Vertrag funktioniert, und das Volk zu begeistern vermochte, ist erinnerungswert:
</span><span lang=""><a href="https://www.youtube.com/watch?v=9-Wd0qLfJPY"><span lang="DE" style="mso-ansi-language: DE;">https://www.youtube.com/watch?v=9-Wd0qLfJPY</span></a></span><span style="color: black; mso-ansi-language: DE; mso-fareast-font-family: "Arial Unicode MS";"></span></p>
<p class="MsoNormal"><span style="color: black; mso-ansi-language: DE; mso-fareast-font-family: "Arial Unicode MS";">Es ist irreführend zu glauben, Erkenntnisse
der Naturwissenschaftler seien die Ursache, dass des Menschen Planet der
Zerstörung ausgesetzt wird. Richtig ist, dass technische Verfahren und Produkte
im Auftrag einer Regierung oder/und eines<span style="mso-spacerun: yes;">
</span>Unternehmens entwickelt werden, die wissenschaftliche Erkenntnisse
missbrauchen können und bereits missbraucht haben. </span></p>
<p class="MsoNormal"><span style="color: black; mso-ansi-language: DE; mso-fareast-font-family: "Arial Unicode MS";">Die gegenwärtigen gesellschaftlichen
Situationen weltweit erlauben keine Prognosen, wie Arbeitsbedingungen in 10
Jahren aussehen werden.<span style="mso-spacerun: yes;"> </span></span></p>
<p class="MsoNormal"><span style="color: black; mso-ansi-language: DE; mso-fareast-font-family: "Arial Unicode MS";"> Es muss nicht verwundern, dass Bevölkerungen
Geschichten für nutzlos halten, wenn<span style="mso-spacerun: yes;">
</span>deren Anliegen darin nicht reflektiert werden. Kritik, dass Geschichten
nicht verständlich sind, wenn sie den Jargon der Privilegierten verwenden,
kommt dazu. In diesem Zusammenhang sei auf eine Ansicht Martin Luthers
hingewiesen, die auch heute zutrifft::<span style="mso-spacerun: yes;">
</span>"Man muss die Mutter im Hause, die Kinder auf den Gassen, den
gemeinen Mann auf dem Markt fragen und denselbigen aufs Maul sehen, wie sie
reden und danach dolmetschen, so verstehen sie es dann und merken, dass man
Deutsch mit ihnen redet." </span></p>
<p class="MsoNormal"><span style="color: black; mso-ansi-language: DE; mso-fareast-font-family: "Arial Unicode MS";">Geschichten zu erzählen ist viel schwieriger
als oft vermutet wird. Die meisten<span style="mso-spacerun: yes;">
</span>Geschichten muss man nicht so ernst nehmen. Es geht ja nicht um
schwierige Entscheidungen, die nachteiligen Konsequenzen hinsichtlich
Beziehungen nach sich ziehen könnten. Jeder erzählt Geschichten, in denen
befriedigende Erlebnisse die wesentliche Rolle spielen. Jeder erzählt von
Situationen, auf die er sich freut.<span style="mso-spacerun: yes;"> </span></span></p>
<p class="MsoNormal"></p>
<p class="MsoNormal"><span style="color: black; mso-ansi-language: DE; mso-fareast-font-family: "Arial Unicode MS";">Bei der letzten Geschichte wird klar, dass
eine Option mit der Absicht, sich darstellen zu wollen, nicht haltbar ist.
Niemand kommt um eine unerfreuliche Situation am Ende seines Lebens herum. Man
kann nur versuchen, die Situation gelassen hinzunehmen, und zu hoffen, sie schmerzfrei
zu überstehen. </span></p>
<p class="MsoNormal"></p>
<p class="MsoNormal" style="mso-line-height-alt: 5.0pt;"><span style="color: black; font-family: ff3; mso-ansi-language: DE; mso-bidi-font-family: ff3; mso-fareast-font-family: "Arial Unicode MS";">Die Frage, warum ein unerfreuliches Ende
Menschen nicht erspart bleibt, bleibt<span style="mso-spacerun: yes;">
</span>unbeantwortet. Vermutlich weil Geburt und Tod notwendige Voraussetzung
für biologische Evolution sind. Fest steht, dass es am Ende nichts mehr zu entscheiden
gilt. </span><span lang=""></span></p>
<p class="MsoNormal" style="mso-line-height-alt: 5.0pt;"><span style="color: black; font-family: ff3; mso-ansi-language: DE; mso-bidi-font-family: ff3; mso-fareast-font-family: "Arial Unicode MS";">Am Ende kann man Nachfolgenden nur wünschen,
dass sie mit möglichen, auch kritischen Situationen zurechtkommen. Ob Essays,
in denen Gedanken festgehalten sind – von wem auch immer, am besten von sich
selber – dabei hilfreich sind, entscheidet jeder zu gegebener Zeit.</span></p><p class="MsoNormal" style="mso-line-height-alt: 5.0pt;"><span style="color: black; font-family: ff3; mso-ansi-language: DE; mso-bidi-font-family: ff3; mso-fareast-font-family: "Arial Unicode MS";"> </span></p>
<p align="center" class="MsoNormal" style="text-align: center;"></p>
<p align="center" class="MsoNormal" style="text-align: center;"><b><span style="color: black; font-size: 14pt; mso-ansi-language: DE; mso-fareast-font-family: "Arial Unicode MS";">Anhang 1: Count-down in ein neues Zeitalter: Hiroshima</span></b><span lang=""></span></p>
<p align="center" class="MsoNormal" style="text-align: center;"></p>
<p class="MsoNormal"><span style="color: black; mso-ansi-language: DE; mso-fareast-font-family: "Arial Unicode MS";">Die Atombombe, die 1945 auf Hiroshima fiel,
tötete mehr als 100.000 Menschen und symbolisierte das Ende des Zweiten
Weltkriegs, aber auch den Beginn des Atomzeitalters. Von da an bekamen
bewaffnete Konflikte, internationale Beziehungen und Sicherheitspolitik einen
völlig neuen Charakter. Ein Dokumentarfilm schildert die Ereignisse vor,
während und nach der Detonation und erzählt anhand von Berichten der letzten
Überlebenden die Geschichte dieses Wendepunktes mitten im 20. Jahrhundert. Er
beleuchtet auch die weltweit langfristigen Folgen des Atomwaffenabwurfs in
Hiroshima.</span><span lang=""></span></p>
<p class="MsoNormal"></p>
<p class="MsoNormal"><span style="color: black; mso-ansi-language: DE; mso-fareast-font-family: "Arial Unicode MS";">Am 6. August 1945 explodierte in 600 Metern
Höhe eine über Hiroshima abgeworfene Atombombe. Eine einzige Nuklearbombe war
für die Auslöschung einer Stadt und den Tod von mehr als 100.000 Menschen
verantwortlich. Sie wurde damit zur verheerendsten Waffe in der menschlichen
Geschichte und hat die Welt für immer verändert.</span><span lang=""></span></p>
<p class="MsoNormal"></p>
<p class="MsoNormal"><span style="color: black; mso-ansi-language: DE; mso-fareast-font-family: "Arial Unicode MS";">Die Dokumentation rekonstruiert die
wichtigsten Ereignisse vor, während und nach dem Abwurf der Atombombe. Er zeigt
das Geschehen in den Hauptquartieren der alliierten und der japanischen
Streitkräfte, die Gespräche in den Flugzeugen und die verwüsteten Straßen
Hiroshimas, stellt die maßgeblichen Akteure vor und erläutert die Situation an
den strategischen Punkten vor Ort.</span><span lang=""></span></p>
<p class="MsoNormal"></p>
<p class="MsoNormal"><span style="color: black; mso-ansi-language: DE; mso-fareast-font-family: "Arial Unicode MS";">Reichhaltiges Archivmaterial, spektakuläre
Bilder, vielfältige Quellen und berührende Gespräche mit den letzten
Augenzeugen machen diese Analyse zu einem wertvollen Zeitdokument. Überlebende,
die sich nie zuvor darüber geäußert haben, sprechen über Folgen der
Bombardierung in der zerstörten Stadt. Waisenkinder wurden an
Prostitutionsnetzwerke verkauft, Yakuza-Banden plünderten die Straßen und die
letzten Stadtbewohner kämpften mit Gewalt ums Überleben.</span><span lang=""></span></p>
<p class="MsoNormal"><span style="color: black; mso-ansi-language: DE; mso-fareast-font-family: "Arial Unicode MS";"> Unveröffentlichte Dokumente aus
Regierungskreisen und neu entdecktes Archivmaterial der japanischen
Rundfunkgesellschaft NHK bringen neue Erkenntnisse über die Geschichte der
diplomatischen Beziehungen zwischen den Konfliktparteien vor der Explosion. Die
Dokumentation konzentriert sich besonders auf die japanische Sicht der
Ereignisse.</span></p>
<p class="MsoNormal"></p>
<p class="MsoNormal"><span style="mso-ansi-language: DE; mso-bidi-language: #00FF; mso-fareast-font-family: "Arial Unicode MS"; mso-fareast-language: #00FF;">Quelle: <a href="https://www.arte.tv/de/videos/054197-000-A/count-down-in-ein-neues-zeitalter-hiroshima/"><span style="mso-ansi-language: DE;">https://www.arte.tv/de/videos/054197-000-A/count-down-in-ein-neues-zeitalter-hiroshima/</span></a></span></p><p class="MsoNormal"> </p><p class="MsoNormal"></p>
<p align="center" class="MsoNormal" style="text-align: center;"><b><span style="font-size: 13pt; mso-ansi-language: DE;">Anhang 2: Unser Freund, das Atom
- Das Zeitalter der Radioaktivität</span></b></p>
<p align="center" class="MsoNormal" style="text-align: center;"></p>
<p class="MsoNormal"><span style="mso-ansi-language: DE;">Im März 2011 wurde der
nukleargetriebene amerikanische Flugzeugträger "USS Ronald Reagan"
nach Japan beordert, um den Opfern des Tsunamis zu helfen. Dabei fuhr das
Schiff durch die radioaktive Wolke von Fukushima – alle Soldaten an Bord wurden
verstrahlt. - Die Dokumentation deckt in einer ausführlichen Chronik die Lügen
der Atomindustrie auf.</span></p>
<p class="MsoNormal"></p>
<p class="MsoNormal"><span style="mso-ansi-language: DE;">Die Entdeckung des Atoms
und der Radioaktivität zählt zu den bedeutenden wissenschaftlichen Entdeckungen
des 20. Jahrhunderts. Allerdings ließen sich die Forscher von ihren Erfolgen
blenden und verschleierten die Risiken. Die Dokumentation erzählt die
Geschichten japanischer Familien, die den Fukushima-Betreiber Tepco verklagt
haben, weil ihre Kinder nach der Nuklearkatastrophe an Schilddrüsenkrebs
erkrankten. </span></p>
<p class="MsoNormal"></p>
<p class="MsoNormal"><span style="mso-ansi-language: DE;">Außerdem kommen
US-Soldaten zu Wort, die mit ihrem Flugzeugträger durch die radioaktive Wolke
von Fukushima fuhren. Vor der Kamera schildern sie minuziös, was sich auf ihrem
Schiff ereignet hat. Auch die Soldaten haben Tepco verklagt. Auf beiden Seiten
des Pazifiks kämpfen die Betroffenen gegen die Zurückhaltung von Informationen.
</span></p>
<p class="MsoNormal"><span style="mso-ansi-language: DE;">Die Dokumentation geht zu
den Anfängen des Atomzeitalters zurück und stellt weitere Menschen vor, die
Opfer militärischer und industrieller Geheimhaltung wurden: Fischer und
Veteranen, die bei US-amerikanischen Tests im Bikini-Atoll verstrahlt wurden,
Hiroshima-Überlebende oder die jungen Arbeiterinnen in den US-amerikanischen
Radiumfabriken der 1920er Jahre. Radioaktivität kann man nicht sehen, nicht
riechen und nicht schmecken – trotzdem hat sie enorme Auswirkungen auf
Lebewesen. Ein japanischer Arzt erklärt, wie radioaktive Strahlung auf den
menschlichen Körper wirkt, warum sie Krebs verursacht – und wie man sich davor
schützen kann. Die Dokumentation liefert eine umfassende historische
Untersuchung von hundert Jahren Radioaktivität, erinnert an ihre Opfer, von den
Eheleuten Curie bis Fukushima, und deckt die Lügen der Atomindustrie auf.</span></p>
<p class="MsoNormal"><span style="mso-ansi-language: DE;"> Quelle: </span><span lang=""><a href="https://www.arte.tv/de/videos/087958-000-A/unser-freund-das-atom/"><span lang="DE" style="mso-ansi-language: DE;">https://www.arte.tv/de/videos/087958-000-A/unser-freund-das-atom/</span></a></span></p>
<p align="center" class="MsoNormal" style="text-align: center;"><span style="mso-ansi-language: DE;"> </span><b><span style="font-size: 13pt; mso-ansi-language: DE;"> </span></b></p><p align="center" class="MsoNormal" style="text-align: center;"><b><span style="font-size: 13pt; mso-ansi-language: DE;">Anhang 3: Die Erdzerstörer</span></b></p>
<p align="center" class="MsoNormal" style="text-align: center;"></p>
<p class="MsoNormal"><span style="mso-ansi-language: DE;">Mit der Erfindung der
Dampfmaschine fing es an. Mit revolutionärer Rasanz machte sich der Mensch die
Erde untertan. Eine Erfindung jagte die nächste, eine Technologie toppte die
andere. Für mehr Komfort. Mehr Konsum. Mehr Wohlstand. Und die Erde? Wie lange
hält sie den Menschen noch aus? Kompromissloser Blick auf die vergangenen 200
Jahre des Industriekapitalismus.</span></p>
<p class="MsoNormal"><span style="mso-ansi-language: DE;">Der Anstieg des
Meeresspiegels und das Abschmelzen der Polkappen stehen symptomatisch für einen
Prozess, der unaufhaltsam scheint. Regierungen und multinationale Konzerne werden
immer öfter als Verantwortliche ausgemacht: Umweltorganisationen reichen
Petitionen ein und berühmte Persönlichkeiten rufen zum Handeln auf. Forscher
veröffentlichen erschreckende Zahlen: Seit Beginn des Industriezeitalters
wurden über 1.400 Milliarden Tonnen Kohlenstoffdioxid in die Atmosphäre
gepumpt. Die biologische Vielfalt ging rapide zurück, und Prognosen sprechen
von 250 Millionen bis eine Milliarde Klimaflüchtlingen – hochgerechnet bis ins
Jahr 2050. Bis 2100 werden auf knapp 40 Prozent der Erdoberfläche Bedingungen
herrschen, mit denen kein lebender Organismus des blauen Planeten je
konfrontiert wurde. Würde man die Lebensdauer der Erde auf 24 Stunden
herunterbrechen, so entwickelte sich der Homo habilis in der allerletzten
Minute; das Holozän – die letzten 10.000 Jahre – entspräche der letzten
Viertelsekunde und das Industriezeitalter den zwei letzten Tausendstelsekunden.
</span></p>
<p class="MsoNormal"><span style="mso-ansi-language: DE;">In dieser kurzen Zeit hat
der Mensch eine so immense Kraft entwickelt, dass er die Macht über das System
Erde übernehmen konnte. „Die Erdzerstörer“ entstand in Zusammenarbeit mit den
Wissenschaftshistorikern Christophe Bonneuil und Jean-Baptiste Fressoz. Die
Autoren werfen einen kompromisslosen Blick auf die letzten 200 Jahre des
Industriekapitalismus: Sie erzählen vom Abbau der fossilen Brennstoffe, der
Erfindung des Automobils, der Kernkraft und dem Massenkonsum; vom
Imperialismus, von Kriegen, vom Wachstum der Städte, von industrieller
Landwirtschaft und von Globalisierung. Die Sendung möchte auch zeigen, wer für
all das verantwortlich ist. Denn die Schuld an der Umweltkrise trägt nicht die
Menschheit an sich – historisch gesehen trifft sie nur eine kleine Minderheit,
als erstes Nordamerikaner und Europäer. Die reichsten 20 Prozent der
Erdenbürger sind die schlimmsten CO2-Sünder, und ein Fünftel der
Weltbevölkerung pflegt heute die verschwenderische Lebensweise, die sich
bereits ab dem frühen 19. Jahrhundert im Bürgertum von Industrieländern und
Kolonialmächten entwickelte.</span></p>
<p class="MsoNormal"></p>
<p class="MsoNormal"><span style="color: black; mso-ansi-language: DE;">Quelle: </span><span lang=""><a href="https://www.youtube.com/watch?v=X7EDJRU3JCM"><span lang="DE" style="color: black; mso-ansi-language: DE;">https://www.youtube.com/watch?v=X7EDJRU3JCM</span></a></span><span style="color: black; mso-ansi-language: DE;"></span></p>
<p align="center" class="MsoNormal" style="text-align: center;"><span style="color: black; mso-ansi-language: DE;"> </span><b><span style="font-size: 14pt; mso-ansi-language: DE;"> </span></b></p><p class="MsoNormal" style="text-align: left;"></p></div>Bertal Dresenhttp://www.blogger.com/profile/01435152037884170636noreply@blogger.com1tag:blogger.com,1999:blog-8476761749021763994.post-24233711923733609192020-08-05T10:07:00.008+02:002020-09-26T11:17:34.849+02:00Roboter und Technik in der Gastronomie, der Pflege und der Medizin<div>
Robotertechnik ist ungeeignet für Menschen, die auf menschliche Hilfe angewiesen sind. – aus welchem Grund auch immer.' So schreibt es Peter Hiemann in seinem <a href="https://bertalsblog.blogspot.com/2020/07/peter-hiemann-uber-anfang-und-ende.html" target="_blank">Blog-Beitrag vom 25.7.2020</a>. Schon immer wunderte es mich, dass Asiaten eine völlig andere Einstellung diesem Thema gegenüber haben als wir Europäer. Eine aufklärende Untersuchung ist mir nicht bekannt. In einem Kommentar zu Hiemanns Beitrag führte ich aus: </div>
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<div>
Asiaten − speziell Japaner − haben angeblich keine Bedenken, sich von einem Roboter beim Essen bedienen oder bei der Gymnastik helfen zu lassen. Offensichtlich spielen zwei Aspekte eine Rolle. Ein Mensch, der einen anderen pflegt, müsse sich selbst erniedrigen. Derjenige, der auf Dienste einer Maschine im sehr persönlichen Bereich angewiesen ist, sei menschlich verlassen. Gegen solche Fehlschlüsse müsste man eigentlich angehen - würde ein klarer Kopf die Situation bestimmen.</div>
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<div>
Bei beidem scheinen mir historisch bedingte Vorurteile eine Rolle zu spielen. Logisch durchdacht ist es nicht. Ich selbst finde eine Maschine, die einen Menschen rasiert oder wäscht akzeptabler als wenn ein anderer Mensch (oder gar ein Hund) dies tut. Ich finde eine Maschine als Sport- und Sparrings-Partner völlig in Ordnung. Mir tut der Mensch leid, der sich dafür hergeben muss.</div>
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<b>Bertal Dresen (BD):</b> Es schloss sich eine Diskussion an darüber, ob Technik, die Leute davon abhält sich unmittelbar um Mitmenschen zu kümmern, gute Technik ist. Ein eklatantes Beispiel ist der Einsatz von Robotern in der Krankenpflege. Hiemann meinte, es dürfe dafür kein Geld ausgegeben werden. Ich meine, wenn dadurch Leiden reduziert wird, ist es etwas Gutes. </div>
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<div>
Durch Technik wurden nachgewiesenermaßen Leistungen aller Sinne ersetzt, obwohl diese vorher durch "persönlich notwendige menschliche Hilfe" abgelöst worden waren. Das begann mit dem Blindenführer und Vorleser/Vorbeter und endete mit dem Abstrahieren oder simultanen Übersetzen von Texten. Mir scheint das technisch Mögliche das bestimmende Kriterium zu sei, nicht so sehr, wer es ist, der vorher dafür Hilfestellung leistete und evtl. an die Seite gedrängt wird.</div>
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<div>
<b>Peter Hiemann (PH):</b> Die Japan Robot Association unterscheidet Manual Manipulator, Fixed Sequence Robot, Variable Sequence Robot, Playback Robot, Numerical Control Robot und Intelligent Robot. Ein Intelligent Robot verfügt über verschiedene Sensoren und ist damit in der Lage, den Programmablauf selbsttätig den Veränderungen des Werkstücks und der Umwelt anzupassen.</div>
<div>
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Hier steht zur Diskussion: Ist ein Roboter denkbar, der sich an eine Person (z.B. Stephen Hawking) anpasst, die auf Hilfe angewiesen ist? Kann ein Intelligent Robot persönliche Pflegedienste ersetzen? Ich habe die Aussage „Robotertechnik ist ungeeignet für Menschen, die auf menschliche Hilfe angewiesen sind. – aus welchem Grund auch immer“ ergänzt, um Missverständnis auszuschließen: Technik hilft, Pflegedienste zu erleichtern, Technik kann aber nicht persönliche, notwendige menschliche Hilfe ersetzen. Bertal Dresens Aussagen verdeutlichen mehr oder weniger eine konventionelle Sichtweise.<br />
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<b>BD:</b> Darf man Aussagen, die sich nicht an ˋkonventionelle Sichtweisen´ halten, alles glauben?</div>
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<div>
<b>PH:</b> Jeder entscheidet für sich, was er glaubt und wie er gedenkt zu agieren.
Es geht nicht um Vergleiche, was besser ist, sondern dass jeder sich
dafûr entscheidet, was er in einer gegebenen Situation für angebracht
hält: Einerseits...Andererseits.....<br />
<br />
Persönliche Pflegedienste aus ökonomischen Gründen einzuschränken, wird nicht mehr toleriert. Diese Meinung scheint sich immer mehr zu verbreiten.<b> </b>Persönliches, empathisches Verhalten ist keine Frage der Logik, sondern die Fähigkeit, sich in die Lage einer anderen Person hineinversetzen zu können</div>
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Es sei noch hinzugefügt, dass derzeit der Einsatz von Automatisierung, Robotik und KI-Anwendungen in der Gastronomie versucht wird. Es ist gut möglich, dass mit automatisierten Restaurants diejenigen mehr Erfolg haben werden, in denen die Kunden von Kellnern und Köchen auf persönliche Weise bedient werden. (<a href="https://www.heise.de/tp/features/Die-automatisierten-Robotikrestaurants-kommen-4130755.html" target="_blank">Quelle</a>)</div>
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<b>BD:</b> Dieser Tage ließ ich mich zum ersten Mal von einem mechanischen Heber aus der vorher eingenommenen Sitzposition hochheben, weil die therapeutische Fachkraft sich überfordert fühlte. Von dort ist es ein kleiner Schritt zu einem elektronisch gesteuerten Roboter.</div>
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Der Lifter, den ich nutzte und fotografierte, heißt Sabina 200 und stammt von der Firma Liko aus Luleå in Schweden. Skandinavische Wertarbeit, möchte ich dazu sagen. Mein Pfleger, der mich am Tag zuvor mit großer Mühe vom Topfroller auf meinen Rollstuhl zurückbugsiert hatte, bedauerte sehr, dass an dem Tage beide Personenlifter, über die das Pflegeheim verfügt, mal wieder kaputt seien. Er hofft, dass sie alsbald wieder zur Verfügung stehen.</div><div> </div><!--[if !mso]>
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgp43hQhgGxVy79IwVt9-Xz6QPuktK9a_DOn1hf3Ck9om6VWz8XSbUDASnd8q7l7R-5dLhBRKF1Tp4xntvJLJpFKz99QJylFnKCrcxvuvKgFqlMI3I8C8mskU4ULhX4Bvqo_x7pXoNhC999/s704/lifter1.jpg" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="704" data-original-width="530" height="500" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEgp43hQhgGxVy79IwVt9-Xz6QPuktK9a_DOn1hf3Ck9om6VWz8XSbUDASnd8q7l7R-5dLhBRKF1Tp4xntvJLJpFKz99QJylFnKCrcxvuvKgFqlMI3I8C8mskU4ULhX4Bvqo_x7pXoNhC999/w376-h500/lifter1.jpg" width="376" /></a></div>
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<i>Personenlifter Sabina 200 der Firma Liko</i></div>
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<b>Enkelin Kathrin:</b> Ich stimme BD (meinem Opa) zu. Der menschliche Kontakt sollte aber nicht darunter leiden. Ich bin ein großer Fan von Technik, insofern sie Menschen im Alltag und auch insbesondere bei schwereren Aufgaben wie z.B. beim "Personen aus dem Bett heben" unterstützt. Ein Personenlifter schließt den persönlichen Kontakt ja nicht aus, meistens werden die noch manuell durch einen Pfleger bedient.</div>
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Ich bin der Meinung, dass das mehr an Technik mehr qualitative Zeit für das Zwischenmenschliche ermöglicht. Wenn Pfleger und Roboter zusammenarbeiten und so Routineaufgaben beschleunigt oder erleichtert werden, bleibt mehr Zeit, sich genauer mit den Patienten auseinanderzusetzen. Zusätzlich würde das auch mehr Menschen ermöglichen, von zuhause aus mobil unterstützt zu werden und so nicht bei den Pflegern sondern bei der Familie zu sein.</div>
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Weiterer interessanter Artikel: <a href="https://www.dw.com/de/was-k%C3%B6nnen-was-sollen-roboter-in-der-pflege-leisten/a-49365268" target="_blank">"Was können, was sollen Roboter in der Pflege leisten?"</a></div>
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Marcushttp://www.blogger.com/profile/01175903697403722050noreply@blogger.com1tag:blogger.com,1999:blog-8476761749021763994.post-81558507077794494132020-07-25T20:34:00.000+02:002020-07-27T13:22:01.676+02:00Peter Hiemann über Anfang und Ende<div>
Alpha und Omega , der erste und der letzte Buchstabe des klassischen griechischen Alphabets, sind ursprünglich das Symbol für das Umfassende, für Gott und insbesondere für Christus als den Ersten und Letzten. </div>
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In der menschlichen Geschichte haben Menschen schon immer angenommen – auch heute – dass unbekannte Kräfte ihr Schicksal mehr oder weniger bestimmen.
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In diesem Essay geht es darum, dass Menschen vermittels zunehmenden Wissens Denk- und Verhaltensweisen angenommen haben, die es ihnen ermöglichen, mit Situationen selbst zurechtzukommen. </div>
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Die tatsächlichen menschlichen Denk- und Verhaltensweisen sind so vielfältig, dass es vermessen erscheint zu versuchen, ein sehr weitläufiges Thema in einem überschaubaren <br />
Rahmen zu behandeln. Hier wird es trotzdem versucht: <br />
<ul style="text-align: left;">
<li>Einige repräsentative, bewusste Handlungen in entscheidenden Situationen werden hervorgehoben werden. </li>
<li>Die bei Weiten häufigsten unbewussten menschliche Situationen – wie emotional empfundene Freude (bei Schönheit oder Liebe) oder emotional empfundene Abneigung (bei Herrschaftsgebaren oder Diskriminierung) – sind keine Anliegen des Essays.</li>
</ul>
Die Motivation, sich dem Thema Anfang und Ende zu widmen, sind die kritischen Zustände in der Natur und die derzeitigen gesellschaftlichen Verhältnisse weltweit.<br />
Homo sapiens befindet sich in einer Situation, in der er einerseits gewohnten Denk- und Verhaltensweisen nachgeht, andererseits bereits gezwungen ist umzudenken, um seine Umwelt zu erhalten. <br />
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Einerseits werden die gegenwärtigen Situationen unter konventionellen Aspekten betrachtet – danach <br />
<ul style="text-align: left;">
<li> besitzen alle Ereignisse einen Anfang und ein Ende</li>
<li>haben alle Wirkungen eine Ursache </li>
</ul>
Andererseits lassen sich die gegenwärtigen Situationen nur verstehen, wenn <br />
<ul>
<li>sie unter dem Aspekt eines verwobenen Bandes von Ereignisse betrachtet werden</li>
<li>sie Wechselwirkungen mit unvorhersehbaren Wirkungen berücksichtigen</li>
</ul>
Betrachtet man ein gesellschaftliches System unter dem Aspekt eines Organismus, ergeben sich interessante Analogien: <br />
<ul style="text-align: left;">
<li>Ein Anfang eines veränderten gesellschaftlichen Systems erfordert, dass alte und neue Elemente eine lebensfähige dynamische Struktur verflochtener, wechselwirkender Elemente ergeben. </li>
<li>In neu entstehende Strukturen werden Elemente übernommen, die sich in der Vergangenheit bewährt haben. </li>
<li>Eine sich neu ergebende Struktur gilt erst als überlebensfähig, wenn sie die Fähigkeit besitzt, sich über Generationen zu reproduzieren </li>
</ul>
Ein organisch strukturiertes System ist längerfristig stabil, solange dessen innere Wechselwirkungen nachhaltig sind – sie zielen auf ein 'Ganzes'. 'Sustainability' gilt als universelles Prinzip für den Umgang mit allen Ressourcen, ja sogar für eine Transformation unserer gesamten Lebensweise, also der Muster, wie wir produzieren, konsumieren und zusammenleben. In den Tiefenstrukturen eines 'Ganzen' werden Zusammenhänge und Kontinuität eines 'Ganzen' sichtbar (Ulrich Grober: “ Die Entdeckung der Nachhaltigkeit: Kulturgeschichte eines Begriffs).<br />
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Bei verflochtenen Wechselwirkungen entsteht oft der Eindruck, dass sich ein Organismus aufgrund von Wechselwirkungen aus sich heraus selbst organisiert . Daraus kann nicht der konventionelle Schluss gezogen werden, dass alle Menschen damit rechnen können, dass sich menschliches Gemeinwohl für alle mehr oder weniger auf natürliche Weise einstellen wird. <br />
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Solange Menschen dazu tendieren, sich für das Nächstliegende zu entscheiden und wichtige Aspekte einer Situation nicht antizipieren sondern ignorieren, Sorgfalt und Zusammenhänge vernachlässigen, sind Chancen für gemeinsames Wohlgefühl eher gering.<br />
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Am Ende gilt, sich für das Notwendige einzusetzen. <br />
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Einerseits .... </h3>
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Die Mehrheit der Bevölkerungen geht heute davon aus, dass Politiker, Unternehmer, Wissenschaftler, Ingenieure und 'Normalsterbliche' sich an konventionellen Vorstellungen orientieren: <br />
<ul style="text-align: left;">
<li>gesellschaftliche Autorität auszuüben </li>
<li>Vermögen zu besitzen </li>
<li>technischem Fortschritt zu vertrauen</li>
<li>Vorstellungen hervorzuheben</li>
<li>vorgegebene Vorstellungen zu übernehmen</li>
<li>vermittels demokratischer Wahlen zu gestalten </li>
</ul>
Die Mehrheit der Bevölkerungen setzt auf konventionelle Denk- und Verhaltensweisen. <br />
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Auf gesellschaftliche Autorität setzen</h3>
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Es ist nicht zu leugnen, dass es Führungspersonen vorwiegend darum ging, andere Menschen kontrollieren und beherrschen zu wollen. <br />
<ul style="text-align: left;">
<li>Die Pharaonen Ägyptens sahen sich als göttergleiche Herrscher. Vermittels der Ausgrabungen der Städte Heliopolis (Kairo), Theben (Luxor) und der versunkenen Hafenstand Herakleon / Thonis (nahe Alexandria) wissen wir heute, dass Ägyptens Herrscher die Sonne huldigten und sich gegen viele Feinde verteidigen mussten. Echnaton erhob den Gott Aton in Gestalt der Sonnenscheibe zum Gott über alle Götter Ägyptens. Griechische und römische Feldherren beendeten schließlich die Herrschaft der Pharaonen. </li>
<li>Die Herrscher der Inkas und Azteken sahen sich als „Söhne der Sonne“ und schufen durch Krieg und Unterdrückung vieler Volksstämme riesige Reiche. Gefangene nutzten sie als Arbeitssklaven und opferten sie ihren Göttern. Spanischen Könige beendeten die Kultur der Inkas und Azteken. </li>
<li>Ein Herrscher fühlte sich im 20. Jahrhundert berufen, die Welt zu erobern. Adolf Hitler begründete mit seiner Schrift “Mein Kampf“ eine antisemitische und rassistische Ideologie. Hitler wurde vermittels demokratischer Wahlen zum 'Führer' der deutschen Bevölkerung und verursachte den zweiten Weltkrieg. Vereinte militärische Aktionen der USA, Englands, Russlands und Frankreichs beendeten das menschenverachtende Regime Hitlers.</li>
</ul>
Ein Ende militärischer Auseinandersetzungen um Vorherrschaft in vielen Regionen der Welt ist nicht in Sicht. <br />
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Unmittelbar nach Beendigung des heißen Krieges gegen Hitler begann der 'Kalte Krieg' zwischen Regierungssystemen. Am Anfang war es ein Kampf zwischen marktorientierten und kommunistisch orientierten Systemen. Man glaubte dieser Kampf sei mit dem Zerfall der Sowjetunion beendet. <br />
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Wir erleben im 21. Jahrhundert nicht nur weiterhin heiße Kriege, sondern auch eine neue Phase des Kalten Krieges zwischen USA, China, Russland und der Europäischen Union. <br />
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Auf Vermögensbesitz setzen </h3>
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Warren Buffett, ein amerikanischer Unternehmer und Investor, ist ein typischer Vertreter der Finanzindustrie. Er wird oft mit den Worten zitiert: „Wenn in Amerika ein Klassenkampf tobt, ist meine Klasse dabei, ihn zu gewinnen.“ („If class warfare is being waged in America, my class is clearly winning.". Buffet bekräftigte seine Denk- und Verhaltensweise in einem Interview: „Es herrscht Klassenkrieg, richtig, aber es ist meine Klasse, die Klasse der Reichen, die Krieg führt, und wir gewinnen“<br />
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Das Geschäftsmodell von Investitionsbanken, Hedgefonds und Fondsgesellschaften ist, Kapital von Vermögenden in deren Auftrag zu vermehren. Mit dem Kapital ihrer vermögenden Klienten können sie am Kapitalmarkt frei operieren. Ihre Operationen sind Computer-gesteuert, spekulativ und hoch profitabel: <br />
<ul>
<li>Investmentfonds spekulieren auf Kursbewegungen von Unternehmensaktien (auf fallende Kurse vermittels Leerverkäufe.</li>
<li>Investmentfonds spekulieren auf Preise (Rohstoffe, Nahrungsmittel)</li>
<li>Investmentfonds erwerben Grundstücke – auch Agrarflächen – die sie selbst nicht nutzen, sondern die sie später gewinnbringend an Investoren verkaufen – an wen auch immer. Traditionelle Bauernbetriebe können Ackerland aufgrund gestiegener Preise nicht mehr erwerben. Agrarflächen , sie sind letztlich für Konzerne interessant, die industrielle Landwirtschaft betreiben wollen.</li>
<li>Hedge Funds und Privat Equity Funds dienen unter anderem dem Zweck, in Krisen geratene Unternehmen zu übernehmen, um noch florierende Teile der Unternehmen gewinnbringend an Investoren zu vermitteln. </li>
</ul>
Eines der renommierten Unternehmen ist BlackRock Inc., eine 1988 in New York City gegründete Fondsgesellschaft. Es kontrolliert 7,4 Billionen US-Dollar (Stand: 31. Dezember 2019), und ist der größte Vermögensverwalter weltweit. BlackRock hält erheblichen Beteiligungen an allen 30 DAX-Unternehmen und ist der größte Einzelaktionär an der Deutschen Börse. BlackRock hat sein Geschäftsmodell vermittels Börsen-gehandelten Fonds (ETF) erweitert. Damit hat BlackRock die Möglichkeit auf Vermögenswerte Einfluss zu nehmen, die er selbst handelt (kriminelle Manipulationen?),<br />
BlackRock gilt aufgrund des wirtschaftlichen und politischen Einflusses als „heimliche Weltmacht“ - als neoliberaler Vertreter des Kapitalismus. <br />
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Es ist ein Irrtum anzunehmen, dass Fondsgesellschaften operative Prozesse von Unternehmen unterstützen. Ihr Ziel ist es, hohe Profite vermittels Spekulationen zu erzielen, ohne sich in produktiven Operationen zu engagieren. <br />
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Es ist keine Frage, dass traditionell operierende Unternehmen Kapital brauchen, um ihre Operationen zu finanzieren. Für 'produktives' Kapital sorgen Geschäftsbanken. <br />
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Produktiv operierende Unternehmen setzen auf die Dominanz ihrer Produkte oder Dienstleistungen. Um ihre Interessen durchzusetzen<br />
<ul>
<li>unterhalten Unternehmen Lobbyisten, um politische Rahmenbedingungen in ihrem Sinn zu beeinflussen und zu gestalten. Günstige Rahmenbedingungen für mittelständische Unternehmen und traditionelle Agrarbetriebe werden oft vernachlässigt.</li>
<li>minimieren Unternehmen Arbeitskosten – etwa durch außertarifliche Zeitverträge. </li>
<li>delegieren Unternehmen die Bereitstellung von Arbeitskräften an Subunternehmer </li>
<li>nutzen Unternehmen Krisen, um Arbeitnehmer zu entlassen, ohne sich um deren zukünftige Perspektiven zu bemühen. </li>
<li>benutzen Unternehmen Druckmittel, um für sie günstige politische Rahmenbedingungen zu verhandeln – etwa mit der Drohung, Produktionsstätten zu verlagern.</li>
</ul>
Progressive Politiker fordern Investitionsbanken und Geschäftsbanken zu trennen, <br />
spekulative Finanztransaktionen wie Umsätze zu besteuern, und kommunale staatliche Funktionsträger in Infrastrukturprojekte einzubeziehen. <br />
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Konventionell orientierte Ökonomen beharren darauf, den Staat von unternehmerischen Einflüssen auszuschließen (Freiheit statt Sozialismus). Sie betrachten selbst staatliche Forschung unter kommerziellen Aspekten. <br />
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Auf technischen Fortschritt setzen </h3>
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Traditionell wird Technik von Bevölkerungen als gesellschaftlicher Fortschritt geschätzt. Stellvertretend für die breite Palette vorteilhafter Technik seien Automobil, Waschmaschine, Kühlschrank, Kaffeemaschine und Bohrmaschine genannt. Es ist auch Bestandteil traditioneller Ökonomie, dass Kunden mehr oder weniger regelmäßig Produkte mit jeweils neuester Technik erwerben. <br />
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Edward Murphy junior (1836 – 1911), Ingenieur, demokratischer Vertreter New Yorks im US Senat und später Bürgermeister der Stadt Troy, wurde weltweit bekannt durch sein Gesetz<br />
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„Alles, was schiefgehen kann, wird auch schiefgehen.“ <br />
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In dieser Form wird Murphys Gesetzes oft in dem Sinn interpretiertn dass Technik nicht fehlerfrei funktioniert. In der Urfassung des Gesetzes wird deutlich, dass Murphy auch die Benutzer von Technik im Sinn hatte: „Wenn es mehrere Möglichkeiten gibt, eine Aufgabe zu erledigen, und eine davon in einer Katastrophe endet oder sonstwie unerwünschte Konsequenzen nach sich zieht, dann wird es jemand genau so machen.“<br />
(“If there’s more than one possible outcome of a job or task, and one of those outcomes will result in disaster or an undesirable consequence, then somebody will do it that way.”)<br />
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Irgendwas ist schief gegangen, dass 2020 dominante IT-Unternehmen und Vermögensfonds als „heimliche Weltmächte“ gelten. <br />
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Das Unternehmen BlackRock dominiert weltweit Aktienmärkte vermittels eines in der Finanzwelt einzigartigem Risikomanagement-Systems. 5000 Computer sind Tag und Nacht damit beschäftigt, alle erdenklichen Szenarien eines Geschäfts durchzuspielen. Gehen die Zinsen rauf, runter, wie entwickelt sich die Auftragslage eines Unternehmens? <br />
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Unternehmen wie Google und Facebook dominieren vermittels ihrer Internetplattformen die Welt der Werbung.<br />
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Unternehmen wie Amazon dominieren die Welt des Online-Handels. <br />
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Informationstechnik erweiterte die Palette technischer Möglichkeiten so vielfältig, dass ihr Einfluss auf gesellschaftliche Verhältnisse nicht abzusehen ist. <br />
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Einerseits wird Informationstechnik geschätzt: <br />
<ul style="text-align: left;">
<li>sie erweist sich vermittels Vernetzung für Wissenschaftler als großer Vorteil für internationale Zusammenarbeit</li>
<li>sie ermöglicht Unternehmen neue Methoden für Design, Entwicklung und Produktion</li>
<li>sie ermöglicht Verwaltungen Services zu verbessern</li>
<li>sie ermöglicht 'Normalsterblichen' vermittels Personal Computer und Smartphone persönliche Anwendungen. </li>
</ul>
Andererseits wird Informationstechnik kritisiert: <br />
<ul style="text-align: left;">
<li>Robotertechnik ist ungeeignet für Menschen, die auf menschliche Hilfe angewiesen sind. – aus welchem Grund auch immer. </li>
<li>Computersysteme bewirken, dass Menschen Arbeit und Perspektiven verlieren. </li>
<li>Vernetzung führt in vielen Fällen zur Vernachlässigung von persönlichem Gedankenaustausch. </li>
<li>Virtuelle Spiele und virtueller Sport führt in vielen Fällen zur Vernachlässigung persönlicher Beziehungen. </li>
</ul>
Die traditionelle Medienindustrie ist aufgrund des Verlustes von Werbeumsätzen in finanziellen Schwierigkeiten Die traditionelle Medienindustrie hat auch an Bedeutung verloren, weil deren Online-Dienste zunehmend Informationen verbreiten, die nicht zur Aufklärung der Bevölkerung beitragen. Sie helfen 'Normalsterblichen' nicht, ihr Leben zu gestalten. Dazu gehören Geschichten über die Entdeckung von Elementarteilchen, bemannte Flüge zum Mars und phantastische Geschichten über Unsterblichkeit und die Nutzung Künstlicher Intelligenz. <br />
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Projekte, die von der Bevölkerung nicht verstanden werden, wirken verunsichernd und können bewirken, dass gesellschaftliche Verhältnisse auch unbegründet pessimistisch gesehen und kritisiert werden. <br />
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Auf Hervorheben von Vorstellungen setzen</h3>
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Menschen haben schon immer versucht , sich als besondere Spezies einzuschätzen. Besonders auffällig waren Versuche, eine Sonderstellung zu reklamieren:<br />
<ul style="text-align: left;">
<li>Schamanen gelten als rituelle Spezialisten, denen magische Fähigkeiten zugesprochen werden, um als Vermittler zur Geisterwelt zu fungieren. Schamanen üben dazu verschiedene mentale Praktiken und Rituale aus (zum Teil unter Drogengebrauch), mit denen normale Sinneswahrnehmung erweitert werden soll. Sie treten aus diversen Gründen in Kontakt zu den „Mächten des transzendenten Jenseits“. </li>
<li>Legenden über Mose gelten als Beginn der israelitischen Geschichte. Das Meerwunder am Schilfmeer leitete die Wüstenwanderung der Israeliten ein. Mose wurde von „Richtern“ eingesetzt, um die Stämme Israels durch einen Bundesschluss am Berg Sinai vermittels der Zehn Gebote zu vereinen. Moses Existenz beruht auf Erzählungen bzw. Legenden. die vorwiegend aus einer Priesterschrift stammen. Ein Pharao Ägyptens habe die wie Sklaven behandelten Israeliten in die Wüste ziehen lassen, um von Göttern gesandten Plagen über Ägypten zu beenden.</li>
<li>Siddhartha Gautama (563 – 483 v.Chr.) lehrte als Buddha (wörtlich der Erwachte) den Dharma (wörtlich die Lehre). Unter einem Buddha wird ein Wesen gesehen, das aus eigener Kraft die Reinheit und Vollkommenheit seines Geistes erreicht und somit eine grenzenlose Entfaltung aller in ihm vorhandenen Potenziale erlangt hat: vollkommene Weisheit (Prajna) und unendliches, zugleich aber auch begierdeloses, Mitgefühl (Karuna) mit allem Lebendigen. Buddhisten behaupten, dass das Erwachen eines Wesens von transzendenter Natur sei, mit dem Verstand nicht zu erfassen, und „tief und unergründlich wie der Ozean“ ist. Die Erfahrung des Erwachens entzieht sich einer Beschreibung mit sprachlichen Begriffen. Wer Reinheit und Vollkommenheit seines Geistes erreicht hat, beendet einen Kreislauf von Leben und Wiedergeburt im Nirwana. </li>
<li>Mohammed (570 - 632) behauptete, er sei Prophet und Gesandter Gottes. Mit Hilfe einer 15 Jahre älteren Kaufmannswitwe erlangte Mohammed finanzielle Unabhängigkeit und soziale Sicherheit. Auf diese Zeit nimmt auch eine mekkanische Sure im Koran direkten Bezug: „Hat dich Allah nicht als Waise gefunden und (dir) Aufnahme gewährt, dich auf dem Irrweg gefunden und recht geleitet, und dich bedürftig gefunden und reich gemacht?“ Der Islam verlangt von seinen Anhängern absolute Unterwerfung und Treue. Ein Leben der Unterwerfung und Treue wird nach dem natürlichen Ende im göttlichen Paradies belohnt. </li>
<li>Papst Pius IX. verkündete die Unfehlbarkeit päpstlicher Erkenntnisse. Papst Pius XII. verkündete die leibliche Himmelfahrt der Maria. Papst Johannes XXIII. hat die wohl salomonischste Haltung zum Dogma, dass der Papst unfehlbar sei, eingenommen. Gleich nach seiner Wahl zum Papst 1958 erklärte Johannes XXIII.: "Ich bin zwar jetzt unfehlbar, gedenke aber nicht, davon Gebrauch zu machen." </li>
<li>Die Annahme, man könne sich auf christliche Werte berufen, um Gesellschaften friedlich zu gestalten, haben sich nicht bewährt. Die christlichen Prinzipien wie „Liebe Deinen Nächsten wie Dich selbst!“ und „Liebet eure Feinde und betet für eure Verfolger“ haben sich als irrealen Vorstellungen erwiesen, sie haben Frieden nicht bewirkt. </li>
</ul>
An Prinzipien und Ritualen festzuhalten, sind klassische Methoden, an konventionellen Denkweisen festzuhalten. Es ist kein Geheimnis, dass Politiker häufig ideologische Vorstellungen als Druckmittel nutzen (Geh zur Hölle!), um Bevölkerungen auf ihre Ziele festzulegen. <br />
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Hervorheben von Vorstellungen und diskriminierende Verhaltensweisen scheinen Kinder derselben Geisteshaltung zu sein. Im Mittelalter betrieben sowohl Moslems des Orients als auch Christen des Abendlandes 'lukrativen' Sklavenhandel. <br />
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Die Zeit geht zu Ende, in der Angeben oder Besserwisserei geschätzt wird. <br />
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<h3 style="text-align: left;">
Auf vorgegebene Vorstellungen setzen</h3>
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Die wohl am stärksten wirksame vorgegebene gesellschaftliche Vorstellung ist die Annahme, dass die unsichtbare Hand des Marktes kapitalistisch orientierte Gesellschaftsverhältnisse regelt. Dabei wird übersehen, dass Unternehmen weniger auf unvorhersehbare Preise setzen, sondern ihre Renditen planen. Die Vorstellung der unsichtbaren Hand des Marktes bewirkt, dass<br />
<ul style="text-align: left;">
<li>Politiker für entstandene Problemsituationen nicht geradestehen, und keine Verantwortung für konkrete gesellschaftliche Verhältnisse übernehmen</li>
<li>Unternehmer unzureichende Verantwortung für Mitarbeiter übernehmen </li>
</ul>
Derzeit ist wie schon häufig in Brüssel ein „Jahrmarkt der Selbstinszenierung“ europäischer Regierungschefs zu beobachten. Es geht um den Corona-Wiederaufbaufond und den EU-Haushalt. Ost gegen West, Nord gegen Süd - alle klassischen Rollenspiele werden auch diesmal in Brüssel aufgeführt. Ein Scheitern des derzeitigen Sondergipfels wäre der Beginn der Selbstaufgabe der EU. Und diese Selbstaufgabe der EU nutzt niemandem (Ralph Sina, ARD-Studio Brüssel). <br />
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Es darf übrigens bezweifelt werden, dass schon bereitgestellte staatliche, finanziellen Mittel an Unternehmen zur Bewältigung der Coronaviruskrise verantwortungsvoll verwendet werden.<br />
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Ein Nebenschauplatz der Selbstinszenierung betrifft die IT Industrie. Ingenieure entwickeln Produkte, ohne Einfluss zu haben, wie ihre Produkte in Unternehmen eingesetzt werden.<br />
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Es ist auch fraglich, ob derzeit angebotene biologische Produkte tatsächlich aus biologisch operierenden Agrarbetrieben stammen. Auf Soja basierende Produkte stammen vor allem aus umweltschädlichen Anbaugebieten der USA und Brasiliens. <br />
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Wahrheiten politischer und ökonomischer Absichten zu kaschieren und politische Verantwortung zu vernachlässigen bewirkt, dass traditionelle politische Parteien zunehmend Wähler verlieren und die Anzahl von Nichtwählern zunimmt. Es verschafft national orientierten Parteien legale Gelegenheiten, für ihre Vorstellungen Wähler zu gewinnen. Der langfristige Erfolg oder Misserfolg gesellschaftlicher Bewegungen hängt von deren Gefolgschaften ab. <br />
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Selbst selbsternannte Experten die in Büchern und Talkshows empfehlen, das Jetzt so intensiv als möglich zu genießen, sind kurzfristig sehr erfolgreich. <br />
<br />
Oft stellen sich Fragen, warum 'Normalsterbliche' – ziemlich unabhängig vom Bildungsstand – auf vorgegebene Vorstellungen setzen: <br />
<ul>
<li>Suchen sie Gemeinschaft?</li>
<li>Suchen sie in einer Gruppe Geborgenheit?</li>
<li>Wollen sie sich profilieren und beweisen?</li>
<li>Glauben sie, dass Kritik an Außenstehende hilft, sich behaupten zu können?</li>
</ul>
Vermutlich Ist die Zeit gekommen, dass vorgegebene Vorstellungen bedenkenlos und leichtfertig zu übernehmen, immer weniger respektiert wird und zu vermeiden ist. In Fällen, da vorgegebene Vorstellungen bedenkenlos übernommen werden, besteht die Gefahr des Verlustes der Motivation, sich um neue Erkenntnisse zu bemühen. <br />
<br />
<h3 style="text-align: left;">
Auf demokratische Wahlen setzen</h3>
<div>
<br /></div>
Die Mehrheit der europäischen Bevölkerung ist der konventionellen Auffassung, dass freie demokratische Wahlen ausreichen, um Staaten menschengerecht zu gestalten. <br />
<br />
Dabei wird übersehen, dass gesellschaftliche Gestaltung Engagement der Bevölkerung voraussetzt. <br />
<br />
Dabei wird übersehen, dass Politiker für die Öffentlichkeit soziale Gemeinschaft und Gerechtigkeit zwar betonen (predigen), dass es jedoch um andere Zielsetzungen geht: <br />
<ul style="text-align: left;">
<li>In Europa versuchen Politiker (ziemlich erfolglos), die Europäischen Union als internationalen Machtfaktor zur Geltung zu bringen. Sie versuchen gemeinsame, liberale und solidarische Verhältnisse aufrecht zu erhalten und zu verteidigen.</li>
<li>In USA wird versucht, vermittels einer national orientierten Politik (america first) eine führende Rolle in der Welt aufrecht zu erhalten und zu verteidigen.</li>
<li>In Russland wird versucht, vermittels eines zaristischen (oligarchischen) Systems die Kontrolle über Territorien des vergangenen Zarenreiches wiederzuerlangen. </li>
<li>In China wird angestrebt, die führende Rolle in der Welt zu übernehmen. Xi Jinping ist seit 2012 Generalsekretär der Kommunistischen Partei Chinas sowie Vorsitzender der Zentralen Militärkommission und seit 2013 Staatspräsident der Volksrepublik China. Xi Jinping gilt derzeit aufgrund seiner autokratischen Machtfülle als einer der mächtigsten Herrscher auf der Erde. 2018 ließ er die Amtszeitbegrenzung des Präsidenten aufheben und ermöglichte sich seine Regierungsgewalt auf Lebenszeit. Xi verfolgt eine aggressivere Außen- und Innenpolitik und eine „patriotische“ Ideologisierung und Kontrolle der Bevölkerung vermittels digitaler Überwachung. </li>
</ul>
Liberal orientierte Staaten sind unter Druck geraten, weil Politiker, Unternehmer und auch 'Normalsterbliche' Privilegien und Freiheitsgrade in Anspruch nehmen, die gesellschaftliche Verhältnisse polarisieren, destabilisieren oder gar kriminelle Verhaltensweisen erlauben. <br />
<br />
Zweifel am Sinn existierenden demokratischen Wahlen ohne Engagement der Wähler sind berechtigt und angebracht. <br />
<br />
Ein derzeitiger Rentner erlebt derzeitige demokratische Verhältnisse auf seine Weise: <a href="https://www.youtube.com/watch?v=47uCgsVpzzk">https://www.youtube.com/watch?v=47uCgsVpzzk</a><br />
<br />
<h3 style="text-align: left;">
Andererseits .....</h3>
<div>
<br /></div>
<div>
<div class="separator" style="clear: both; text-align: center;">
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<br /></div>
Während konventionell orientierte Politiker und Ökonomen dazu tendieren, Wahrheiten über gesellschaftliche Verhältnisse zu kaschieren, scheuten sich einige herausragende Wissenschaftler nicht, die Öffentlichkeit auf wichtige Aspekte gesellschaftlicher Verhältnisse hinzuweisen:<br />
<br />
Der Physiker Albert Einstein (1879 – 1955) wies die Öffentlichkeit aufgrund seiner Erfahrungen darauf hin:<br />
<br />
"Zwei Dinge sind unendlich: das Universum und die menschliche Dummheit, aber bei dem Universum bin ich mir noch nicht ganz sicher.<br />
An der Grenze des Wissens beginnt der Glaube.<br />
Das Wort Gott ist für mich nichts als Ausdruck und Produkt menschlicher Schwächen, die Bibel eine Sammlung ehrwürdiger, aber doch reichlich primitiver Legenden.<br />
Die moralischen Qualitäten der führenden Persönlichkeiten sind für eine Generation und für den Lauf der Geschichte vielleicht von noch größerer Bedeutung als rein intellektuelle Leistungen.<br />
Die Schule sollte stets danach trachten, daß der junge Mensch sie als harmonische Persönlichkeit verlasse, nicht als Spezialist.<br />
Wenige sind imstande, von den Vorurteilen der Umgebung abweichende Meinungen gelassen auszusprechen; die Meisten sind sogar unfähig, überhaupt zu solchen Meinungen zu gelangen.<br />
Nichts wahrhaft Wertvolles erwächst aus Ehrgeiz oder bloßem Pflichtgefühl, sondern vielmehr aus Liebe und Treue zu Menschen und Dingen.<br />
Jedem tiefen Naturforscher muß eine Art religiösen Gefühls naheliegen, weil er sich nicht vorzustellen vermag, daß die ungemein feinen Zusammenhänge, die er erschaut, von ihm zum erstenmal gedacht werden".<br />
<br />
Der Physiker Erwin Schrödinger (1887 – 1961) beeindruckte die Öffentlichkeit, indem er auf einen grundlegenden Unterschied zwischen physikalisch und biologisch orientierten Strukturen hinwies:<br />
<br />
"Wir Physiker und Chemiker haben uns bisher nicht mit Unterschieden zwischen stofflichen und lebenden Strukturen befasst.<br />
Lebenswichtige Teile eines Organismus sind völlig verschieden von der Struktur jedes Stückes Materie.<br />
Die wesentliche Eigenschaft des Lebens besteht darin, Ordnung von Generation zu Generation weiterzugeben. Da die materielle Verkörperung dieser Ordnung offenbar Platz in einer einzelnen Zelle findet , muss sie in Gestalt eines 'Codes' gespeichert sein".<br />
<br />
Der Physiker Stephen Hawking Stephen (1942 – 2018 wies darauf hin:<br />
<br />
"Wenn wir nicht lernen, uns auf mögliche Gefahren vorzubereiten und sie zu vermeiden, könnte KI (Künstliche Intelligenz) das schlimmste Ereignis in der Geschichte unserer Zivilisation sein. Sie bringt Gefahren mit sich, wie mächtige autonome Waffen oder neue Wege für die Wenigen, die Vielen zu unterdrücken".<br />
<br />
Am Anfang des 21. Jahrhundert sind mehr oder weniger alle Politiker, Unternehmer, Wissenschaftler, Ingenieure und 'Normalsterbliche' 2020 gezwungen, konventionelle Vorstellungen zu überdenken.<br />
<br />
Wer sich vornimmt, existierendes Verhalten zu ändern , hat zu entscheiden: <br />
<ul style="text-align: left;">
<li>Verhaltensweisen, die sich für die Gemeinschaft nicht bewährt haben, zu beenden.</li>
<li>Verhaltensweisen, die sich für die Gemeinschaft bewährt haben, zu erhalten</li>
<li>Neue Verhaltensweisen zu erwerben, um die Gemeinschaft nachhaltig zu gestalten. </li>
</ul>
'Normalsterbliche' mögen Eliten drängen, im Sinne des Gemeinwohls zu agieren.Im Allgemeinen ist es nicht möglich, politische Eliten in die Pflicht zu nehmen.<br />
<br />
Für alle an einer Gesellschaft beteiligten ist aber möglich <br />
<ul>
<li>sich beschränktes Wissen anzueignen,</li>
<li>Wissen mit Anderen auszutauschen</li>
<li>Wissen orientierte Kooperation zu praktizieren</li>
<li>sich empathisch zu verhalten </li>
</ul>
Der Hinweis auf beschränktes Wissen bezieht sich auf die Tatsache, dass absolute Erkenntnis nicht existiert, und dass Menschen lernen und akzeptieren müssen, auch mit Situationen fertig zu werden, da zuverlässiges Wissen (noch) nicht verfügbar ist. <br />
<br />
Je mehr Menschen sich ernsthaft über derzeitige gesellschaftliche Problemsituationen Gedanken machen, desto mehr werden gesellschaftliche Bereiche deutlich, in denen konventionelle Betrachtungen bzw. Denk- und Verhaltensweisen nicht ausreichen: <br />
<ul>
<li>Fortschritte in Wissenschaft und Technik </li>
<li>Umgang mit Pandemien </li>
<li>Ausbeutung von Entwicklungsländern </li>
<li>Nachhaltige Hilfe für Entwicklungsländer </li>
<li>Beendigung von Umweltzerstörung</li>
<li>Beendigung von Stadtzersiedlung </li>
</ul>
<div>
<br /></div>
<h3 style="text-align: left;">
Fortschritte in Wissenschaft und Technik </h3>
<br />
Wir verfügen im 21. Jahrhundert über Computertechnologie unglaublicher Vielfalt: <br />
<ul>
<li>Astrophysikalische Beobachtungsstationen für eine breite Palette physikalischer Strahlungen</li>
<li>Satelliten für die Beobachtung und Analyse der Erdoberfläche</li>
<li>Automaten für genetische Analysen</li>
<li>Technologie für genetische Veränderungen</li>
<li>Technologie für pharmazeutische Entwicklungen</li>
<li>Analyse- und Diagnosegeräte im Gesundheitswesen </li>
<li>Effektive Methoden für Erkennen und Analysen von Mustern</li>
</ul>
Im Vergleich zu konventionellen Computeranwendungen ermöglichen neue Technologien ungeahnte Anwendungen vermittels <br />
<ul>
<li>Big-Data und Data-Clouds </li>
<li>Algorithmen mit Künstlicher Intelligenz</li>
<li>Deep-Learning Algorithmen </li>
<li>Sensortechnologien </li>
<li>Quantentechnologie </li>
</ul>
Bei Entwicklungen neuer Technologie sind ein paar Aspekte zu beachten, die leicht übersehen werden: <br />
<ul style="text-align: left;">
<li>Es gibt Situationen, für die lange Zeit kein oder nur unvollständiges Wissen existiert, um sie zu verstehen. </li>
<li>Für viele Situationen können lediglich wahrscheinliche Aussagen gemacht werden. </li>
<li>Konkurrenz zwischen Wissenschaftlern an Universitäten fördert Kreativität, auch wenn keine ökonomischen Interessen verfolgt werden. Wissenschaftler im Dienst großer Konzerne vertreten deren geschäftlichen Interessen.</li>
<li>Trotz mehr oder weniger 'revolutionärer' technologischer Veränderungen bleiben traditionelle Kultur-prägende wissenschaftliche Leistungen und außerordentliche künstlerische Werke bewundernswert. </li>
</ul>
Kritik, dass führende gesellschaftliche Vertreter nicht erkennen lassen, die großen gesellschaftlichen Probleme des 21. Jahrhunderts ernsthaft anzugehen, ist solange berechtigt, solange sie keine konkreten Vorschläge für Lösungen der großen Probleme des 21. Jahrhunderts vorlegen. <br />
<br />
<h3 style="text-align: left;">
Umgang mit Pandemien </h3>
<div>
<br /></div>
Die derzeitige brandgefährliche Coronaviruspandemie hat Länder weltweit unvorbereitet getroffen. Das neue Virus Covid-19 verursacht schwere Lungenerkrankungen, die tödlich verlaufen können. Das Virus kann sich aber auch unentdeckt vermehren, wenn Personen keine Krankheitssymptome aufweisen. <br />
<br />
Eine Pandemie erfordert weltweit koordinierte Maßnahmen, um sie unter Kontrolle zu bringen. Sie erfordert <br />
<ul style="text-align: left;">
<li>aufwändige Forschung nach wirksamen Medikamenten und Impfstoffen </li>
<li>einschränkende Verhaltensweisen, um die Ausbreitungsgeschwindigkeit zu verringern </li>
<li>Grenzkontrollen, um grenzüberschreitende Infektionen zu verhindern </li>
<li>Verbesserung der Gesundheits- und Sozialsysteme </li>
</ul>
Pandemien können gesellschaftliche Verhältnisse schwer belasten, vor allem auch durch ökonomische Einbrüche mit Zunahme von Insolvenzen und Arbeitslosigkeit.<br />
<br />
<h3>
Ausbeutung von Entwicklungsländern</h3>
<div>
<br /></div>
Bevölkerungen industrialisierter Länder sind sich nicht bewusst, dass ihr Wohlstand zum großen Teil auf Kosten von Entwicklungsländern beruht: <br />
<ul style="text-align: left;">
<li>weil unzureichende Löhne an lokale Fabrikarbeiter*innen gezahlt werden</li>
<li>weil unzureichende Preise für lokale Agrarprodukte gezahlt werden</li>
<li>weil Preise exportierender Länder kostendeckende Preise lokaler Unternehmer unterbieten</li>
<li>weil der Export genetisch veränderter Pflanzen die Autonomie lokaler Agrarbetriebe verhindert</li>
</ul>
Es ist unverantwortlich, wenn global operierende Unternehmen Ressourcen von Entwicklungsländern ausbeuten, und danach eine zerstörte Umwelt hinterlassen (z.B. Ölbohrungen in Nigeria). <br />
<br />
Der Ausbeutung von Entwicklungsländern kann nur vermittels internationaler politischer Rahmenbedingungen bewirkt, und Verstöße dagegen müssen vermittels internationaler Gerichte geahndet werden. <br />
<br />
<h3 style="text-align: left;">
Nachhaltige Hilfe für Entwicklungsländer </h3>
<div>
<br /></div>
Bevölkerungen leiden unter Hunger und Durst vor allem aufgrund von Krieg, Umweltkatastrophen aber auch aufgrund von Geschäftsmodellen global operierender <br />
Unternehmen. <br />
<br />
Regierungen industrialisierte Staaten sind aufgerufen,Entwicklungsländer zu unterstützen, deren Autonomie zu stärken: <br />
<ul style="text-align: left;">
<li>vermittels non-profit Investitionen in Infrastrukturen (vor allem Verkehr und Transport)</li>
<li>vermittels non-profit Investitionen in Bildungsstätten</li>
<li>vermittels non-profit Investitionen ins Gesundheitswesen</li>
<li>vermittels Sendung von Ausbildungspersonal</li>
<li>vermittels Export und Wartung lokal sinnvoller Technik </li>
<li>vermittels günstiger lokaler Kredite</li>
</ul>
Es muss international beendet werden, in Entwicklungsländer <br />
<ul style="text-align: left;">
<li>billige Nahrungsmittel zu exportieren </li>
<li>dort Quell- und Grundwasser zu privatisieren</li>
<li>dorthin nutzlose Technik zu exportieren</li>
<li>dorthin Waffen zu exportieren</li>
</ul>
<div>
<br /></div>
<h3 style="text-align: left;">
Beendigung von Umweltzerstörung </h3>
<div>
<br /></div>
Es gilt als erwiesen, dass der Markt nicht wie angenommen ausreicht, gesellschaftliche Verhältnisse zu regeln. Industrielle Interessen haben bewirkt, dass sich die Umwelt so verändert hat, dass menschengerechtes Leben gefährdet wird – durch:<br />
<ul style="text-align: left;">
<li>Zerstörung tropischer Wälder </li>
<li>Zerstörung natürlicher Fischgründe </li>
<li>Industrialisierung der Agrarwirtschaft</li>
<li>Industrialisierung der Tierhaltung</li>
<li>Missbrauch von Antibiotika und Pestiziden</li>
<li>Belastung des Grundwassers durch Nitrate</li>
<li>Belastung der Atmosphäre durch konventionelle Stromerzeugung </li>
<li>Veränderung des Klimas</li>
</ul>
Internationale Konferenzen, an denen wissenschaftliche Experten und Politiker Ansichten austauschen, weisen darauf hin, dass nur vermittels einer weltweit grundlegenden ökosozialen Orientierung weitere Zerstörungen der Umwelt und Klimakatastrophen vermieden werden können. Es gilt verantwortungsvoll zu handeln. <br />
<br />
<h3 style="text-align: left;">
Beendigung von Stadtzersiedlung </h3>
<div>
<br /></div>
Kommerzielle Interessen haben wesentlich zur Zersiedlung der Städte beigetragen: <br />
<ul style="text-align: left;">
<li>Missbrauch städtischer Wohnungen durch kurzfristige Vermietung (Airbnb)</li>
<li>Ersetzen städtischen Wohnraums durch profitable Bürogebäude (Banken, Versicherungen) </li>
<li>Ersetzen städtischer, spezialisierter Läden durch Supermärkte an der Peripherie</li>
<li>Unkontrolliertes Wachstum städtischer Elendsvierteln</li>
<li>Aggressive Auseinandersetzungen aufgrund von Benachteiligungen und Diskriminierung</li>
<li>Einige der größten städtischen Problemsituationen betrifft zunehmende Kriminalität, die durch Drogen verursacht wird. </li>
</ul>
Derzeitige Methoden der Drogenbekämpfung – Verfolgung führender Vertreter der Drogenindustrie und staatliche Hilfen für Drogensüchtige – sind wenig erfolgreich. Um das Drogenmilieu auszutrocknen, werden Umgestaltungen städtischer Strukturen notwendig sein:<br />
<ul style="text-align: left;">
<li>damit weniger Verzweifelte zur Droge greifen </li>
<li>damit der Drogenhandel als Geschäftsgrundlage für arbeitslose, oft wenig gebildete Jugendliche unattraktiv wird</li>
<li>damit es gelingt, den internationalen Drogenhandel zu unterbinden </li>
</ul>
Die Zeit ist gekommen, den Anfang einer neuen Weltordnung zu riskieren. <br />
<br />
<h3 style="text-align: left;">
Es gilt ........</h3>
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Im 21. Jahrhundert sind mutige Entscheidungen zu treffen, die die wahren gesellschaftlichen Verhältnisse reflektieren. Es gilt, Verantwortung zu übernehmen. <br />
Es gilt, sich nicht für das Nächstliegende sondern für das Notwendige zu entscheiden. <br />
<br />
Der Uno-Generalsekretär António Guterres hat in einer Grundsatzrede eine „neue Weltordnung“ gefordert, in der Macht, Reichtum und Chancen gerechter verteilt werden“ (Anlage 1). Er kritisiert „die globale Vorherrschaft der Supermächte, deren Führungen bei den größten Herausforderungen und Konflikten der Gegenwart oftmals nicht zu gemeinsamen Lösungen kommen.“ Guterres erachtet „allgemeine Krankenversicherung und die Möglichkeit eines bedingungslosen Grundeinkommens“ für realistische Schritte zur Erneuerung der Weltordnung.<br />
<br />
Es gilt aber auch, sich keinen Illusionen hinzugeben. Solange keine konkreten internationalen Vorstellungen und Vereinbarungen für eine neue Weltordnung existieren, werden pragmatische Lösungen für existierende Wirtschaftsprobleme Gesellschaften weiterhin prägen. <br />
<br />
Die politisch Mächtigen der Europäischen Union haben sich auf Corona-Wiederaufbaufonds geeinigt – zum Teil als Kredite zum Teil als nicht rückzahlbares Kapital. Damit sollen die wirtschaftlichen Folgen der Coronakrise vermittels zusätzlicher Investitionen bewältigt werden können. Übrigens sind die ökonomisch „heimlichen Mächte“ von der Coronakrise kaum betroffen.<br />
<br />
Vermutlich werden die Staaten der Europäischen Union vermittels der vereinbarten Hilfsfonds vorwiegend Projekte mit konventionellen Zielsetzungen finanzieren: <br />
<ul>
<li>Personalaufstockungen in Krankenhäusern und Pflegeheimen</li>
<li>Umstellungen in der Autoindustrie</li>
<li>Produktivitätsverbesserungen wie etwa intelligente Roboter und automatisierte Produktionsverfahren, </li>
</ul>
Europäische Investitionen fließen auch (in Zusammenarbeit mit China?) in die Entwicklung immer größerer Containerschiffe und automatisierter Containerhäfen. Sie könnten sich als Fehlinvestitionen erweisen, wenn der globale Handel langfristig stagniert. <br />
<br />
Annahmen, dass es ausreicht auf Technologie zu setzen, um die großen Probleme des 21. Jahrhunderts zu lösen, sind eher irreführend.<br />
<br />
In der Öffentlichkeit Deutschland diskutierte Möglichkeiten, die günstigen Einfluss auf die Erhaltung der Umwelt haben, reflektieren die kurzfristig veränderten Verhaltensweisen während der Coronaviruskrise:<br />
<ul style="text-align: left;">
<li>Verwaltungs- oder Programmierarbeiten zu Hause verrichten</li>
<li>Geschäftsreisen mit Flugzeug einschränken</li>
<li>Videokonferenzen organisieren und abhalten </li>
<li>PKWs in der Garage lassen </li>
<li>Luxusreisen einschränken </li>
<li>Schulbetrieb vermittels Fernunterricht organisieren</li>
<li>Konsum einschränken</li>
<li>Gerichte selber kochen</li>
<li>Nachbarschaftshilfe für Betreuung von Kindern und Älteren leisten </li>
</ul>
Welche Verhaltensweisen längerfristig Bestand haben werden, wird sich zeigen. <br />
<br />
Wenn wir ehrlich sind, haben industrialisierte Länder versäumt, wesentliche vorausschauende Investitionen zu leisten: <br />
<ul>
<li>um Verkehrsinfrastrukturen effektiv zu gestalten</li>
<li>um Schulen hinreichend auszurüsten</li>
<li>um Migration von Arbeitskräften zu organisieren </li>
<li>um Armut in Entwicklungsländern vor Ort zu verringern </li>
</ul>
Gesellschaftlicher Entwicklungen sind fast so vielfältig wie natürliche Entwicklungen. <br />
<br />
Während bei natürlichen langfristigen Entwicklungen von Organismen (Viren, Bakterien, Pflanzen, Tiere) evolutionäre Selektionen unbeschränktes Wachstum von Populationen verhindern, scheint sich Homo sapiens unbeschränkt zu vermehren (seit Erfolgen der Industrialisierung?): <br />
<br />
<div style="text-align: center;">
Erdbevölkerung</div>
<table style="border-collapse: collapse; border: 1px solid black; margin-left: auto; margin-right: auto; text-align: center;">
<tbody style="border: 1px solid black;">
<tr style="border: 1px solid black;">
<th style="border: 1px solid black;"> Jahr </th>
<th style="border: 1px solid black;"> Bevölkerungszahl </th>
<th style="border: 1px solid black;"> Jahr zur nächsten Mrd. </th>
</tr>
<tr style="border: 1px solid black;">
<td style="border: 1px solid black;">1804</td>
<td style="border: 1px solid black;">1 Mrd.</td>
<td style="border: 1px solid black;">123 Jahre</td>
</tr>
<tr style="border: 1px solid black;">
<td style="border: 1px solid black;">1927</td>
<td style="border: 1px solid black;">2 Mrd.</td>
<td style="border: 1px solid black;">33 Jahre</td>
</tr>
<tr style="border: 1px solid black;">
<td style="border: 1px solid black;">1960</td>
<td style="border: 1px solid black;">3 Mrd.</td>
<td style="border: 1px solid black;">14 Jahre</td>
</tr>
<tr style="border: 1px solid black;">
<td style="border: 1px solid black;">1974</td>
<td style="border: 1px solid black;">4 Mrd.</td>
<td style="border: 1px solid black;">13 Jahre</td>
</tr>
<tr style="border: 1px solid black;">
<td style="border: 1px solid black;">1987</td>
<td style="border: 1px solid black;">5 Mrd.</td>
<td style="border: 1px solid black;">12 Jahre</td>
</tr>
<tr style="border: 1px solid black;">
<td style="border: 1px solid black;">1999</td>
<td style="border: 1px solid black;">6 Mrd.</td>
<td style="border: 1px solid black;">12 Jahre</td>
</tr>
<tr style="border: 1px solid black;">
<td style="border: 1px solid black;">2011</td>
<td style="border: 1px solid black;">6 Mrd.</td>
<td style="border: 1px solid black;">12 Jahre</td>
</tr>
<tr style="border: 1px solid black;">
<td style="border: 1px solid black;">2023</td>
<td style="border: 1px solid black;">8 Mrd.</td>
<td style="border: 1px solid black;"></td>
</tr>
</tbody></table>
<br />
Homo sapiens hat schließlich keine Fressfeinde.<br />
Quelle: <a href="https://www.zdf.de/nachrichten/panorama/grafiken-weltbevoelkerungstag-zahlen-100.html">https://www.zdf.de/nachrichten/panorama/grafiken-weltbevoelkerungstag-zahlen-100.html</a><br />
<br />
Bisher haben sich Menschen an alle Umgebungen dieser Erde anpassen können. Langsam werden sich Menschen bewusst, dass sie auch selbst für Änderungen ihrer natürlichen Umgebungen verantwortlich sind, und am Ende ihr Überleben davon abhängt, ob es ihnen gelingt, ihre Vermehrung zu kontrollieren und ihre Umwelt zu erhalten. <br />
<br />
Es ist offensichtlich geworden, dass Städte in Gefahr sind, unbewohnbar zu werden, und nur Kommunen in der Lage sind, Städte zu gestalten. <br />
<br />
Heute leben 56 Prozent der Bevölkerung in Städten. Bis 2050 könnte der Anteil der Stadtbewohner weltweit auf über 68 Prozent steigen, 90 Prozent des Zuwachses wird in afrikanischen und asiatischen Ländern erwartet. Bis zum Jahr 2030 wird mit mehr als 40 Megastädten mit mehr als zehn Millionen Einwohnern gerechnet. <br />
Quelle: <a href="https://www.zdf.de/nachrichten/panorama/grafiken-weltbevoelkerungstag-zahlen-100.html">https://www.zdf.de/nachrichten/panorama/grafiken-weltbevoelkerungstag-zahlen-100.html</a><br />
<br />
Bürgermeister vieler Städte werden gewählt, weil ihnen zugetraut wird, Probleme ihrer Bevölkerungen zu lösen. <br />
<br />
Paris hat eine unkonventionell handelnde Bürgermeisterin, die dabei ist, Paris umzugestalten, um es wieder bewohnbarer zu machen.<br />
Quelle: <a href="https://www.spiegel.de/politik/paris-buergermeisterin-anne-hidalgo-und-ihr-plan-paris-wird-gruen-a-00000000-0002-0001-0000-000171875134">https://www.spiegel.de/politik/paris-buergermeisterin-anne-hidalgo-und-ihr-plan-paris-wird-gruen-a-00000000-0002-0001-0000-000171875134</a><br />
<br />
Freiburg im Breisgau gilt als Stadt, die ihre städtische Infrastruktur pflegt, und auf traditionelle Landwirtschaft viel Wert legt. Freiburgs Oberbürgermeister ist parteilos.<br />
<br />
Zukünftige Entwicklungen der Infrastrukturen großer Städte werden wesentlich über zukünftige menschliche Lebensqualität entscheiden. Dazu gehört, Innenstädte wieder zu beleben, indem traditionell wichtige Tätigkeiten gefördert werden – Fleischer, Bäcker, <br />
Köche, Reparaturbetriebe, Pflegedienste, Kundenservices etc. Traditionelle professionelle Berufe helfen, die Beendigung gesellschaftlich 'wertloser' Tätigkeiten (z.B. technische Hilfsdienste in automatisierten Lagern, industriell organisierte Schlachtungen) zu kompensieren..<br />
<br />
Es ist sicher, dass sich im 21. Jahrhundert niemand der Frage entziehen kann: Erlebt Homo sapiens gerade das Ende einer Kultur, die ihn in eine lebensbedrohliche Situation gebracht hat, und erlebt er gerade den Anfang einer Kultur, die er zum Leben benötigt?<br />
<br />
Solange das Bemühen (Kampf?) um eine neue Weltordnung und Kultur anhält, solange ist „Polen nicht verloren“ („Noch ist Polen nicht verloren“ ist der Anfang der polnischen Nationalhymne). <br />
<br />
Wer bereit ist, sich für eine nachhaltige, sich dynamisch ändernde Welt einzusetzen – Rentner in Gesprächen mit ihren Enkeln – wird am Ende gewinnen. <br />
<br />
<h3 style="text-align: left;">
Anlage 1 – Erneuerung der Weltordnung</h3>
<div>
<br /></div>
Eine neue Weltordnung, in der Macht, Reichtum und Chancen gerechter verteilt werden – nicht weniger fordert Uno-Generalsekretär António Guterres in einer Grundsatzrede.<br />
UN-Generalsekretär António Guterres hat sich im Kampf gegen globale Ungleichheit für eine Erneuerung der internationalen Ordnung ausgesprochen. Es brauche ein "neues Globales Abkommen", um Macht, Reichtum und Chancen gerechter zu verteilen, sagte Guterres bei einer Feier zum Nelson-Mandela-Tag.<br />
<br />
<h3 style="text-align: left;">
Staaten blockieren sich im Uno-Sicherheitsrat</h3>
<br />
Mit seiner Rede kritisierte Guterres damit die globale Vorherrschaft der Supermächte, deren Führungen bei den größten Herausforderungen und Konflikten der Gegenwart oftmals nicht zu gemeinsamen Lösungen kommen.<br />
<br />
Als Beispiel nannte der UN-Chef das Stimmrecht des Sicherheitsrats der Vereinten Nationen: USA, Russland, China, Großbritannien und Frankreich sind Vetomächte des mächtigsten UN-Gremiums, das bei vielen Themen wie dem Syrien-Krieg blockiert ist, weil nichts gegen ihren Willen beschlossen werden kann.<br />
<br />
„Ungleichheit beginnt ganz oben – in globalen Institutionen. <br />
Die Bekämpfung der Ungleichheit beginnt mit der Reform.“<br />
<br />
<h3 style="text-align: left;">
Welt steht vor einem Abgrund</h3>
<div>
<br /></div>
Guterres sieht die Welt vor einem Abgrund, der durch die Corona-Pandemie noch deutlicher geworden sei. Wie Röntgenstrahlen habe sie die Brüche im fragilen Skelett der Gesellschaften offengelegt: "Die Lüge, dass entfesselte Märkte Gesundheitsversorgung für alle liefern könnten" und die "Täuschung, in einer Welt zu leben, die den Rassismus überwunden hätte".<br />
<br />
Statt eines gemeinsamen Vorgehens gegen die Krankheit sei die Kluft nur noch größer geworden:<br />
<br />
„Denn während wir alle auf demselben Meer schwimmen, <br />
ist klar, dass sich einige in Superjachten befinden, <br />
während andere sich an treibende Trümmer klammern.“<br />
<br />
<h3 style="text-align: left;">
Nationalismus und Rassismus verschlimmern die Ungleichheit</h3>
<div>
<br /></div>
Während der UN-Chef zwei der Hauptursachen für die Ungleichheit in der Welt in der Kolonisation und in von Männern dominierten Gesellschaften sieht, beförderten aktuelle Entwicklungen diese noch: Populismus, Nationalismus, Extremismus und Rassismus würden weitere Ungleichheiten in Ländern sowie zwischen Nationen, Ethnien und Religionen schaffen.<br />
<br />
Guterres dürfte dabei neben US-Präsident Donald Trump auch auf andere internationale Anführer abzielen, die auf nationale Alleingänge setzen und sich der internationalen Kooperation zumindest teilweise verweigern. Zu ihnen werden auch die Regierungen Russlands, Chinas und Brasiliens gezählt.<br />
<br />
<h3>
Entwicklungsländer müssen mehr gehört werden</h3>
<div>
<br /></div>
Zudem müssten vor allem die Entwicklungsländer mehr Gewicht bei der internationalen Entscheidungsfindung bekommen. Zudem brauche es deutlich mehr Frauen in Führungspositionen, um auch Gerechtigkeit zwischen den Geschlechtern zu schaffen.<br />
<br />
„Ein neues Modell für globale Regierungsführung muss auf <br />
einer vollständigen, integrativen und gleichberechtigten <br />
Beteiligung an globalen Institutionen beruhen.“<br />
<br />
Für die Zukunft sieht Guterres zwei grundlegende Veränderungen auf der Welt, die zu einer weiteren Vertiefung der Gräben führen könnten: den Klimawandel und die fortschreitende Digitalisierung.<br />
<br />
Quelle: <a href="https://www.zdf.de/nachrichten/politik/guterres-un-grundsatzrede-weltordnung-100.html">https://www.zdf.de/nachrichten/politik/guterres-un-grundsatzrede-weltordnung-100.html</a><br />
<br />
<h3 style="text-align: left;">
</h3>
<h3 style="text-align: left;">
"Ungleichheit beginnt ganz oben"</h3>
<div>
<br /></div>
Ein neues globales Machtverhältnis - nicht weniger fordert UN-Generalsekretär Guterres in einer Grundsatzrede. Die Großmächte kritisierte er für nationale Alleingänge - nicht nur in der Corona-Krise.<br />
<br />
UN-Generalsekretär António Guterres hat eine grundlegende Neuordnung der internationalen Machtverhältnisse durch Reformen gefordert, um globale Ungleichheit zu bekämpfen.<br />
<br />
"Die Nationen, die sich vor mehr als sieben Jahrzehnten durchsetzten, haben sich geweigert, über die Reformen nachzudenken, die zur Änderung der Machtverhältnisse in internationalen Institutionen erforderlich sind", sagte Guterres bei einer Feier zum Nelson-Mandela-Tag in einer Videoansprache. Den Geburtstag des verstorbenen südafrikanischen Präsidenten nutzte Guterres für eine Grundsatzrede, in der er sich für ein "Neues Globales Abkommen" aussprach, das helfen solle, Macht, Reichtum und Chancen gerechter auf der Welt zu verteilen.<br />
<br />
<h3 style="text-align: left;">
"Neues Globales Abkommen"</h3>
<div>
<br /></div>
Dieses neue Modell für globale Regierungsführung müsse auf einer "vollständigen, integrativen und gleichberechtigten Beteiligung an globalen Institutionen beruhen", forderte Guterres weiter. Dabei sei wichtig, dass vor allem die Entwicklungsländer mehr Gewicht bei der internationalen Entscheidungsfindung bekommen.<br />
<br />
Zudem brauche es deutlich mehr Frauen in Führungspositionen, um auch Gerechtigkeit zwischen den Geschlechtern zu schaffen. Kolonialismus und die gesellschaftliche Dominanz von Männern seien die zwei Hauptursachen für Ungleichheit. Populismus, Nationalismus, Extremismus und Rassismus trügen außerdem zu ihr bei.<br />
<br />
<h3 style="text-align: left;">
</h3>
<h3 style="text-align: left;">
Kritik an Großmächten</h3>
<div>
<br /></div>
Von den Großmächten erwartet Guterres deshalb mehr Einigkeit und kritisierte sie für ihre nationalen Alleingänge. Ihre Regierungen kämen bei den größten Herausforderungen und Konflikten der Gegenwart oftmals nicht zu gemeinsamen Lösungen.<br />
<br />
Als Beispiel nannte der UN-Chef das Stimmrecht des Sicherheitsrats der Vereinten Nationen: Die USA, Russland, China, Großbritannien und Frankreich sind Vetomächte des mächtigsten UN-Gremiums, das bei vielen Themen wie dem Syrien-Krieg blockiert ist, weil nichts gegen den Willen dieser fünf beschlossen werden kann. "Ungleichheit beginnt ganz oben: in globalen Institutionen. Die Bekämpfung der Ungleichheit beginnt mit der Reform", so der ehemalige sozialistische Premierminister Portugals.
<br />
<br />
<h3 style="text-align: left;">
Corona als Weckruf</h3>
<div>
<br /></div>
Auch an der Coronavirus-Pandemie kam Guterres in seiner Rede nicht vorbei. Er verglich die Krise mit "Röntgenstrahlen" - sie habe die Brüche im fragilen Skelett der Gesellschaften offengelegt: "Die Lüge, dass entfesselte Märkte Gesundheitsversorgung für alle liefern könnten" und die "Täuschung, in einer Welt zu leben, die den Rassismus überwunden hätte".<br />
<br />
Statt eines gemeinsamen Vorgehens gegen die Krankheit täten sich immer größere Gräben auf. "Denn während wir alle auf demselben Meer schwimmen, ist klar, dass sich einige in Superjachten befinden, während andere sich an treibende Trümmer klammern."<br />
<br />
Guterres sagte, die Pandemie habe die "tragische Kluft" zwischen Partikularinteressen und öffentlichem Nutzen deutlich gemacht. Eine sich verändernde Welt brauche neue soziale Sicherungssysteme. Als Beispiele nannte Guterres eine allgemeine Krankenversicherung und die Möglichkeit eines bedingungslosen Grundeinkommens.<br />
<br />
<h3 style="text-align: left;">
</h3>
<h3 style="text-align: left;">
Zukünftig gemeinsam und zum Wohl aller?</h3>
<div>
<br /></div>
Auch die weltweite Anti-Rassismus-Bewegung nach dem Tod von George Floyd in den USA sei ein Zeichen dafür, "dass die Menschen genug haben", so Guterres. Sie hätten genug von Ungleichbehandlung wegen ihrer Hautfarbe und Ungerechtigkeit, die Menschen ihrer fundamentalen Rechte beraube.<br />
<br />
Guterres schloss mit den Worten: "Jetzt ist es an der Zeit, dass die führenden Länder sich entscheiden: Werden wir dem Chaos, der Spaltung und der Ungleichheit nachgeben? Oder werden wir die Fehler der Vergangenheit korrigieren und gemeinsam voranschreiten - zum Wohl aller?"<br />
<br />
Quelle: <a href="https://www.tagesschau.de/ausland/guterres-un-grundsatzrede-101.html">https://www.tagesschau.de/ausland/guterres-un-grundsatzrede-101.html</a><br />
<br />
<h3>
Anlage 2: “China-USA: Spielball WHO“ </h3>
<div>
<br /></div>
Eine Arte Dokumentation zeigt, wie Großmächte derzeit kontrovers und kontraproduktiv diskutieren. Sie nutzen für Kontroversen internationale Institutionen wie UNO (United Nations in New York) oder WHO (Weltgesundheitssorganisation in Genf). <br />
<br />
Ist die Weltgesundheitsorganisation noch zu retten? Diese Frage ist in diplomatischen Kreisen immer öfter zu hören. Die Diskussion verläuft entlang der Grenzen des neuen Kalten Krieges zwischen den USA und China. Den Zündstoff für die Kontroverse lieferte die Covid-19-Krise. Offenbar schenkt die Weltgesundheitsorganisation zu Beginn der Epidemie Chinas verharmlosender Krisenberichterstattung Glauben. Vom Rest der Welt wird sie daher beschuldigt, die internationale Reaktion verzögert zu haben. Wie konnte das passieren? Und wie lässt sich das weltweite Versagen in der Bekämpfung der Covid-19-Pandemie erklären? <br />
Um diesen Fragen nachzugehen, beleuchtet die Dokumentation die Geschichte der WHO von ihrer Gründung nach dem Zweiten Weltkrieg über Erfolge etwa durch die Verbreitung von Antibiotika oder die Ausrottung der Pocken bis hin zu den vergangenen 20 Jahren, in denen die zunehmende Einflussnahme Chinas die Organisation aus dem Gleichgewicht brachte. Aber lassen sich die Misserfolge allein dadurch erklären? Die Dokumentation zeigt auf, dass in den letzten Jahren zahlreiche Stimmen vor den Problemen bei der WHO gewarnt haben und davor, dass die Gesundheitsorganisation nicht mehr in der Lage sei, die Welt zu schützen. Wird die Krise eine Umsetzung längst fälliger Reformen in die Wege leiten? Und wie sieht die Zukunft der WHO nach der Corona-Krise aus?<br />
<br />
Hier ist der Link zum Film: <br />
<a href="https://www.arte.tv/de/videos/097687-000-A/china-usa-spielball-who/">https://www.arte.tv/de/videos/097687-000-A/china-usa-spielball-who/</a><br />
<br /></div>
Bertal Dresenhttp://www.blogger.com/profile/01435152037884170636noreply@blogger.com4tag:blogger.com,1999:blog-8476761749021763994.post-51989427445945162682020-06-22T18:22:00.000+02:002020-06-22T18:22:45.027+02:00Peter Hiemann zum Thema SelbstorganisationSchon längere Zeit vermuten Naturwissenschaftler, dass in der Natur – vor allem bei neuralen Gehirnprozessen – dem Prinzip 'Selbstorganisation' eine entscheidende Rolle zukommt.<br />
<br />
Der Begriff der Selbstorganisation wurde in den 1950er-Jahren von Wesley A. Clark und Belmont G. Farley geprägt. Heinz von Foerster würdigt in dem Buch “Wahrheit ist die Erfindung eines Lügners“ (1998) Clark und Farley mit den Worten:<br />
<br />
„Sie erkannten, daß sich Operatoren, die in einer geschlossenen Beziehung stehen, irgendwie stabilisieren und beobachteten – noch ohne eine Theorie der rekursiven Funktionen oder des Eigenwertes zu kennen – das Phänomen, daß bestimmte geschlossene Systeme nach einer gewissen Zeit stabile Formen des Verhaltens entwickeln“<br />
<br />
Auch in sozialen Systemen lässt sich beobachten, wie Ordnung – unabhängig von den Handlungen eines Organisators – aus dem System selbst heraus entsteht. Die Selbstorganisation ist ein nicht nur in der Systemtheorie populärer Begriff. Ihm kommt sowohl in sozialen als auch in natürlichen, physikalischen, biologischen, chemischen oder ökonomischen Systemen Bedeutung zu. Diesem Ansatz zufolge können die Menschen nur dann ihr Leben selbst in die Hand nehmen, wenn sie nicht hierarchischen Organisationen unterworfen sind.<br />
<br />
Der Physiker und naturwissenschaftlich orientierte Philosoph Heinz von Foerster (1911–2002) publizierte zusammen mit dem Medienwissenschaftler Bernhard Pörksen das<br />
Buch “Wahrheit ist die Erfindung eines Lügners. Gespräche für Skeptiker“. Es erschien 1998 und wurde 2019 mit dem Hinweis 'Systemische Horizonte' neu aufgelegt.<br />
<br />
In dem Buch geht es um grundlegende Fragen zum Thema Selbstorganisation. Wie wirklich ist die Wirklichkeit? Sind unsere Weltbilder lediglich Erfindungen, oder entspricht ihnen eine äußere Realität? Ist Wahrheitserkenntnis möglich? Es sind diese Fragen, die der Physiker und Philosoph Heinz von Foerster und der Journalist Bernhard Pörksen in ihren Gesprächen debattieren. Gemeinsam erkunden sie die Grenzen unseres Erkenntnisvermögens, diskutieren die scheinbare Objektivität unserer Sinneswahrnehmung, die Folgen des Wahrheitsterrorismus und den Zusammenhang von Erkenntnis und Ethik, Sicht und Einsicht. Dabei offenbart sich ein Denken, das die Fixierung scheut und die eine, ewig gültige Antwort ablehnt. Und immer wieder geht es in diesen mit leichter Hand formulierten Dialogen um die innere Verbindung zwischen einem faszinierenden wissenschaftlichen Werk und einem ungewöhnlichen und aufregenden Leben.<br />
<br />
Ein deutsches Nachrichtenmagazin hielt es 1998 für wichtig, das Buch nicht nur zu besprechen, sondern einen Teil des Dialogs zwischen dem Philosophen von Foerster und dem Medienwissenschaftler Pörksen zu veröffentlichen, um das Thema in der Öffentlichkeit besser diskutieren zu können.<br />
<br />
Hier ist der Dialog, den das Nachrichtenmagazin wiedergab:<br />
<br />
<b>BERNHARD PÖRKSEN:</b> Sie haben kürzlich den Satz formuliert, Wahrheit sei "die Erfindung eines Lügners". Was ist damit gemeint?<br />
<b>HEINZ VON FOERSTER:</b> Damit ist gemeint, daß sich Wahrheit und Lüge gegenseitig bedingen: Wer von Wahrheit spricht, macht den anderen direkt oder indirekt zu einem Lügner. Diese beiden Begriffe gehören zu einer Kategorie des Denkens, aus der ich gerne heraustreten würde, um eine ganz neue Sicht und Einsicht zu ermöglichen. Meine Auffassung ist, daß die Rede von der Wahrheit katastrophale Folgen hat und die Einheit der Menschheit zerstört. Der Begriff bedeutet - man denke nur an die Kreuzzüge, die endlosen Glaubenskämpfe und die grauenhaften Spielformen der Inquisition - Krieg. Man muß daran erinnern, wie viele Millionen von Menschen verstümmelt, gefoltert und verbrannt worden sind, um die Wahrheitsidee gewalttätig durchzusetzen.<br />
<br />
<b>PÖRKSEN:</b> Sie sehen eine Korrelation zwischen der Anzahl der Gefallenen und einem statischen Wahrheitsverständnis?<br />
<b>VON FOERSTER:</b> Ja - und auf einmal stehen die großen Armeen der Gläubigen einander gegenüber, sie knien nieder und beten beide zu ihrem Gott, daß die Wahrheit, daß ihre Wahrheit siegen möge. - Wer hat recht? Sind der Wein und das Brot, die zum christlichen Abendmahl gereicht werden, wirklich Blut und Körper Christi, oder handelt es sich bei Wein und Brot um Symbole, die das Blut und den Körper darstellen? Um diese Frage zu entscheiden, wird geschlachtet und geschlachtet. Und die Armee, die übrigbleibt, verkündet stolz, im Privatbesitz der Wahrheit zu sein. Sie kann jetzt beginnen, die Überlebenden der Gegenseite zu bekehren.<br />
<br />
<b>PÖRKSEN:</b> Diese Ablehnung des Wahrheitsbegriffs hat, wenn ich richtig verstehe, einen ethischen Grund. Aber muß man - aus einer erkenntnistheoretischen Perspektive - nicht zugeben, daß an den Orten des wissenschaftlich-technischen Fortschritts Wahrheit produziert wird? Wir telephonieren, wir fahren Auto, es erheben sich tonnenschwere Flugzeuge in die Luft. Das kann doch nur heißen, daß es einen systematischen Zusammenhang zwischen unseren Vorstellungen und dem Wesen der Welt gibt.<br />
<b>VON FOERSTER:</b> Es ist ein Wunsch des Menschen, seine Fertigkeiten und Möglichkeiten - das Autofahren, das Fliegen, die herrlichen Computer - zu erklären. Aber diese Erklärungsprinzipien sind kulturell bedingt und jeweils ganz verschieden man kann zwischen ihnen auswählen und hin und her hüpfen.<br />
Ein Realist würde auf das Maxwellsche Prinzip verweisen, um das Funktionieren von Elektromotoren zu erläutern. Und ein Magier würde sagen, daß es die Menschen verstanden haben, mit Unerklärlichem umzugehen. Aber wenn Sie mich fragen: Mir erscheint die Idee vollständiger Erklärbarkeit als eine Hoffnung, die das Staunen befriedigt und beseitigt: Man kann nun in einer Welt leben, in der es das Wunder und das Unwißbare nicht mehr gibt; das ist das Ergebnis unserer Erklärungsversuche.<br />
<br />
<b>PÖRKSEN:</b> Was Sie sagen, ist, so denke ich, keine Antwort. Sie machen die Implikationen meiner Frage zum Thema, aber Sie antworten mir nicht.<br />
<b>VON FOERSTER:</b> Welche Antwort - so muß ich jetzt zurückfragen - möchten Sie denn gerne hören? Welche Antwort würden Sie akzeptieren, welche meiner Ausführungen würde Sie entzücken? Das womöglich beruhigende Bekenntnis, daß das Funktionieren einer Hypothese ein Wahrheitsbeweis ist, werde ich nicht ablegen. Meine Formel lautet: Das Funktionieren ist ein Beleg für das Funktionieren. Wieso soll ich dieses Funktionieren jetzt mit diesen lächerlichen acht Buchstaben W A H R H E I T gleichsetzen? Wozu? Um recht zu behalten? Um dem anderen über den Kopf zu hauen?<br />
<br />
<b>PÖRKSEN:</b> Sie glauben nicht an die endgültige Verifizierung einer Hypothese?<br />
<b>VON FOERSTER:</b> Nein, überhaupt nicht. Was möglich ist, da folge ich dem Philosophen Karl Popper, dem ich sonst längst nicht in allem zustimme, ist allein die Falsifizierung von Hypothesen: Diese können sich als falsch, aber nicht in einem absoluten Sinn als richtig erweisen. Aber in dem Moment, in dem man von Wahrheit spricht, entsteht ein Politikum, und es kommt der Versuch ins Spiel, andere Auffassungen zu dominieren und andere Menschen zu beherrschen. Wenn der Begriff der Wahrheit überhaupt nicht mehr vorkäme, könnten wir vermutlich alle friedlich miteinander leben.<br />
<br />
<b>PÖRKSEN:</b> Was bleibt, ist ein ganz und gar unspektakuläres Erkenntnismotiv. Es geht allein um das Funktionieren - und nicht um die absolute Wahrheit.<br />
<b>VON FOERSTER:</b> Aber dieses Funktionieren läßt sich doch als eine Serie von Wundern begreifen, die man feiern, über die man sich freuen kann. Es geht darum, nicht zu stolpern in dieser Welt. Und wenn uns dies gelingt, wäre das doch schon Anlaß genug, um gemeinsam eine Flasche Champagner zu entkorken.<br />
Ich will noch einmal betonen, daß ich im Grunde genommen aus der gesamten Diskussion über Wahrheit und Lüge, Subjektivität und Objektivität aussteigen will. Diese Kategorien stören die Beziehungen von Mensch zu Mensch, sie erzeugen ein Klima, in dem andere überredet, bekehrt und gezwungen werden. Es entsteht Feindschaft. Man sollte diese Begriffe einfach nicht mehr verwenden, da sie, so behaupte ich, durch die bloße Erwähnung und auch durch die Verneinung oder Ablehnung am Leben erhalten werden.<br />
<br />
<b>PÖRKSEN:</b> Inwiefern?<br />
<b>VON FOERSTER:</b> Dazu fällt mir ein Satz von Ludwig Wittgenstein ein: Wenn man über eine Proposition "p" und ihre Verneinung "non p" spricht, heißt es bei Wittgenstein, so spricht man von demselben. Darf ich hier eine kleine Analogie anführen? Revolutionäre, die einen König stürzen wollen, machen häufig den bedauerlichen Fehler, daß sie laut und deutlich schreien: Nieder mit dem König! Das ist natürlich kostenlose Propaganda für den König, der sich bei seinen Gegnern eigentlich bedanken sollte: "Danke, daß ihr mich so oft erwähnt habt und daß ihr nicht aufhört, meinen Namen zu rufen!" Wenn ich eine Person, eine Idee oder ein Ideal laut und deutlich negiere, ist die endgültige Trennung noch nicht geglückt. Das verneinte Phänomen kommt wieder vor und wird ex negativo erneut ins Zentrum der Aufmerksamkeit gerückt.<br />
<br />
<b>PÖRKSEN:</b> Nun könnte man sagen: Sie sind ein Revolutionär, der die Idee der Wahrheit grundsätzlich erledigen will, indem er sie aus dem Diskurs zu verbannen hofft.<br />
<b>VON FOERSTER:</b> Gar nicht schlecht. Vielleicht paßt dazu eine Formel, die unter österreichischen Journalisten kursiert; es heißt, daß man eine Idee oder eine Person am besten demontieren kann, indem man sie überhaupt nicht mehr erwähnt. Die Formel lautet: "Nicht genannt soll er werden!" Wenn man einen Politiker zerstören will, dann schreibt man am besten nicht über seine außerehelichen Kontakte zu anderen Frauen; das wäre falsch, weil schon die bloße Erwähnung seine Existenz wieder zu Bewußtsein bringt und vielleicht einige Leute sagen: Was für ein fescher Mann! Viel wirksamer ist es, von ganz anderem zu sprechen, sich über das Wetter und die Wetterfrösche zu unterhalten. Der Politiker ist dann plötzlich weg. In diesem Sinn meine ich, daß man die Idee der Wahrheit zum Verschwinden bringen und sie durch Nichterwähnung erledigen sollte: "Nicht genannt soll sie werden!"<br />
<br />
<b>PÖRKSEN:</b> Wäre es nicht auch möglich, den Begriff der Wahrheit etwas undramatischer als eine regulative Idee zu denken? Wahrheit ließe sich als eine orientierende Norm begreifen, die nicht in den Privatbesitz eines einzelnen, einer Gruppe oder Nation übergehen kann. Sie erschiene dann als ein Motiv des Aufbruchs, als der Stimulus einer Erkenntnisanstrengung, von der man weiß, daß sie nie zu einem Ende, zu einem Absoluten gelangt.<br />
<b>VON FOERSTER:</b> Mir erscheint Ihr Versuch, den Begriff der Wahrheit zu retten, untauglich. Auch die Rede von Wahrheit in einem regulativen Sinn setzt eine Vorstellung von dem voraus, was die Wahrheit ist, was erreicht und angestrebt werden soll. Die zerstörerischen Konsequenzen, die diese Idee hat, werden demzufolge gar nicht berührt. Man geht in jedem Fall von einer ewigen Wahrheit aus, die da irgendwo am Horizont herumschwebt. Schon der Begriff der orientierenden Norm, von dem Sie sprechen, enthält den heimlichen Zwang zur Anpassung: Andere müssen sich dieser Norm unterwerfen.<br />
<br />
<b>PÖRKSEN:</b> Und doch läßt sich nicht leugnen, daß ein emphatischer und meinetwegen auch naiver Wahrheitsbegriff Menschen im Laufe der Kultur- und Wissenschaftsgeschichte auf eine sehr produktive Weise angeregt hat. Das Wahrheitsmotiv hat so verstanden seinen guten Sinn - und ist nicht allein Instrument von Fanatikern, die andere terrorisieren wollen.<br />
<b>VON FOERSTER:</b> Sie sprechen jetzt von den persönlichen Glaubenssätzen eines Erkennenden, der eine bestimmte Idee auf eine wunderbare Weise benützt. Wenn dieser Mensch aber sagt, daß er die Wahrheit gefunden hat, wird er zu einem gefährlichen Tier. Auch die Behauptung einer allmählichen oder asymptotischen Wahrheitsannäherung ist mir unheimlich, weil hier immer schon das Wissen darüber vorausgesetzt wird, wo sich dieses vermeintliche Fernziel befindet.<br />
Wäre es nicht möglich, so denke ich manchmal, den Verweis auf die Wahrheit durch die Idee des Vertrauens zu ersetzen: Schon das englische Wort für Wahrheit, truth, geht, wenn man die Wortgeschichte analysiert, auf den Begriff der Treue und des Vertrauens, trust, zurück. Wenn ich die Wahrheit als ein Vertrauen von Mensch zu Mensch begreife, dann brauche ich keine externen Referenzen mehr. Dann kann ich das, was er sagt, einfach hinnehmen, weil wir uns gegenseitig treu sind. Es ist nicht mehr die Frage, wer recht hat, wer lügt, sondern ob man dem anderen vertraut, ob man sich auf ihn verlassen kann. Wenn er mir sagt, daß die Klapperschlangen den Radetzkymarsch spielen, dann frage ich gar nicht, ob sie das wirklich tun. Ich vertraue ihm einfach, ich glaube ihm. Auf diese Weise entsteht eine vollkommen andere Relation.<br />
<br />
<b>PÖRKSEN:</b> Übersieht diese Kritik der Wahrheitsidee nicht ein grundsätzliches Bedürfnis? Menschen kommen doch gar nicht ohne die Sehnsucht nach etwas Endgültigem und Fraglosem aus. Sie brauchen die Sicherheit des Absoluten.<br />
<b>VON FOERSTER:</b> Für mich ist diese Sicherheit des Absoluten, die einem Halt geben soll, etwas Gefährliches, das einem Menschen die Verantwortung für seine Sicht der Dinge nimmt. Mein Ziel ist es, eher die Eigenverantwortung und die Individualität des einzelnen zu betonen. Ich möchte, daß er lernt, auf eigenen Füßen zu stehen und seinen persönlichen Anschauungen zu vertrauen. Mein Wunsch wäre es, dem anderen zu helfen, seine ganz eigenen Vorstellungen, seine eigenen Gedanken, seine eigene Sprache zu entwickeln, ihm zu helfen, seine Beobachtungsgabe zu schärfen, seine eigenen Augen und Ohren zu benutzen. Natürlich gibt es Menschen, die davon nichts wissen wollen und meinen, nicht ohne ein Dogma auszukommen, das ihnen vorgibt, wie sie zu sehen, zu hören und zu sprechen haben. Das sind Monotänzer, mit denen man keinen gemeinsamen Tanz, keinen gemeinsamen Dialog beginnen kann. Sie nehmen die Einladung nicht an, über diese Dinge zu sprechen, denn sie wissen ja bereits alles, sie kennen die Ergebnisse. Aber das ist nicht mein Problem, wenn ein anderer sich in die Blindheit gegenüber der Vielzahl der Möglichkeiten flüchtet, damit muß dieser Mensch selbst fertig werden. Ich würde niemals versuchen, ihn zu überzeugen.<br />
<br />
<b>PÖRKSEN:</b> Manche Menschen empfinden Ihre These zweifellos als eine Provokation. Vor einigen Jahren ist einmal in einer christlichen Wochenzeitung ein Interview mit Ihnen erschienen, das eine ganze Reihe erboster Leserbriefe provoziert hat: Viele der Briefeschreiber fühlten sich ganz offensichtlich durch diesen Abschied von einem Wahrheitsideal, das auch im Zentrum religiöser Vorstellungen steht, verletzt. Einer der Schreiber nannte Sie den "großen Verwirrer". Das ist ein Bibelzitat: Die Rolle des großen Verwirrers spielt der Teufel.<br />
<b>VON FOERSTER:</b> Nun, das klingt ja wenig schmeichelhaft. Allerdings möchte ich darauf hinweisen, daß ich eine etwas andere Vorstellung vom Teufel habe. Der Teufel ist für mich nicht der große Verwirrer, sondern der große Vereinheitlicher: Er versucht, die verschiedenen Ansichten zu homogenisieren, bis alle dasselbe denken, glauben und tun. Das ist das eigentlich Gefährliche. Der Verwirrer erweitert dagegen das Blickfeld, er eröffnet neue Möglichkeiten und macht die Fülle sichtbar. Ich kann den Verfasser dieses Briefes beruhigen: Es ist ein guter Geist, der verwirrt.<br />
Ich meine, daß sich in der Verwirrung, die neue Möglichkeiten sichtbar werden läßt, ein ethisches Grundprinzip manifestiert. Es entsteht Freiheit. Ich habe einmal gesagt: Handle stets so, daß die Anzahl der Möglichkeiten wächst. Das ist mein ethischer Imperativ, wobei allerdings wieder der falsche Eindruck entstehen könnte, auch ich wolle andere herumkommandieren. Das war also etwas schlampig formuliert. Besser wäre es gewesen, wenn ich geschrieben hätte: "Heinz, handle stets so, daß die Anzahl der Möglichkeiten wächst."<br />
<br />
<b>PÖRKSEN:</b> Können Sie diesen ethischen Imperativ erläutern?<br />
<b>VON FOERSTER:</b> Gemeint ist, daß man die Aktivitäten eines anderen nicht einschränken soll, sondern daß es gut wäre, sich auf eine Weise zu verhalten, die die Freiheit des anderen und der Gemeinschaft vergrößert. Denn je größer die Freiheit ist, desto größer sind die Wahlmöglichkeiten und desto eher ist auch die Chance gegeben, für die eigenen Handlungen Verantwortung zu übernehmen. Freiheit und Verantwortung gehören zusammen. Nur wer frei ist - und immer auch anders agieren könnte -, kann verantwortlich handeln. Das heißt: Wer jemand die Freiheit raubt und beschneidet, der nimmt ihm auch die Chance zum verantwortlichen Handeln. Und das ist unverantwortlich.<br />
<br />
<b>PÖRKSEN:</b> Aber wessen Möglichkeiten sollen vergrößert werden? Man kann doch nicht, um ein Beispiel zu wählen, die Chancen eines Propagandisten, bösartige Hetzschriften zu verbreiten, unterstützen. Das kann doch kein Ziel sein.<br />
<b>VON FOERSTER:</b> Warum nicht? Soll ich seine Schriften verbieten, die Bücher aus den Bibliotheken herausholen, weil sie nicht meiner Auffassung entsprechen?<br />
Die Alternative ist mörderisch. Wenn man die Wahlmöglichkeiten erweitert, dann kann man sich entscheiden, ein Kindermörder oder ein Schulbusfahrer zu werden. Die Entscheidung für den einen oder den anderen Weg verknüpft einen mit der Verantwortung. Natürlich ist es bequem, sich zu entlasten, indem man etwas verbietet oder den Umständen, den Genen oder der Erziehung, nature or nurture, unserer Natur oder den bösen Eltern, die Schuld zu geben. Und es ist bequem, sich in einer Hierarchie zu verstecken und immer, wenn es eines Tages und am Ende des Krieges zum Prozeß kommt, zu sagen: Aber ich habe doch nur Befehle und Kommandos ausgeführt! Ich kann doch nichts dafür! Es gab doch gar keine andere Möglichkeit! Das sind, so würde ich sagen, alles Ausreden.<br />
<br />
<b>PÖRKSEN:</b> Glauben Sie nicht, daß man gelegentlich auch intolerant sein und die Verbreitung bestimmter Propagandamaterialien - ich denke hier etwa an neonationalsozialistische Schriften, die zur Gewalt aufrufen - verbieten muß?<br />
<b>VON FOERSTER:</b> Mit dieser Strategie des Verbietens kann ich Ihnen nur viel Glück wünschen, wirklich, alles Gute; ich glaube, die Zensur funktioniert nicht. Sie macht alles nur noch schlimmer. Meine Vorstellung wäre es, die Absurdität neonazistischer Ideen durch andere Ideen, denen auch die Möglichkeit der Verbreitung gegeben werden muß, zu illustrieren.<br />
<br />
<b>PÖRKSEN:</b> Sie meinen, daß sich das Gute, Richtige und Schöne allein durch die Aufklärung durchsetzen wird?<br />
<b>VON FOERSTER:</b> Sie scheinen sich in diesem Bereich sehr genau auszukennen.<br />
Woher wollen Sie wissen, was dieses Gute, Richtige und Schöne ist? Wen fragen wir beide, um dieses Wissen zu erlangen? Die Konsequenz dieser absoluten Unterscheidungen zwischen dem Guten und dem Schlechten, dem Richtigen, dem Falschen, dem Schönen und dem Häßlichen ist, daß man sich zum Richter emporschwingt und als der ewig Gerechte, der alles ganz genau weiß, begreift.<br />
Das heißt nicht, daß ich nun für einen ethischen Relativismus plädiere, überhaupt nicht, das muß nicht die Konsequenz sein. Aber ich möchte darauf aufmerksam machen, daß diese Unterscheidungen, die vermeintlich eine universale und absolute Gültigkeit besitzen, von Ihnen getroffen werden. Sie sind keineswegs losgelöst von Ihrer Person, sondern Sie tragen für ihre mögliche Durchsetzung die Verantwortung.<br />
<br />
<b>PÖRKSEN:</b> Diese Toleranz gegenüber den Wirklichkeiten anderer könnte einen schier handlungsunfähig machen. Was ist mit den Erlebniswelten der Kühe, der Fische und des Blumenkohls? Um zu essen, vernichte ich ihre Welt, zerstöre ich ihre Möglichkeiten.<br />
<b>VON FOERSTER:</b> Wollen Sie mich jetzt fragen, warum ich einen Blumenkohl esse? Wollen Sie wissen, ob es - gemäß diesem ethischen Prinzip - lieb ist, sich ein Steak zu braten?<br />
<br />
<b>PÖRKSEN:</b> Nicht direkt. Meine These ist, daß der Lebensvollzug eines Menschen stets auch ein Moment der Zerstörung enthält. Immer werden die Entfaltungsmöglichkeiten anderer Wesen vernichtet.<br />
<b>VON FOERSTER:</b> Allerdings bezieht sich mein ethischer Imperativ nicht auf die Möglichkeiten eines einzelnen Wesens, eines einzelnen Menschen oder eines einzelnen Blumenkohls, sondern auf die Vielzahl der Möglichkeiten für das Universum. Das ist gemeint. Und selbstverständlich könnte ich jetzt sagen: Wenn ich den Blumenkohl esse, dann kann ich ein schönes Gedicht schreiben, das - wenn ich verhungern müßte - nicht zustande käme. Ich habe also dem Blumenkohl die Gelegenheit gegeben, ein schönes Gedicht zu erzeugen. Aber das ist natürlich eine Ausrede.<br />
<br />
<b>PÖRKSEN:</b> Wie würden Sie antworten, wenn Sie nicht diese Ausrede verwenden?<br />
<b>VON FOERSTER:</b> Ich würde nach einer anderen Ausrede suchen; im übrigen genieße ich das sehr, wie Sie meinen ethischen Imperativ ad absurdum führen. Das zeigt doch, daß alle Aussagen nur eine endliche Reichweite besitzen. Alles, was ich will, ist, dazu aufzufordern, die Vielzahl der Möglichkeiten zu bedenken: Wir sind frei zu wählen, wir sind frei, uns zu entscheiden. Es gibt nicht irgendeine absolute Wahrheit, die einen zwingt, die Dinge so und nicht anders zu sehen, so und nicht anders zu handeln.<br />
<h3>
<br /></h3>
<h3>
Nachbemerkung</h3>
<br />
Die eigentliche Entstehungsgeschichte der Selbstorganisation beginnt erst in der zweiten Hälfte des 20. Jahrhunderts. Der relativ späte Zeitpunkt hatte viele Gründe. Das vorherrschende mechanistische Paradigma dominierte menschliche Denkweisen. Mit Selbstorganisation in Verbindung stehende Phänomene wurden übersehen oder ignoriert. Gegenwärtig kann noch nicht von einer Theorie selbstorganisierender Systeme oder von empirisch getesteten Hypothesen gesprochen werden.<br />
<br />
Von Foersters Ansatz darf als ein grundlegender Beitrag zum Thema Selbstorganisation betrachtet werden. Der universellen Anwendbarkeit verdankt der Begriff der Selbstorganisation seine breite Resonanz.<br />
<br />
2015 präsentierte ein internationales Team zum ersten Mal das komplette Genom von Physarum polycephalum. Einem Schleimpilz auch genannt 'Blob'. Im Labor dient er als Stellvertreter für alle Schleimpilze und hilft dort, die Intelligenz der rätselhaften Einzeller zu ergründen – und eines Tages nutzbar zu machen.<br />
<br />
Aber das ist eine andere interessante Geschichte – die Entdeckung des Phänomens Selbstorganisation geht weiter.<br />
<div>
<br /></div>
Marcushttp://www.blogger.com/profile/01175903697403722050noreply@blogger.com8tag:blogger.com,1999:blog-8476761749021763994.post-68060726529526035722020-06-17T16:51:00.000+02:002020-06-18T12:31:33.070+02:00Peter Hiemann über Nachhaltigkeit <div class="MsoNormal" style="text-align: center;">
<h2 style="text-align: left;">
<span style="font-family: "arial" , "helvetica" , sans-serif; font-size: small;"><b>Die Mächtigkeit des Planeten und
dessen Natur</b></span></h2>
</div>
<div class="MsoNormal">
<span style="font-family: "arial" , "helvetica" , sans-serif; mso-ansi-language: DE;">Lange kämpfte Homo
sapiens ums Überleben. Er arrangierte sich entsprechend gegebener Umstände des
Planeten und dessen Natur, und lebte von den Früchten und Tieren, die ihm die
Natur bot. Wenn nötig, zog er an einen anderen Ort, wo Lebensbedingungen zum
Überleben ausreichten. Lange glaubten Menschen, dass Geister ihre Schicksale
bestimmten. Lange Zeit glaubten Menschen, dass Götter Menschen geschaffen haben
und Götter über ihre Schicksale entscheiden. Lange glaubten Menschen, dass von
Gott auserwählte Herrscher ihre Schicksale gestalten. Lange glaubten Menschen,
dass menschliche Fähigkeiten dafür sorgen, allen Menschen Wohlstand, Harmonie
und Glück auf Erden zu bringen. Sie erlebten Planet und Natur als ein Wunder:</span><br />
<div style="text-indent: 0px;">
<ul><span style="mso-ansi-language: DE;"><span style="font-family: "arial" , "helvetica" , sans-serif; text-indent: -18pt;">
<li><span style="mso-ansi-language: DE;"><div style="text-indent: 0px;">
<span style="text-indent: -18pt;">Sie erfreuen
sich an der Vielfalt und Schönheit des Planeten und dessen Natur –
Landschaften, das Meer, Pflanzen, Tiere und Menschen.</span></div>
</span></li>
<li><span style="mso-ansi-language: DE;"><div style="text-indent: 0px;">
<span style="text-indent: -18pt;">Sie erfreuen
sich natürlicher Produkte – Getreide, Milch, Butter, Fleisch und Gewürze.</span></div>
</span></li>
<li><div style="text-indent: 0px;">
<span style="text-indent: -18pt;">Sie gestalten
ihr Leben vermittels angenehmer Beziehungen und Spiele.</span></div>
</li>
<li><div style="text-indent: 0px;">
<span style="text-indent: -18pt;">Sie träumen
vom Glück.</span></div>
</li>
</span></span></ul>
<span style="mso-ansi-language: DE;"><span style="font-family: "arial" , "helvetica" , sans-serif; text-indent: -18pt;">
</span></span></div>
</div>
<div class="MsoNormal">
<span style="font-family: "arial" , "helvetica" , sans-serif; mso-ansi-language: DE;">Menschen erleben heute
aber auch, wie die Vielfalt und Schönheit des Planeten und dessen Natur
verloren gehen kann, dass dauerhafter Wohlstand und dauerhaftes Glück für alle
Menschen eine Illusion ist, Menschen erschrecken, wenn der Planet und dessen
Natur anders als erwartet, angenehme Lebensbedingungen 'verweigert'. Menschen
ahnen, dass ihr Leben von der Mächtigkeit des Planeten und dessen Natur mehr
geprägt wird, als sie bisher annahmen. Menschen begreifen langsam, dass sie natürliche, nachhaltige Prozesse nicht
gebührend beachtet haben, Menschen ahnen, dass sie sich um nachhaltige Denk-
und Verhaltensweisen bemühen müssen.<o:p></o:p></span></div>
<div class="MsoNormal">
<span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></div>
<div class="MsoNormal">
<span style="font-family: "arial" , "helvetica" , sans-serif; mso-ansi-language: DE;">Ein Sachse, der in Dresden
geboren wurde und seit längerer Zeit an der schönen Côte d'Azur lebt, hatte
sich vorgenommen, eine vorangegangene Gedankenkette über Wertvorstellungen und gesellschaftliche
Kultur vermittels Gedanken über nachhaltige Denk- und Verhaltensweisen 'weiterzuspinnen'.
Dabei konnte der Dresdner feststellen, dass vor ihm bereits der längst
verstorbene Sachse Hans Carl von Carlowitz (1645 – 1714) das Thema
Nachhaltigkeit ziemlich umfassend dargestellt hat.<span style="mso-spacerun: yes;"> </span><o:p></o:p></span></div>
<div class="MsoNormal">
<span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></div>
<div class="MsoNormal">
<span style="font-family: "arial" , "helvetica" , sans-serif; mso-ansi-language: DE;">Ulrich Grober (* 1949)
hat auf Carlowitz' aufmerksam gemacht, und darüber hinaus gezeigt, wie lebendig
das Thema Nachhaltigkeit schon immer war und heute mehr denn je ist.<o:p></o:p></span></div>
<div class="MsoNormal">
<span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></div>
<div class="MsoNormal" style="text-align: center;">
<div style="text-align: left;">
<b><span style="font-family: "arial" , "helvetica" , sans-serif;">Die Entdeckung der
Nachhaltigkeit: Kulturgeschichte eines Begriffs</span></b></div>
<div style="text-align: left;">
<div style="text-align: left;">
<span style="font-family: "arial" , "helvetica" , sans-serif; text-align: center;"><br /></span></div>
</div>
<div style="text-align: left;">
<div style="text-align: left;">
<span style="font-family: "arial" , "helvetica" , sans-serif; text-align: center;">Ulrich
Grober</span></div>
</div>
</div>
<div class="MsoNormal" style="text-align: center;">
<div style="text-align: left;">
<span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></div>
</div>
<div class="MsoNormal">
<span style="font-family: "arial" , "helvetica" , sans-serif;"><span style="mso-ansi-language: DE;">Nachhaltig ist heutzutage
alles, von der Diät bis zum Ausbau der Kapitalkraft. Nachhaltigkeit ist aber
unser ursprünglichstes Weltkulturerbe, ein Begriff, der tief in unserer Kultur
verwurzelt ist und den es vor seinem inflationären Gebrauch zu retten gilt. Das
von Joachim Heinrich Campe 1807 herausgegebene Wörterbuch der deutschen Sprache
definiert das Wort »Nachhalt« als das, »woran man sich hält, wenn alles andere
nicht mehr hält«. An was kann man sich halten, was bedeutet Nachhaltigkeit? In
diesem anschaulich erzählten Buch wird der Begriff »Nachhaltigkeit« neu
vermessen. Vor fast 250 Jahren avancierte er zum Leitbegriff des deutschen
Forstwesens und bezeichnet seitdem die Verpflichtung, Reserven für künftige
Generationen nachzuhalten. Das von Hans Carl von Carlowitz 1713 erstmals
beschriebene Dreieck der Nachhaltigkeit ökologisches Gleichgewicht, ökonomische
Sicherheit und soziale Gerechtigkeit ist heute als »sustainable development« in
aller Munde. Die Idee dieses Begriffs aber reicht noch weiter zurück. Sie
findet sich im »Sonnengesang« des Franziskus von Assisi genauso wie bei den
griechischen Philosophen und den Philosophen der Aufklärung. Ulrich Grobers
spannende (Zeit)Reise führt uns an den Hof des Sonnenkönigs und in die
deutschen Fürstenstaaten, erzählt vom sächsischen Silberbergbau und vom
Holzmangel. Und davon, dass die Nachhaltigkeitsidee überall, wo sie auftaucht,
ein Kind der Krise ist, aber auch die Entstehung eines neuen Bewusstseins
markiert. Des Bewusstseins, dass der Planet, auf dem wir leben, erhalten und
bewahrt werden muss.</span><span lang="EN-US"><o:p></o:p></span></span></div>
<div class="MsoNormal">
<span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></div>
<div class="MsoNormal">
<span style="font-family: "arial" , "helvetica" , sans-serif;"><b><span style="mso-ansi-language: DE;">Von Freiberg nach Rio
–<span style="mso-spacerun: yes;"> </span>Carlowitz und die Bildung des
Begriffs<span style="mso-spacerun: yes;"> </span>›Nachhaltigkeit‹</span></b><span style="mso-ansi-language: DE;"><o:p></o:p></span></span></div>
<div class="MsoNormal">
<span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif; mso-ansi-language: DE;">Wer sich heute für Nachhaltigkeit engagiert, ist nicht nur Teil einer großen und wachsenden globalen Suchbewegung. Er ist auch Teil einer reichen Geschichte. Und diese Geschichte beginnt nicht erst in unserer Gegenwart, nicht erst in den ›think tanks‹, den Denkfabriken der UNO oder des Club of Rome. Dieses Denken ist uralt. Es hat tiefe Wurzeln in den Kulturen der Welt. Es ist ein geistiges Weltkulturerbe. Aber die Geschichte des Begriffs beginnt mit einem Buch, das in Freiberg geschrieben wurde -hinter den wuchtigen Mauern des spätgotischen Gebäudes unweit des Domes, in dem seit 350 Jahren fast ununterbrochen das sächsische Oberbergamt seinen Sitz hat. Erschienen ist das Buch 1713, vor 300 Jahren, in Leipzig. Der Titel klingt sperrig: Sylvicultura oeconomica – Anweisung zur wilden Baumzucht. Der Autor, Hans Carl von Carlowitz, amtierte 1713 als sächsischer Oberberghauptmann in Freiberg. Sein Buch hat es in sich. Es schenkte uns eine semantische Innovation, die bis heute nachwirkt, ja erst heute ihr volles Potenzial entfaltet. Wenn es in barocker Sprache, in immer neuen Anläufen, in weitschweifigen, kreisenden und tastenden Denkbewegungen die »nachhaltende Nutzung« der Ressource Holz im Dienste des »gemeinen Wesens« (= des Gemeinwesens) und der »lieben Posterität« (Nachkommenschaft) einfordert, erlebt der Leser die Verknüpfung eines spezifischen Wortes mit einer klar umrissenen Idee. Mit diesem Buch begann die Ausprägung dieses Wortes zu einem Begriff, die Begriffsbildung von Nachhaltigkeit. Das Buch liefert uns die Blaupause für unser Leitbild. </span><br />
<span style="font-family: "arial" , "helvetica" , sans-serif; mso-ansi-language: DE;"><br /></span>
<span style="font-family: "arial" , "helvetica" , sans-serif; mso-ansi-language: DE;">Gewiss hat der moderne Begriff einen wesentlich größeren Umfang. Er zielt auf das große Ganze. ›Sustainability‹ gilt als universelles Prinzip für den Umgang mit allen Ressourcen, ja sogar für eine Transformation unserer gesamten Lebensweise, also der Muster, wie wir produzieren, konsumieren und zusammenleben. Folgende, nicht weiter gekennzeichnete Seitenangaben beziehen sich alle auf dieses Buch.
Für Carlowitz stand noch die »nachhaltende« Nutzung der Ressource Holz im Vordergrund. Doch in den Tiefenstrukturen des Begriffs werden Zusammenhang und Kontinuität zwischen der Sylvicultura oeconomica und unserem modernen Konzept sichtbar. Spiegelt man unseren modernen Diskurs in der alten Quelle, so macht man erstaunliche Entdeckungen: Wo die Brundtland-Kommission der UN 1987 Nachhaltigkeit als eine Entwicklung definierte, »welche die Bedürfnisse der gegenwärtigen Generation befriedigt, ohne die Fähigkeit zukünftiger Generationen zu gefährden, ihre eigenen Bedürfnisse zu befriedigen «,ging es Carlowitz vor 300 Jahren um »eine immerwährende Holtz=Nutzung« (Untertitel) »zum Besten des gemeinen Wesens und denen Nachkommen zum Besten« (Widmung).Wo der Brundtland-Report von den »future generations« schreibt, spricht Carlowitz von der »lieben Posterität«. Wo Gro Harlem Brundtland »conservation and enhancement« (Bewahrung und Erweiterung) der Ressourcenbasis für erforderlich hält, ist für Carlowitz »Conservation und Anbau des Holtzes ... unentbehrlich«. Wo der Club of Rome-Bericht von 1972 über die Grenzen des Wachstums nach einem Modell für die Zukunft sucht, das »sustainable« ist, und das heißt: gegen einen »plötzlichen und unkontrollierbaren Kollaps« gefeit, spricht Carlowitz davon, dass ohne die »nachhaltende« Nutzung der Ressource Holz »das Land in seinem Esse«, in seiner Existenz »nicht bleiben mag« (S. 105), also kollabiert. Wo heutige Ökonomen wie der Amerikaner Herman Daly eine ›steady-state economy‹ entwerfen, also eine stetige Wirtschaft, die im »Fließgleichgewicht« oder »Beharrungszustand« bleibt, sprach Carlowitz von einer »beständigen, kontinuierlichen und nachhaltenden Nutzung«. Die Analogien sind frappierend: Heute wie damals geht es darum, die Selbstsorge der gegenwärtigen Generation unlösbar mit der Vorsorge für die kommenden Generationen zu verbinden. Generationengerechtigkeit ist über die drei Jahrhunderte hinweg der ethische Kern dieses Begriffs.
Vielleicht haben Gro Harlem Brundtland und die vielen Wegbereiter des modernen Nachhaltigkeitsdiskurses Carlowitz weder gelesen noch seinen Namen gekannt. Entscheidend ist vielmehr Folgendes: Seit Carlowitz ist die Vokabel, der Wortkörper des allgemeinsprachlichen Verbes »nachhalten« mit Bedeutungen aufgeladen, die es zu einem Begriff machten. Diese Aufladungen blieben erhalten, als der deutsche forstliche Fachterminus »Nachhaltigkeit« im 19. Jahrhundert mit »sustained yield forestry« ins Englische übersetzt wurde. Sie sind bis heute wirksam. Darin liegt die historische Bedeutung der Sylvicultura oeconomica. Carlowitz hat als erster eine Form des Wortes »nachhalten« mit dem Gedanken der Daseinsfürsorge und der Daseinsvorsorge verknüpft und so ein Denken der Verantwortung für die nachkommenden Generationen begreiflich gemacht, auf den Begriff gebracht. Wie konnte ein Begriff aus dem vormodernen, kameralistischen Denken kleiner geschlossener mitteleuropäischer Territorien urplötzlich und explosionsartig in der globalisierten Welt des 20. Jahrhunderts eine derartig fulminante Wirkung entfalten? Eine erste Antwort: Auf den Fotos aus dem Weltall, die um 1970 von den bemannten Mondflügen zur Erde gesendet wurden, sah sich die Menschheit zum ersten Mal in ihrer Geschichte ganz und gar von außen. Ein epochales Ereignis: Schlagartig wurde man sich im ›global village‹ bewusst, dass der blaue Planet insgesamt ein geschlossenes, begrenztes System darstellt: ›spaceship earth‹. Die Grenzen des Wachstums kamen in Sicht und damit der Zwang zur Selbstbeschränkung.</span></div>
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<b><span style="font-family: "arial" , "helvetica" , sans-serif; mso-ansi-language: DE;">Die Begriffe
richtigstellen<o:p></o:p></span></b></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif; mso-ansi-language: DE;">Warum im Jahr 2013
Carlowitz und sein 300 Jahre altes Buch neu zur Kenntnis nehmen, ja sogar
lesen? Auf die Frage, was er als erstes tun würde, wenn ihm der Kaiser die
Regierung des Staates anvertraute, antwortete im 6. Jahrhundert vor unserer
Zeitrechnung der chinesische Weise Konfuzius: »Unbedingt die Bezeichnungen
richtigstellen«. ›Zheng Ming‹ – die Richtigstellung der Worte –
wörtlich übersetzt »auf korrekte Begriffe halten« – steht noch heute im Zentrum
chinesischer Philosophie. Eine solche Arbeit am Begriff, eine neue Sorgfalt des
Umgangs damit scheint heute im Fall von Nachhaltigkeit besonders dringlich.
Alle reden von Nachhaltigkeit und das ist gut so. Aber dabei ist das Konzept in
das Feuerwerk der Reklamesprache und der politischen Propaganda geraten. Wo
alles nachhaltig ist, ist nichts mehr nachhaltig. Diese Beliebigkeit macht uns
begriffslos. Ist das Wort schon verbraucht? Jetzt, da wir es so dringend
brauchen? Nämlich als »key to human survival«, als Schlüssel zum Überleben der
Menschheit. Können wir darauf verzichten? Haben wir einen gleichwertigen
Ersatz? Ein anderes Wort mit demselben Bedeutungsumfang, mit der derselben
Gravität und Flexibilität? Die Alternative zum sehr riskanten Verzicht auf den
Begriff: Der schleichenden Entkernung des Begriffs die Suche nach seinem Kern
entgegenzusetzen. Diese Suche führt uns in die Geschichte des Begriffs – und zu
Carlowitz. In den Anfängen einer Begriffsbildung wird immer Elementares
verhandelt. Hier wird die Substanz entwickelt, die später ihr Potenzial
entfaltet, aber im Prozess der Operationalisierung und Anwendung zu
verschwimmen droht. In diesem Sinn kann die Sylvicultura oeconomica uns heute
dienen: Als Quelle, in der wir unseren Gebrauch des Wortes spiegeln und
überprüfen können – und seine Würde neu erfahren. Die Entdeckung der
Nachhaltigkeit geht weiter.<o:p></o:p></span></div>
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<b style="font-family: arial, helvetica, sans-serif;"><br /></b>
<b style="font-family: arial, helvetica, sans-serif;">Die Macht bei menschlichen Beziehungen</b></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif; mso-ansi-language: DE;">Nachhaltiges menschliches
Verhalten<span style="mso-spacerun: yes;"> </span>betrifft also nicht nur die
Art und Weise, wie Menschen mit der Natur umgehen. Es betrifft zwar
vordergründig menschliche Beziehungen zu Tieren und Personen, aber auch
Beziehungen zu Produkten (und Dienstleistungen), zu Arbeitsverhältnissen, zu
Plänen, zu Ereignissen, zu Themenbehandlung und zur Zeit. Beziehungen werden
auf unterschiedliche Weise erlebt:</span><br />
<ul>
<li><span style="font-family: "arial" , "helvetica" , sans-serif; text-indent: -18pt;">objektiv (kognitiv)</span></li>
<li><span style="font-family: "arial" , "helvetica" , sans-serif;">subjektiv
(emotional, gefühlt)</span></li>
<li><span style="font-family: "arial" , "helvetica" , sans-serif;">achtsam
(bewusst)</span></li>
<li><span style="font-family: "arial" , "helvetica" , sans-serif;">gewohnheitsmäßig
(unbewusst)</span></li>
</ul>
<ul>
</ul>
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<span style="font-family: "arial" , "helvetica" , sans-serif;">Kürzlich wurde ich gefragt, ob der allgemeine menschliche
Anspruch berechtigt ist, „ein gutes Leben für alle, in der Gegenwart und in der Zukunft, zu haben.“ Der Fragesteller sagte nicht, ob es ihm um ein objektives oder subjektives Anliegen geht. Es ist offensichtlich, dass wir uns alle an Tätigkeiten und Personen erfreuen, die uns verlockend 'erscheinen'. Falls der Erwerb einer Fähigkeit wenig Mühe macht, wird sie relativ schnell zur Gewohnheit. Dagegen erfordert der Erwerb anspruchsvoller (auch professionell nützlicher) Fähigkeiten viel Mühe, bis sie 'verinnerlicht' werden. Eine mühsam erworbene Handlungsmöglichkeit zu verlieren – aufgrund des Verlustes des Arbeitsplatzes, des Verlustes einer Liebesbeziehung, des fortgeschrittenen Alters oder einer Krankheit – kann bewirken, dass Denk- und Verhaltensweisen entsprechend einer neuen Situation mühsam revidiert werden müssen. <o:p></o:p></span></div>
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<span class="MsoHyperlink"><span style="font-family: "arial" , "helvetica" , sans-serif; mso-ansi-language: DE;">Meines Erachtens gibt es keine Hinweise, dass ein
Anspruch auf ein sowohl objektiv als auch subjektiv erlebtes gutes Leben vermittels der menschlichen biologischen Evolution im menschlichen Gehirn von Geburt an 'verankert' ist. Neurobiologische Erkenntnisse weisen vielmehr darauf hin, dass
</span></span><br />
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<ol><span class="MsoHyperlink"><span style="font-family: "arial" , "helvetica" , sans-serif; mso-ansi-language: DE;">
<li><span class="MsoHyperlink"><span style="mso-ansi-language: DE;"><span style="mso-spacerun: yes;"><span class="MsoHyperlink"><span style="mso-ansi-language: DE;"><span style="font-family: "arial" , "helvetica" , sans-serif; mso-spacerun: yes;"><div style="text-indent: 0px;">
<span style="text-indent: -18pt;">in allen
Lebewesen existiert der Instinkt zum Überleben ,</span></div>
</span></span></span></span></span></span></li>
<li><div style="text-indent: 0px;">
<span class="MsoHyperlink"><span style="mso-ansi-language: DE;"><span style="mso-spacerun: yes;"><span style="font-family: "arial" , "helvetica" , sans-serif; text-indent: -18pt;">menschliche
Wesen in der Lage sind Fähigkeiten zu erwerben, um mit möglichst vielen
Situationen im Leben zurechtzukommen,</span></span></span></span></div>
</li>
<li><div style="text-indent: 0px;">
<span class="MsoHyperlink"><span style="mso-ansi-language: DE;"><span style="mso-spacerun: yes;"><span style="font-family: "arial" , "helvetica" , sans-serif; text-indent: -18pt;">etwa 80 bis
90 Prozent menschlicher Gehirntätigkeit unbewusst ablaufende Vorgänge betrifft
– emotionalem, intuitivem und an-gewohntem Denken und Handeln.</span></span></span></span></div>
</li>
</span></span></ol>
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<span style="font-family: "arial" , "helvetica" , sans-serif; mso-ansi-language: DE;">Der Neurobiologe Gerald
Hüther (*1951) vertritt eine Theorie des Bewusstseins, die besagt: „Es gibt
immer übergeordnete [neuronale] Muster, die darunterliegende Prozesse lenken und
steuern. Zum Beispiel haben wir ein Bewegungsmuster, das uns hilft, ein Glas an
den Mund zu führen. Das ist eine Bewegungsgestalt, die im Hirn abgespeichert
ist. Wollen wir nun also etwas trinken, wissen wir durch das Muster, wie es
geht und brauchen uns das Trinken nur vorzustellen. Das Gehirn reguliert dann
von allein die ganzen einzelnen Bewegungen und Muskelkontraktionen, um das Glas
anzuheben und zu trinken. Dieses Beispiel können wir auch auf der Ebene der
Steuerung unseres Verhaltens anwenden. Dort nennt man übergeordnete Muster
innere Einstellung, Haltung oder Mindset. Von dieser Haltung hängt es ab, wie
wir uns verhalten. Wenn Menschen die Frage beantworten, was für ein Mensch sie
sein wollen,<span style="mso-spacerun: yes;"> </span>dann ist die Antwort immer
gleich. Denn die Frage ist so grundlegend, dass es darauf nur eine Antwort
gibt: Ich möchte jemand sein, der andere Menschen glücklich macht. Oder ich
möchte jemand sein, der diese Natur erhält und der dazu beiträgt, dass hier
alles wachsen kann. Es gibt keine Antwort wie „ich möchte jemand sein, der
besonders viel Geld hat....... Stellen wir uns mal vor, wir fragen jemanden und
der antwortet: „Ich bin auf der Welt, damit ich ein gutes Leben habe, damit es
mir gut geht.“ Dann würde ich fragen, was ist denn das, was dich glücklich macht?
„Wenn ich viel Geld habe.“ Und was machst du mit dem vielen Geld? „Damit kaufe
ich mir eine Segeljacht.“ Und was hast du damit vor? „Dann fahr ich umher.“ Wie
viele Jahre möchtest du gern umherfahren? Dann fängt er an nachzudenken, denn
er möchte nicht sein ganzes Leben auf der Segeljacht fahren – was ich damit
zeigen will: In diesen Befragungen müssen Sie immer weiterfragen. Am Ende wird
die Person erkennen, dass sie nur glücklich sein kann, indem sie auf eine Art
und Weise lebt, dass andere Lebewesen auch leben können. Es geht gar nicht
anders.</span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif;"><span style="mso-ansi-language: DE;">Als Gerald Hüther gefragt
wurde, wie kann man Menschen dazu bringen, ihr Denken und Verhalten zu ändern,
war seine Antwort: : „Bisher haben wir immer gedacht, dass wir Menschen von
außen dazu bringen können, ihr Verhalten zu ändern. Doch noch nie sind die
Leute mit solchen großen Autos umhergefahren, noch nie waren die
landwirtschaftlichen Nutzflächen so ausgebeutet und noch nie ist so viel
Plastikmüll in den Meeren geschwommen. Also heißt das doch, dass unsere
bisherigen Strategien nicht funktioniert haben. Wenn es also nicht von außen
geht, muss es von innen gehen. Wir müssen uns fragen: Was im Menschen kann man
wachrufen und stärken, damit er aufwacht und sich anders verhält?<span style="mso-spacerun: yes;"> </span>Wir müssten ein bestimmtes Bild von uns
selbst haben und feststellen, dass dieses Bild nicht mit dem übereinstimmt, wie
wir tagtäglich handeln. Durch dieses Missverhältnis ginge es uns nicht gut. Und
dann würden wir versuchen, unser Verhalten an das Bild von uns selbst
anzupassen. Vorausgesetzt ist, dass wir ein starkes Bild von uns haben, denn
sonst kann man dieses Bild in die Ecke legen und sagen „das interessiert mich
nicht“. Das stärkste Bild, das ich für solche Fälle gefunden habe, ist die
Vorstellung von der eigenen Würde.“</span><span lang="EN-US"><o:p></o:p></span></span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif; mso-ansi-language: DE;">Hüther irrt, wenn er
glaubt, dass Menschen am Ende erkennen, dass sie nur glücklich sein können,
indem sie auf eine Art und Weise leben, dass andere Lebewesen auch leben
können. Hüther übersieht die Rolle der Macht. <o:p></o:p></span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif; mso-ansi-language: DE;">Robert V. Levine (1945 -
2019), ein US Sozialpsychologe, widmete viele Studien dem Thema wie Menschen
unterschiedlicher Kulturen Zeit wahrnehmen. Im Verlauf der menschlichen
Kulturgeschichte wurde es notwendig, die Uhrzeiten zwischen staatlichen Grenzen
weltweit zu normieren. Damit war die Voraussetzung geschaffen, Uhrzeiten
weltweit zwischen Staaten zu synchronisieren. Damit wurde aber auch weltweit
die Möglichkeit geschaffen, dass Zeit das Maß menschlicher Denk- und
Verhaltensweisen wurde: “Zeit ist Geld“. Produkte und Dienstleistungen hatten
nicht nur einen Handelswert, ihr Wert bemaß sich am Wert von<span style="mso-spacerun: yes;"> </span>persönlicher Arbeitskraft. Ereignisse und
Themenbehandlungen hatten keinen ethischen und moralischen Wert, ihr Wert bemaß
sich am kommerziellen Erfolg. Selbst menschliche Beziehungen wurden daran gemessen,
inwieweit sie zu kommerziellem Erfolg beitragen.<o:p></o:p></span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif; mso-ansi-language: DE;">Die Vorstellung “Zeit ist
Geld“ betrifft jedoch nur ein objektiv messbares Zeitgefühl. Es wurde und wird
auch heute als plausible Vorstellung von der Mehrheit der Bevölkerungen
verinnerlicht. Das Maß “Zeit ist Geld“ hilft hierarchisch operierender
Organisationen effektiv zu funktionieren. Geld manifestiert sich als Macht.
Häufig wird übersehen oder gar ignoriert, dass auch ein subjektives Zeitgefühl
existiert, das sich derzeit mehr oder weniger lautstark bemerkbar macht.<o:p></o:p></span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif;"><span style="mso-ansi-language: DE;">Wenn man bedenkt, wie
lange Erkenntnisse hinsichtlich nachhaltigem Denken und Verhalten schon
existieren, ohne dass sich Menschen in diesem Sinn wesentlich verändert haben,
kommt man zu dem Schluss, dass Aufklärung weniger bewirkt als oft angenommen.
Es ist letztlich notwendig, dass jeder sein Denken und Verhalten selbst<span style="mso-spacerun: yes;"> </span>einschätzt, inwieweit es nachhaltigen Zielen
dienlich ist. und der Würde aller Menschen gerecht wird.</span></span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif;"><span style="mso-ansi-language: DE;">Die derzeitigen
gesellschaftlich schwierigen Situationen deuten darauf hin, dass<span style="mso-spacerun: yes;"> </span>Homo sapiens früher oder später gezwungen
sein wird zu lernen, </span><span class="MsoHyperlink"><span style="mso-ansi-language: DE;">gesellschaftliche Prozesse nachhaltig zu gestalten.
Gewohnte gesellschaftliche Vorstellungen und Prozesse zu revidieren (zu
reformieren?) ist jedoch ein schwieriges Unterfangen und braucht viel Zeit,
weil Lernen auf dem Prinzip 'Versuch und Irrtum' beruht. Öffentliche
polarisierende Meinungen, die heute stärker denn je von Medien beeinflusst
werden, erschweren das Unterfangen zusätzlich. </span></span><span lang="EN-US"><o:p></o:p></span></span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif;"><span class="MsoHyperlink"><span style="mso-ansi-language: DE;">Die Entdeckung der Nachhaltigkeit geht weiter.</span></span></span></div>
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<b><span style="font-family: "arial" , "helvetica" , sans-serif; mso-ansi-language: DE;">Referenzen:<o:p></o:p></span></b></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></div>
<div class="MsoNormal">
<span style="font-family: "arial" , "helvetica" , sans-serif; mso-ansi-language: DE;">Ulrich Grober - Die
Entdeckung der Nachhaltigkeit – Kulturgeschichte eines Begriffs. <o:p></o:p></span></div>
<div class="MsoNormal">
<span style="font-family: "arial" , "helvetica" , sans-serif; mso-ansi-language: DE;">Antje Kunstmann Verlag,
München, 2013. <o:p></o:p></span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif; mso-ansi-language: DE;">Ulrich Grober -
Sustainability –<span style="mso-spacerun: yes;"> </span>A cultural history. <o:p></o:p></span></div>
<div class="MsoNormal">
<span style="font-family: "arial" , "helvetica" , sans-serif; mso-ansi-language: DE;">Green Books, Totnes UK,
2012<o:p></o:p></span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif;"><span style="mso-ansi-language: DE;">Quelle: </span><span lang="EN-US"><o:p></o:p></span></span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif;"><span lang="EN-US"><a href="https://www.oekom.de/_files_media/titel/leseproben/9783865814159.pdf"><span lang="DE" style="mso-ansi-language: DE;">https://www.oekom.de/_files_media/titel/leseproben/9783865814159.pdf</span></a></span><span style="mso-ansi-language: DE;"><o:p></o:p></span></span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></div>
<div class="MsoNormal">
<span style="font-family: "arial" , "helvetica" , sans-serif; mso-ansi-language: DE;">Ulrich Grobers “Die
Entdeckung der Nachhaltigkeit“ (2010) gilt als Standardwerk. Im Jahr 2012 wurde
es ins Englische übersetzt. Die Royal Society lud ihn 2013 ein, seine
Erkenntnisse zur Nachhaltigkeit darzustellen.<span style="mso-spacerun: yes;"> </span>2014 diente ein Text von Grober der UNO in ihrem "Global
Sustainable Development Report" als Referenz für die Geschichte des
Konzepts Nachhaltigkeit. <o:p></o:p></span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif; mso-ansi-language: DE;">Das Umweltministerium in
Brandenburg: Grober leiste mit seinem Buch einen wichtigen Beitrag dazu, dass
Nachhaltigkeit nicht zum Modewort verkommt, sondern die Idee vom nachhaltigen
Denken, Leben und Handeln die Köpfe und Herzen der Menschen im Alltag erreicht.
Dabei zeichnet er in unterhaltsamer und gut lesbarer Form die historische
Entwicklung des Wortes nach. Der Leser erfährt auf einer Gedankenreise vom Buch
Genesis über mittelalterliche Klöster, barocke Verwaltungssprache, Woodstock
und John Lennon – um nur einige Stationen zu nennen – Erstaunliches über und um
den Begriff der Nachhaltigkeit. (Wikipedia)<o:p></o:p></span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif; mso-ansi-language: DE;">Boje Maaßen - Ein
Interview mit Ulrich Grober: “Das Gegenteil von Kollaps“<o:p></o:p></span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif;"><span style="mso-ansi-language: DE;">Quelle:</span><span lang="EN-US"><a href="https://iley.de/?article=NACHHALTIGKEIT-das_gegenteil_von_kollaps"><span lang="DE" style="mso-ansi-language: DE;">https://iley.de/?article=NACHHALTIGKEIT-das_gegenteil_von_kollaps</span></a></span><span style="mso-ansi-language: DE;"><o:p></o:p></span></span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif; mso-ansi-language: DE;">Gerald Hüther: „Das Leben
besteht nicht darin, sich irgendwelche Konsumbedürfnisse zu erfüllen“<o:p></o:p></span></div>
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<span style="font-family: "arial" , "helvetica" , sans-serif;"><span style="mso-ansi-language: DE;">Quelle: </span><span lang="EN-US"><a href="https://utopia.de/gerald-huether-hirnforscher-das-leben-besteht-nicht-darin-sich-irgendwelche-konsumbeduerfnisse-zu-erfuellen-51507/"><span lang="DE" style="mso-ansi-language: DE;">https://utopia.de/gerald-huether-hirnforscher-das-leben-besteht-nicht-darin-sich-irgendwelche-konsumbeduerfnisse-zu-erfuellen-51507/</span></a></span><span style="mso-ansi-language: DE;"><o:p></o:p></span></span></div>
<br />Marcushttp://www.blogger.com/profile/01175903697403722050noreply@blogger.com0tag:blogger.com,1999:blog-8476761749021763994.post-17141204120208025972020-05-29T11:04:00.002+02:002020-05-29T16:44:05.176+02:00Narrative in den Wirtschaftswissenschaften<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-family: "arial" , "sans-serif"; font-size: large;"><a href="https://de.wikipedia.org/wiki/Robert_J._Shiller">RobertJames Shiller</a> (*1946) ist ein US-amerikanischer Ökonom und Professor für
Wirtschaftswissenschaften an der Yale University. Er erhielt 2013 – gemeinsam
mit Lars Peter Hansen und Eugene Fama – den Nobelpreis für Wirtschaftswissenschaften,
der von der schwedischen Nationalbank verliehen wird. </span></div>
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<span style="font-family: "arial" , "sans-serif"; font-size: large;">In den
1980er Jahren entwickelte Shiller zusammen mit Karl E. Case und Allan Weiss den
Case-Shiller-Index, der die Entwicklung des US-amerikanischen Immobilienmarktes
widerspiegelt. Sein im Jahr 2000 auf dem Höhepunkt der New-Economy-Euphorie
erschienenes Buch „Irrationaler Überschwang“ (engl. <i style="mso-bidi-font-style: normal;">irrational exuberance</i>) wurde zum Bestseller. Die darin
aufgestellten Thesen bewahrheiteten sich kurz darauf in der Baisse der Jahre
bis 2003. Auch vor der 2008 geplatzten Immobilienblase in den USA warnte er
frühzeitig. Die nachfolgenden Bemerkungen basieren auf Shillers Buch <i style="mso-bidi-font-style: normal;">Narrative Wirtschaft</i> (2020, 480 Seiten).</span></div>
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<b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span style="font-family: "arial" , "sans-serif"; font-size: large;">Wesen
der Narrative</span></i></b></div>
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<span style="font-family: "arial" , "sans-serif"; font-size: large;">Das Wort
Narrativ ist sehr modern. Es ist eine Aufpolierung oder Auffrischung eines sehr
abgenutzten Begriffs, dem der Erzählung oder der Geschichte (engl. <i style="mso-bidi-font-style: normal;">story</i>). Shillers Augenmerk sind ökonomische
Narrative. Er vergleicht sie mit Epidemien. Irgendwann gehen sie viral, so wie
eine von Viren übertragene Krankheit. Dabei gibt es Schleuderer (engl. <i style="mso-bidi-font-style: normal;">superspreader</i>). Das sind Infizierte, die
besonders viele andere Menschen anstecken. Das Abflauen erfolgt nicht durch
Heilung, sondern durch Vergessen. </span></div>
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<b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span style="font-family: "arial" , "sans-serif"; font-size: large;">Berühmte
Beispiele</span></i></b></div>
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<span style="font-family: "arial" , "sans-serif"; font-size: large;">Shillers
Buch verweist auf mehrere Dutzend Beispiele, die in den Wirtschaftswissenschaften
eine Rolle spielen. Im Folgenden will ich drei Beispiele näher beleuchten. Sie
stellen ganz unterschiedliche Ebenen dar, auf denen ein Phänomen signifikant
sein kann.</span></div>
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<b style="wirtschaftswissenschaftenso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span style="font-family: "arial" , "sans-serif"; font-size: large;">Beispiel
1: Amerikanischer Traum </span></i></b></div>
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<span style="font-family: "arial" , "sans-serif"; font-size: large;">Der
Begriff ist seit 1931 im Gebrauch und spricht vor allem den materiellen Wohlstand
an, den Amerikaner erreichen können. Die Grundlage dafür wurde schon 1776 in
der Unabhängigkeitserklärung (engl.: <i style="mso-bidi-font-style: normal;">Declaration
of Independence</i>) geschaffen, die besagt, dass alle Menschen gleich sind,
und dass alle amerikanischen Staatsbürger das Recht auf Leben, Freiheit und das
Streben nach Glück haben. Auf den Gedanken des amerikanischen Traums lässt sich
ein Großteil der Zuwanderung nach Amerika zurückführen. Richtig viral wird der
Begriff ab 1950 in verschiedenen fast gleichzeitig erschienenen Büchern. Martin
Luther King gab der Sache 1963 eine spezielle politische Bedeutung. Bekanntlich
wurde er wenig später ermordet. Heute wird der Begriff Amerikanischer Traum
primär von Maklern verwendet, und zwar in der Werbung für Eigenheime. Einige
Leute verbinden mit ihm auch einen Appell zur moralischen Rechtschaffenheit.</span></div>
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<b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span style="font-family: "arial" , "sans-serif"; font-size: large;">Beispiel
2: Bitcoin</span></i></b></div>
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<span style="font-family: "arial" , "sans-serif"; font-size: large;">Bitcoin
ist die weltweit führende Kryptowährung. Sie basiert auf einem dezentral organisierten
Buchungssystems. Zahlungen werden kryptographisch legitimiert und über ein Netz
gleichwertiger Rechner (eng. <i style="mso-bidi-font-style: normal;">peer-to-peer</i>)
abgewickelt. Anders als im klassischen Banksystem üblich, ist kein zentrales
Clearing der Geldbewegungen notwendig. Eigentumsnachweise an Bitcoin werden in
persönlichen digitalen Brieftaschen gespeichert. Der Kurs eines Bitcoin zu den
gesetzlichen Zahlungsmitteln folgt dem Grundsatz der Preisbildung an der Börse.
Die Idee einer Kryptowährung ist vor allem bei Leuten interessant, die den Einfluss
des Staates zurückdrängen wollen.</span></div>
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<span style="font-family: "arial" , "sans-serif"; font-size: large;">Das
Bitcoin-Zahlungssystem wurde von dem unter dem Pseudonym Satoshi Nakamoto auftretenden
Autor nach dessen Aussage im Jahr 2007 erfunden. Es wurde im November 2008 in
einer Veröffentlichung beschrieben und seit Januar 2009 mit einer Open-Source-Referenzsoftware
unterstützt. Das Bitcoin-Netzwerk basiert auf einer von den Teilnehmern
gemeinsam verwalteten dezentralen Datenbank, der Blockchain, in der alle
Transaktionen verzeichnet sind. Mit Hilfe kryptographischer Techniken wird sichergestellt,
dass gültige Transaktionen mit Bitcoins nur vom jeweiligen Eigentümer
vorgenommen und Geldeinheiten nicht mehrfach ausgegeben werden können. Neue
Bitcoin-Einheiten werden durch die Lösung kryptographischer Aufgaben, das sogenannte
Schürfen (engl. <i style="mso-bidi-font-style: normal;">mining)</i>, geschaffen.</span></div>
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<b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span style="font-family: "arial" , "sans-serif"; font-size: large;">Beispiel
3: Laffer-Kurve</span></i></b></div>
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<a href="https://www.blogger.com/blogger.g?blogID=8476761749021763994" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"></a><a href="https://www.blogger.com/blogger.g?blogID=8476761749021763994" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"></a><br /></div>
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<a href="https://www.blogger.com/blogger.g?blogID=8476761749021763994" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"></a><a href="https://www.blogger.com/blogger.g?blogID=8476761749021763994" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"></a><span style="font-family: "arial" , "sans-serif"; font-size: large;">Die
Laffer-Kurve ist ein nach dem US-Ökonomen Arthur B. Laffer benannter finanzwissenschaftlicher
hypothetischer Zusammenhang, dem zufolge die Steuereinnahmen mit steigendem
Steuersatz erst steigen, dann nach Erreichen eines Maximums wieder sinken, also
die Form eines umgekehrten „U“ annehmen. Das bedeutet insbesondere, dass bei
hohen Steuersätzen eine Senkung der Einkommensteuer das
Einkommensteueraufkommen erhöhen kann. </span><br />
</div>
<div style="text-align: center;">
<div class="separator" style="clear: both; text-align: center;">
<a href="https://www.blogger.com/blogger.g?blogID=8476761749021763994" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"></a><a href="https://www.blogger.com/blogger.g?blogID=8476761749021763994" imageanchor="1" style="clear: right; float: right; margin-bottom: 1em; margin-left: 1em;"></a><a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhOk0OXQRl8l6RYsYa_YBHgrsSco2Onho0Klhx_VRx9Hgt2y25y2YHTXsnx2lDdzjr6Od1p-QjfzhGDY7wMicVZbeJz_IkW5twNy16lgOnlcsnOe-xo9CB0VJFvDgYELVuGO-0hI1dyY8Zq/s1600/Laffer-Kurve.png" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><img border="0" data-original-height="130" data-original-width="193" height="269" src="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEhOk0OXQRl8l6RYsYa_YBHgrsSco2Onho0Klhx_VRx9Hgt2y25y2YHTXsnx2lDdzjr6Od1p-QjfzhGDY7wMicVZbeJz_IkW5twNy16lgOnlcsnOe-xo9CB0VJFvDgYELVuGO-0hI1dyY8Zq/s400/Laffer-Kurve.png" width="400" /></a></div>
</div>
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</div>
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<i style="mso-bidi-font-style: normal;"><span style="font-family: "arial" , "sans-serif"; font-size: 10.0pt;">Laffer-Kurve</span></i></div>
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<span style="font-family: "arial" , "sans-serif"; font-size: large;">Die Regierung
von Ronald Reagan berief sich im Rahmen ihrer Wirtschaftspolitik, der
sogenannten Reaganomics, auf die These und senkte die Einkommensteuern. In den
Folgejahren sanken die Einnahmen der öffentlichen Haushalte, und
Haushaltsdefizite stiegen an. Auch die Regierung von Margret Thatcher wurde von
dieser Denkweise beeinflusst.</span></div>
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<b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span style="font-family: "arial" , "sans-serif"; font-size: large;">Mehr zu
Narrativen</span></i></b></div>
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<span style="font-family: "arial" , "sans-serif"; font-size: large;">Es ist meist
Zufall, welche Stories viral gehen, d.h. epidemisch werden. Es passiert oft mittels
einer Mutation. Empirische Untersuchungen bestätigen, dass Narrative mehr überzeugen
als Statistiken. Aussagen der narrativen Wirtschaft müssen nicht wahr sein. Eine
Verbindung mit großen Namen oder mit patriotischen Gefühlen kann hilfreich
sein.</span></div>
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<span style="font-family: "arial" , "sans-serif"; font-size: large;">Die Verbreitung
von Narrativen erfolgt nicht systematisch. Sie ähnelt eher dem Verhalten einer Epidemie.
Die gesamte Wirtschaftsgeschichte wird geprägt von denjenigen Mutationen, die eine
erhöhte Ansteckungsrate und eine geringere Vergessenheitsrate haben. Narrative
müssen ähnlich wie ein Witz mit den richtigen Worten erzählt werden. Es besteht
kein Konsens, was die einflussreichsten Narrative sind. </span></div>
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<span style="font-family: "arial" , "sans-serif"; font-size: large;">Die
Angst vor der Automatisierung ist ein verbreitetes Narrativ seit es arbeitssparende
Dreschmaschinen gibt. Das war um 1870. Ein neuer Höhepunkt war zwischen 1974
und 2000, und nochmals stärker nach 2008. Das Narrativ der stets steigenden
Immobilienpreise ist ebenfalls alt. Es ging ab 2008 stark zurück. Narrative
über einen bevorstehenden Aktien-Crash erhielten 1921 und 1987 neue Nahrung.</span></div>
Bertal Dresenhttp://www.blogger.com/profile/01435152037884170636noreply@blogger.com3tag:blogger.com,1999:blog-8476761749021763994.post-5487218236278351262020-05-28T10:46:00.000+02:002020-05-28T11:20:39.366+02:00Von individueller Orientierung zur gesellschaftlichen Kultur<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-family: "arial" , "sans-serif"; font-size: 12.0pt;">Soziologen
und Sozialpsychologen äußern sich laufend zu den Einstellungen und Präferenzen
heutiger Gesellschaften. Dabei ist die Quelle ihrer Schlussfolgerungen nicht
immer offensichtlich. Peter Hiemann ist der Meinung, dass heute eine
anonymisierte Erhebung und Auswertungen individueller Daten zum Stand der
Technik gehören sollte. Die moderne Kommunikationstechnik hat hier ein enormes
Potential, dessen Nutzung den Möglichkeiten hinterherhinkt – aus welchen
Gründen auch immer. Als Beispiel sind Untersuchungen des Sozialpsychologen
Harald Welzer zitiert, der eher mit einem geisteswissenschaftlichen als mit
einem naturwissenschaftlichen Ansatz gesellschaftliche Fragestellungen
bearbeitet.</span></div>
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<span style="font-family: "arial" , "sans-serif"; font-size: 12.0pt;">Die
Ausnahmesituation, die der Corona-Virus verschafft, eröffnet weitere
Möglichkeiten, das Studium gesellschaftlicher Phänomene zu intensivieren.</span></div>
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<span style="font-family: "arial" , "sans-serif"; font-size: 12.0pt;">Hiemanns
neues Essay enthält eine ganze Reihe von Vorschlägen, wie sich aktuelle
gesellschaftliche Daten und Aussagen gewinnen lassen.<a href="http://www.aendres.de/texte/20_05_27_PH%20Gesellschaftliche%20Kultur_AE.pdf"> </a></span><a href="http://www.aendres.de/texte/20_05_27_PH%20Gesellschaftliche%20Kultur_AE.pdf"><span style="font-family: "arial" , "sans-serif";">Hier</span></a><span style="font-family: "arial" , "sans-serif"; font-size: 12.0pt;"><a href="http://www.aendres.de/texte/20_05_27_PH%20Gesellschaftliche%20Kultur_AE.pdf"> </a>können Sie sich
informieren.</span></div>
Bertal Dresenhttp://www.blogger.com/profile/01435152037884170636noreply@blogger.com1tag:blogger.com,1999:blog-8476761749021763994.post-17047826598956953882020-05-18T17:58:00.001+02:002020-05-19T15:12:37.699+02:00Was Karl Marx einst nur erträumte<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-family: "arial" , "sans-serif"; font-size: large;">Ludger
Eversmann (*1953) ist ein aus dem Münsterland stammender Wirtschaftsinformatiker,
der ein volles Berufsleben als SAP-Berater hinter sich hat. Im Alter von 51
Jahren hat er noch 2004 eine Dissertation vorlegt. Diese war aber – wie er selbst
zugibt − zu spät, um ihm noch eine akademische Laufbahn zu eröffnen. Von seinem
Buch <i style="mso-bidi-font-style: normal;">Die große Digitalmaschinerie</i> (2018,
298 Seiten) erwartete ich mir eine Auseinandersetzung mit aktueller Technik und
Wirtschaft. Ich war überrascht, wie sehr selbst Erwachsene noch zu ideologischen
Träumereien neigen. Das Buch gibt mir Gelegenheit, eine Reihe von Themen zu
adressieren, die in der fachlichen und politischen Diskussion eine Rolle
spielen</span></div>
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<b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span style="font-family: "arial" , "sans-serif"; font-size: large;">Marxsche
Utopien</span></i></b></div>
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<span style="font-family: "arial" , "sans-serif"; font-size: large;">Das
Buch erinnert an die Utopien, die einst Karl Marx verkündete. Der forderte
bekanntlich, dass ‚die Gesellschaft die allgemeine Produktion regelt und … eben
dadurch möglich macht, heute dies, morgen jenes zu tun, morgens zu jagen,
nachmittags zu fischen, abends Viehzucht zu treiben, nach dem Essen zu
kritisieren‘. [Da ich selbst weder fische noch jage, habe ich umso mehr Zeit,
um Kritiken zu schreiben – selbst über Marxisten.] Auch Eversmann sieht eine
solche Zukunft als nicht mehr sehr ferne an. Das Smart Home und die universelle
Weltfabrik liefern die Voraussetzungen dazu. Ein MIT-Professor namens Neil
Gershenfeld forscht auf diesem Gebiet (engl. <i style="mso-bidi-font-style: normal;">science of digital fabrication</i>). Auch Japans Shinzo Abe hat auf der
auf CeBit 2018 verkündet, dass die digitale Fabrik im Kommen sei, und zwar in
der Form einer universalen Weltfabrik.</span></div>
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<b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span style="font-family: "arial" , "sans-serif"; font-size: large;">Rolle
der Produktion</span></i></b></div>
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<br /></div>
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<span style="font-family: "arial" , "sans-serif"; font-size: large;">Aus
Sicht vieler Anhänger von Karl Marx muss die Produktion den Verbrauchern
gehören. Jede erfolgreiche Fabrik, die sich in Privathand befindet, würde nach
marxistischer Lehre ja unweigerlich zum Monopol führen. Das gilt erst recht von
einer digitalen Fabrik, die ja die Tendenz hat zu einer universellen Fabrik zu
werden. Im Idealfall lassen sich in ihr alle Produkte herstellen, die jemand
braucht, und zwar ab der Losgröße 1. Dabei sind nicht die Kosten und die
Perfektion das Entscheidende, sondern die Universalität. Als Beweis dafür, dass
sich die Industrie in diese Richtung bewegt, wird ein Patent erwähnt, das die
Firma Amazon im April 2017 erteilt bekam. Es handelt sich dabei um eine
Maschine zur vollautomatischen Herstellung von Bekleidung.</span></div>
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<br /></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-family: "arial" , "sans-serif"; font-size: large;">In der
Marxschen Denkweise spielte die Produktion stets die Hauptrolle. Planung,
Entwurf, Bewertung und Vertrieb kommen nicht vor. In der heutigen Welt jedoch
sind es diese vier Aktivitäten – von Marxisten meist als Design zusammengefasst
− die alles entscheidend sind. Für die Produktion bieten sich diverse Lösungen
an, die es früher nicht gab, nämlich die Herstellung durch Auslagerung (engl. <i>outsourcing</i>) in ein
Billiglohnland oder die Automatisierung. Die zurzeit wertvollste Firma der
Welt, Apple, ist ganz diesem neuen Prinzip verpflichtet. Sie hat die Produktion
zu 100% nach Asien ausgelagert. Noch fährt sie gut damit. Ikea arbeitet
ähnlich.</span></div>
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<br /></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-family: "arial" , "sans-serif"; font-size: large;">Natürlich
passt diese Entwicklung, zu der auch viele andere Unternehmen gelangt sind,
nicht in das Denkschema von Marx und seinen Epigonen. Es soll ja nicht sein,
was nicht sein darf. Man überlegt sich daher Alternativen. Auch Eversmann
meint, es sei ja die bessere Lösung, wenn die Fertigung dezentralisiert und vom
Staat oder Kommunen übernommen würde, und zwar möglichst in der Nähe des
Verbrauchs. Am allerbesten wäre es, der Konsument könnte auch die Produktion
übernehmen. Dass es etwas wie einen Weltmarkt gibt, den man als Exporteur
angehen könnte, scheint nicht in das Weltbild zu passen.</span></div>
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<br /></div>
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<b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span style="font-family: "arial" , "sans-serif"; font-size: large;">Herkunft
und Rolle der Designs</span></i></b></div>
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<br /></div>
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<span style="font-family: "arial" , "sans-serif"; font-size: large;">Was
weder Karl Marx noch seine Anhänger interessiert, ist die Frage, wo die Designs
herkommen. Dass es ohne Design meist auch keine Produktion gibt, wird zwar vielfach anerkannt. Man benutzt auch Bilder wie das der Schaffung des digitalen
Zwillings. Nur dass dabei Sozialpartner eine Rolle spielen, passt in kein
Schema. Vor allem wird nicht zur Kenntnis genommen, dass da mehr Menschen
involviert sein können, als nur die Unternehmens- oder Gründerpersönlichkeiten
eines Betriebs. Man könnte demnach den Eindruck gewinnen, dass es bei Firmen wie Apple
nur Unternehmer gäbe.</span></div>
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<br /></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span style="font-family: "arial" , "sans-serif"; font-size: large;">Fehlentwicklungen
des Kapitalismus</span></i></b></div>
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<br /></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-family: "arial" , "sans-serif"; font-size: large;">Der Wertekanon
des Westens sei vom Kapitalismus bestimmt. Dass es dem Sozialismus nicht
gelang, auf Dauer Fuß zu fassen, wird als Katastrophe angesehen. Der
Kapitalismus führe unweigerlich zu einer Zunahme sozialer Ungleichheit. Die
aktuelle Ursache dafür sei im Finanzkapitalismus zu finden. Die Unternehmen halten
sich mit Investitionen oder Lohnerhöhungen zurück, weil es billige Ostarbeiter
gibt. Der Lohndurchschnitt lag 2015 bei 32,6k Euro. Der Journalist Gunther
Tichy wirft der EZB davor, sie enteigne Sparer durch ihre Niedrigzinspolitik. </span></div>
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<br /></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-family: "arial" , "sans-serif"; font-size: large;">Die
Wirtschaft benutzt wenig Fremdkapital, sie basiert vorwiegend auf Eigenfinanzierung.
Staaten tilgen kaum Schulden. Sollte es nötig werden, stimulieren sie die Nachfrage
mit Helikoptergeld. Das von der Finanzwirtschaft in Form von Derivaten
gebundene Geld beträgt das 65-fache der Realwirtschaft. Das Privatvermögen der
Bürger entspricht dem 10-fachen der Staatsschulden. Die Neoliberalen treiben die
Kosten für staatliche Leistungen nach unten.</span></div>
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<br /></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span style="font-family: "arial" , "sans-serif"; font-size: large;">Verbliebene
Alternativen zum Kapitalismus</span></i></b></div>
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<br /></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-family: "arial" , "sans-serif"; font-size: large;">Der
Philosoph Jürgen Habermas finde, dass die Priesterklasse der Intellektuellen die
Wurzeln für gesellschaftliche Alternativen vorwiegend bei Karl Marx sieht. Nur
hielten sie den praktizierten Realsozialismus nicht für erstrebenswert.</span></div>
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<br /></div>
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<span style="font-family: "arial" , "sans-serif"; font-size: large;">Maschinen
sollten vergesellschaftet werden, damit Kommunisten ein Einkommen haben. Yochai
Benkler (Harvard) sieht als Zukunft eine Ökologie mit <i style="mso-bidi-font-style: normal;">Commons</i> und <i style="mso-bidi-font-style: normal;">Open Source</i>.
Die Erstellung von Wikipedia kann als Modell dienen (engl. peer-to-peer production).
Das Ideal, das Eversmann vorschwebt, ist eine Produktion am Ort des Verbrauchs,
und zwar mittels einer perfekten und universellen Maschine. Dass dies eine
digital gesteuerte Maschine ist, versteht sich von selbst.</span></div>
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<br /></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-family: "arial" , "sans-serif"; font-size: large;">Es gäbe
eine intrinsische sowie eine materielle Motivation, um gesellschaftliche Arbeit
zu leisten. Die Allmende, zu der jeder freiwillig Arbeitsleistung beiträgt, sei
in Verruf geraten. Sie verursacht Kosten, die von der Gemeinde aufgebracht
werden müssten. Dennoch besteht für sie ein selbstreferenzielles Interesse, vor
allem in der akademischen Welt.</span></div>
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<br /></div>
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<b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span style="font-family: "arial" , "sans-serif"; font-size: large;">Ideale
Produktion durch Konsumenten selbst</span></i></b></div>
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<br /></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-family: "arial" , "sans-serif"; font-size: large;">Bei der
Firma Henn GmbH in Pleinfeld (bei Nürnberg) hat Eversmann eine sehr
optimistische Darstellung der Fabrik der Zukunft gesehen. Es war eine digitale Stadtfabrik,
basierend auf einem oder mehreren 3D-Druckern. Wie von Gershenfeld postuliert, muss
die Fabrik der Zukunft vollkommen additiv arbeiten. Sie geht von der Nanoebene
aus und assembliert alle Produkte, und zwar völlig ohne Abtragen.</span></div>
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<br /></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-family: "arial" , "sans-serif"; font-size: large;">Für
einen sozialistischen Traum, wie er Eversmann ja vorschwebt, muss diese
Maschine in der öffentlicher Hand sein. Als digitale Universalmaschine fabriziert
sie alles, was man braucht. Hinzu kommt, dass sie sich in jedem Haushalt
befindet. So wie eine Waschmaschine oder Spülmaschine produziert sie für alle
Nutzer im Haushalt. Gegenstände wie Blumentöpfe, Fahrräder, Textilien,
Schuhwerk, Mobilar, Musik-CDs, Computer oder Rasenmäher brauche man nicht mehr
zu kaufen. Damit wäre endlich der Kapitalismus überwunden.</span></div>
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<br /></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-family: "arial" , "sans-serif"; font-size: large;">Einige
nicht gelöste Probleme hat die Sache. Die erste Frage – die oben bereits
anklang − heißt, wo kommen die Designs her. Selbst Open Source Designs sind
nicht kostenlos. Wer deckt Lager- und Transportkosten für die Grundmaterialien,
die ja bevorratet werden müssen? Da die Wertschöpfung der individuellen
Produktion (engl. <i style="mso-bidi-font-style: normal;">do-it-yourself
production</i>) gering ist, entfällt sie für die übliche Besteuerung. Welche
alternativen Quellen der Besteuerung gibt es?</span></div>
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<br /></div>
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<b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span style="font-family: "arial" , "sans-serif"; font-size: large;">Kurze Diskussion</span></i></b></div>
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<br /></div>
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<span style="font-family: "arial" , "sans-serif"; font-size: large;">Dass viele
privatisierte Betriebe scheiterten, ist bekannt. Sie betrafen Leistungen zur Infrastruktur,
Sozialdienste, Gesundheit, Verkehr und Wohnungen. Man kann diese Dienste der Daseinsfürsorge
nicht mit Gebrauchsgütern gleichsetzen. Das geht selbst in Kuba nicht, wo das
kommunistische Experiment ja andauert. Ob das neue China die richtigen
Antworten hat, bleibt abzuwarten.</span></div>
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<span style="font-family: "arial" , "sans-serif"; font-size: large;">Nach Karl
Marx haben auch John M. Keynes und Joseph Schumpeter Krisen des Kapitalismus
vorhergesehen. Er hat sie bisher alle überlebt – ja geradezu locker
weggesteckt. Der Marxismus dagegen hat einen Schiffbruch der Extra-Klasse
hingelegt. DDR und GULAG sind nur zwei markante Beispiele gewesen.</span></div>
Bertal Dresenhttp://www.blogger.com/profile/01435152037884170636noreply@blogger.com4tag:blogger.com,1999:blog-8476761749021763994.post-34470923943956036382020-05-11T17:02:00.000+02:002020-05-12T15:39:09.482+02:00Ethik, Moral und Recht als Basis von Wertvorstellungen (von Peter Hiemann)<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><span style="font-family: "arial" , "sans-serif"; font-size: large; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: DE;"><span style="font-family: "arial" , "helvetica" , sans-serif;">Wenn mein Freund Peter Hiemann in diesem Blog das Wort ergreift, geht es sehr oft um Gundsätzliches.</span> Beim letzten Mal beschrieb er Denk- und Verhaltensweisen von Menschen in einer Situation, wie sie im Moment von dem Corona-Virus
ausgelöst wird.</span></span></span></span></span><br />
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br /></span></span>
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><span style="font-family: "arial" , "sans-serif"; font-size: large; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: DE;">Der heutige Beitrag befasst sich mit der Frage, welche Rolle Ethik, Moral und Recht bei menschlichen Entscheidungen spielen. Zur Illustration bemüht Hiemann einen Sozialpsychologen (Erich Fromm), eine Dichterin (Marie von Ebner-Eschenbach) und eine Fernsehjournalistin (Katrin Sandmann). Gleichsam als Überraschungsgäste erscheinen Karl Marx und George Soros. Dass man beide für geradezu verwandte Ideen zum Werben bekommt, ist schon erstaunlich. Hiemann verrät auch unbekannte Details über Karl Marx, so etwa seine Aussage, dass die Deutschen die blödeste Nation (engl.: <i>silliest nation</i>) unter dem Sonnenlicht wären, hätten sie nicht ihn (Marx) hervorgebracht. Selbst das kann uns Trierer nicht mit diesem unserem umstrittenen Landsmann versöhnen.</span></span></span></span></span></div>
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<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><span style="font-size: small;"><br /></span></span></span></span></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><span style="font-family: "arial" , "sans-serif"; font-size: large; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: DE;">Dieses und viel mehr erfahren Sie, wenn Sie <a href="http://www.aendres.de/texte/20_05_10_PH%20Bedeutung%20Wertvorstellungen_AE.pdf">hier</a> klicken.
Viel Spaß beim Lesen.</span></span></span></span></span></div>
Bertal Dresenhttp://www.blogger.com/profile/01435152037884170636noreply@blogger.com0tag:blogger.com,1999:blog-8476761749021763994.post-64324919053281478742020-05-09T18:08:00.001+02:002020-05-10T11:20:05.273+02:00Ende des Zweiten Weltkriegs vor 75 Jahren<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-family: "arial" , "sans-serif"; font-size: large;">Am 8.
Mai diesen Jahres erinnerten sich mehrere Altersgenossen an die Ereignisse,
durch die der Zweite Weltkrieg beendet wurde. Auch ich erhielt einen Anruf
einer etwa gleichaltrigen früheren Nachbarstochter, die sich mit mir
austauschen wollte. Da ich diese Ereignisse, soweit sie mein Heimatdorf
Niederweis betrafen, schriftlich festgehalten hatte, konnte ich den Wunsch
erfüllen. Der 8.5.1945 war der Tag, an dem der im fernen Berlin ausgehandelte
Waffenstillstandsvertrag in Kraft trat. Die Kampfhandlungen waren bereits gut
zwei Monate vorher über meine Heimat im deutsch-luxemburgischen Grenzgebiet
hinweg gegangen. Ich zitiere aus dem entsprechenden Band meiner
Heimatgeschichte [1].</span></div>
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<span style="font-size: small;"><br /></span></div>
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<span style="font-family: "arial" , "sans-serif"; font-size: small;">Abgesehen
von einzelnen Angriffen amerikanischer Jagdbomber (so genannter Jabos) wurde
unser Dorf nicht unmittelbar in das Kriegsgeschehen einbezogen bis zum Herbst
1944. Im Juli waren die Alliierten an der französischen Atlantikküste gelandet.
Bis September hatten sie die deutsch-luxemburgische Grenze erreicht. Das war
weniger als 10 km von Niederweis entfernt. Hier legten sie eine Pause ein, um
den Nachschub aufzubauen. Für die nächsten sechs Monate lebten die Einwohner
des Dorfes in der Frontzone eines Stellungskrieges. Auf den Höhen hinter
Echternach, bei Osweiler und Berdorf, hatten die Amerikaner ihre Artillerie
aufgestellt. Sie sandten jeden Tag ihre Grüße in Form einiger Granatsalven. Die
Dauer des Beschusses hatte zur Folge, dass kaum ein Haus verschont blieb.
Nachts schlief man im Kartoffelkeller. Es gab mehrere Tote unter der
Zivilbevölkerung, darunter zwei Schulkinder. Kurz vor Weihnachten 1944 gab es
nochmals Trubel. Die deutsche Heeresleitung hatte beschlossen, einen
Gegenangriff zu wagen. Die Operation erhielt den Namen Ardennen- oder
Rundtstedt-Offensive. Der Schwerpunkt des Angriffs lag nämlich etwas nördlich
im südlichen Teil Belgiens; der Oberkommandierende auf deutscher Seite war
der General Gerd von Rundtstedt. Es wurden nicht nur die zurück gewichenen
Truppenteile neu formiert, sondern auch zusätzliche Reserven mobilisiert. Bei
diesen handelte es sich insbesondere um Hitlerjungen und Volkssturmmänner.
Mitte Januar war der Gegenangriff in sich zusammengebrochen.</span></div>
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<span style="font-size: small;"><br /></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-family: "arial" , "sans-serif"; font-size: small;">Der
zweite Weltkrieg endete für Niederweis am 27. Februar 1945. Das war der Tag, an
dem amerikanische Truppen das Dorf Niederweis in Besitz nahmen. Um die beiden
Bunker in der Nähe von Irrel zu umgehen, erfolgte der Vorstoß von Ferschweiler
über Holsthum nach Alsdorf. Wie sich später herausstellte, wäre diese
Zangenbewegung um die beiden Bunker herum nicht nötig gewesen. Die Besatzung
verfügte nämlich kaum über Munition. Die Amerikaner durchsuchten als erstes
sämtliche Häuser, während alle Bewohner des Dorfes sich für mehrere Stunden in
den Ehrenhof des Schlosses begeben mussten. Danach wurden die bisher auf 50
Häuser verteilten Einwohner in fünf Häuser in der Dorfmitte eingewiesen. So
blieb es für drei Wochen. Während einige der Bauernbetriebe recht große
Gebäudeschäden reparieren mussten, hatte das Niederweiser Schloss die
Kriegswirren relativ unbeschadet überstanden. Amerikanische Soldaten, die nach
der Eroberung des Dorfes im Schloss wohnten, haben jedoch das Inventar größtenteils
zerstört.</span></div>
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<br /></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-size: large;"><b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span style="font-family: "arial" , "sans-serif"; font-size: large;">Eindruck
der Besatzer</span></i></b></span></div>
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<span style="font-size: large;"><br /></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-family: "arial" , "sans-serif"; font-size: large;">Vergleicht
man dieses Geschehen mit dem, was sich anderswo oder auch später bei solchen
Gelegenheiten abspielte, muss man die Amis von 1945 als echte Gentlemen
bezeichnen. Der Eindruck, den sie auf mich machten, war ausgesprochen positiv. Nicht
nur waren sie der Zivilbevölkerung gegenüber rücksichtsvoll, sie waren echt
großzügig uns Kindern gegenüber. Meine Mutter, die damals vorübergehend
gehbehindert war, bekam einen Stuhl vor unsere Haustür gesetzt, von wo aus sie
die Ereignisse im Schlosshof wenigstens im Verlauf verfolgen konnte. In den
Tagen danach erhielten mehrere Kinder des Dorfes Kaugummis und Schokolade. Erinnern
kann ich mich an einen Afroamerikaner, der sich in angetrunkenem Zustand
daneben benahm. Er belästigte eine junge Frau, die mit zu unserer Hausgemeinschaft
gehörte. Mein Vater wies ihn zu Recht und er zog von dannen. </span></div>
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<span style="font-size: large;"><br /></span></div>
<div class="MsoNormal" style="line-height: normal; margin-bottom: .0001pt; margin-bottom: 0cm;">
<span style="font-family: "arial" , "sans-serif"; font-size: large;">Mehr
als alles andere beeindruckte mich die Nonchalance, mit der Gerätschaften und
Fahrzeuge von den Soldaten behandelt wurden. Die Waffen hingen locker herum.
Die Jeeps standen für jede noch so kurze Strecke zur Verfügung, egal ob für
einen, zwei oder mehr Mann. Außerdem zogen die GIs Kabel von jedem Ort aus, wo
sich jemand aufhielt, und man quasselte ununterbrochen ins Telefon. Als die
Amis später von Franzosen und danach von Luxemburgern abgelöst wurden, hatten
wir es nicht nur mit einem anderen Menschenschlag zu tun, sondern auch mit
primitiverer maschineller Ausstattung und Technik.</span></div>
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<span style="font-family: "arial" , "sans-serif"; font-size: large;">Als mir
während meines Studiums die Möglichkeit angeboten wurde, in den USA zu
studieren, griff ich sofort zu. Als ich nach einem Jahr zurückkam, wunderten
sich einige Leute, dass ich überhaupt zurückkehrte. Bei Auswanderern war dies
nämlich kein gutes Zeichen. Man war nicht erfolgreich gewesen. Ich erklärte,
dass es mir derzeit primär um einen Studienabschluss ginge. Aufgrund meiner
Vorgeschichte war dieser in Deutschland für mich viel schneller zu erreichen
als in den USA.</span></div>
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<span style="font-size: large;"><b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span style="font-family: "arial" , "sans-serif"; font-size: large;">Berufliche
Re-Orientierung</span></i></b></span></div>
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<span style="font-family: "arial" , "sans-serif"; font-size: large;">Das
Jahr als Austauschstudent verbrachte ich an der Ohio State University in Columbus,
Ohio. Ich war von August 1955 bis Oktober 1956 dort. Für meine berufliche Laufbahn
entscheidend wurde ein Programmierkurs für das IBM Rechnersystem 650, den ich
in Columbus absolvierte. Er bewirkte, dass mir der Inhaber eines
Geodäsie-Lehrstuhls an der Universität Bonn ein Dissertationsthema anbot. Das
zunächst recht vage gefasste Thema lautete: ‚Geodätische Ausgleichsrechnungen
mittels elektronischer Rechenanlagen‘. Um meine bis dahin rein theoretischen
Kenntnisse der Programmierung um praktische Erfahrungen zu ergänzen, bewarb ich
mich um eine 6-monatige Praktikantenstelle im IBM 650 Rechenzentrum in Sindelfingen.
Nach drei Monaten bot man mir eine Festanstellung an. Aus den sechs Monaten IBM
wurden 35 Jahre. Aus dem Geodät wurde ein Informatiker.</span></div>
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<span style="font-size: large;"><b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span style="font-family: "arial" , "sans-serif"; font-size: large;">Westorientierung
oder USA-Verbundenheit</span></i></b></span></div>
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<span style="font-size: large;"><br /></span></div>
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<span style="font-family: "arial" , "sans-serif"; font-size: large;">Als Erstes
lernte ich, dass das I in IBM nicht als ‚Ei‘ gesprochen werden dürfe. Wir seien
hier nicht bei der IBM Schweiz. Die IBM Deutschland sei schließlich die Nachfolgerin
der Deutschen Hollerith GmbH. Wie in [2] ausgeführt, war ich zwischen November 1957
und Ende 1960 Mitarbeiter des Bereichs Rechenzentren. Die Einsatzorte waren Sindelfingen
und Düsseldorf. Die Jahre von 1961 bis 1992, also 33 Jahre lang, gehörte ich
zum Entwicklungsbereich, dessen Hauptsitz auch heute noch das Labor in Böblingen
ist.</span></div>
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<span style="font-family: "arial" , "sans-serif"; font-size: large;">IBM hat
eine Entwicklung vorweg genommen, wie sie heute für Firmen die Amazon, Apple, Google
und SAP typisch ist. Nicht ein einzelnes Labor oder eine einzelne Lokation
bestimmt den Weg der Firma. Dutzende Labors liefern im Verbund die Kompetenz,
die das Unternehmen benötigt. Bis 1989 handelte es sich dabei primär um Lokationen
in den USA, Westeuropa, Indien und Japan. Nach 1989 sind Lokationen in Osteuropa,
dem Nahen Osten, Südafrika, China und Vietnam dazugekommen. Die Orientierung
auf den Westen führte in der Vergangenheit zu einer mehr oder weniger starken USA-Verbundenheit.
Diese tritt immer mehr in den Hintergrund. Damit verschwindet auch die Weltordnung,
die sich vor 75 Jahren herausbildete.</span></div>
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<span style="font-size: large;"><b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span style="font-family: "arial" , "sans-serif"; font-size: large;">Neue Vernetzungen</span></i></b></span></div>
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<span style="font-family: "arial" , "sans-serif"; font-size: large;">Lange Jahre
hieß der Ratschlag, den Firmengründer bekamen, um erfolgreich zu sein, es führe
kein Weg an den USA vorbei. Nur dort sei der Markt groß genug, um Neustarter zu
tolerieren und zu testen. ‚<i style="mso-bidi-font-style: normal;">If you make it
there, you‘ll make it everywhere</i>‘. Dieser Satz galt nicht nur für die Unterhaltungsbranche
und für New York City. In den letzten Jahren bieten sich immer mehr Alternativen
zu einer strikten Orientierung in Richtung USA an. Viele der aus Deutschland
stammenden Technologie-Führer haben Partner in Israel oder China. Im Grunde
findet ein Reifeprozess statt. Viele Leute fragen, ob dieser Prozess durch Ereignisse
wie die Corona-Pandemie beschleunigt oder gehemmt wird.</span></div>
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<span style="font-size: large;"><b style="mso-bidi-font-weight: normal;"><i style="mso-bidi-font-style: normal;"><span style="font-family: "arial" , "sans-serif"; font-size: 12.0pt;">Referenzen</span></i></b></span></div>
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<span style="font-family: "arial" , "sans-serif"; font-size: small;">1.
Endres, A.: Geschichten aus der Eifelheimat, Band 1, 2008 (S. 87ff)<br />
2. Endres, A.: Die IBM Laboratorien Böblingen: System-Software-Entwicklung,
2001</span></div>
Bertal Dresenhttp://www.blogger.com/profile/01435152037884170636noreply@blogger.com1tag:blogger.com,1999:blog-8476761749021763994.post-47001924946013645582020-05-01T12:09:00.000+02:002020-05-21T09:30:57.375+02:00Erinnerungen an Gerhard Goos (1937-2020)<div class="MsoNormal" style="line-height: normal; margin-bottom: 0cm; text-align: left;">
<span style="font-family: "arial" , "sans-serif"; font-size: large;">Am 20.4.2020 verstarb Gerhard Goos. Er wurde 82 Jahre alt. Den Lesern
dieses Blogs war er vertraut durch ein </span><a href="http://bertalsblog.blogspot.com/2011/09/gerhard-goos-uber-informatik-forschung.html"><span style="font-family: "arial" , "sans-serif"; font-size: large; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: DE; mso-font-kerning: large;">Interview aus
dem Jahre 2011</span></a><span style="font-family: "arial" , "sans-serif"; font-size: large;">. Goos und ich kannten uns seit dem Oktober 1968, als wir beide an der
berühmten NATO-Software-Konferenz in Garmisch teilnahmen. Er war Mitarbeiter am
Münchner Lehrstuhl von F.L. Bauer, ich war Abteilungsleiter bei IBM in Böblingen.
Von da ab trafen wir uns immer wieder.</span><br />
<br />
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;">Unsere Zusammenarbeit erfolgte auf mehreren Ebenen. Häufig, jedoch
eher locker waren die Treffen innerhalb der Gesellschaft für Informatik
(GI).
Lange Zeit leitete ich mit ihm zusammen die Fachgruppe Software Engineering.
Die Treffen wurden von uns gemeinsam vorbereitet und durchgeführt. </span></span><br />
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"> </span></span>
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br />Sehr intensiv war unsere Zusammenarbeit über 10-15 Jahre hinweg, als
wir beide von der Bundesregierung damit betraut waren, den Ausbau der
Informatik-Studiengänge in Deutschland flächenmäßig zu verbreitern und
finanziell und personalmäßig auf solide Füße zu stellen. Das Projekt nannte
sich Überregionales Forschungsprogramm (ÜRF) Informatik. Gerhard Goos
leitete das Gremium, das die Regierung hinsichtlich der Mittelvergabe beriet. Ich war sein Stellvertreter. </span></span>
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"></span></span><br />
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"><br />Eine dritte Ebene der Zusammenarbeit entwickelte sich in gemeinsamen
Aktivitäten meines Arbeitgebers, dem IBM Labor Böblingen, und der
Universität (damals noch TH) Karlsruhe. Ich verbrachte jedes Jahr 4-6
Arbeitstage in Karlsruhe, meist zusammen mit dem Entwicklungs- und
Technikchef der Firma, Prof. Karl Ganzhorn. </span></span><br />
<span style="font-size: large;"><span style="font-family: "arial" , "helvetica" , sans-serif;"> </span></span>
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<span style="font-family: "arial" , "sans-serif"; font-size: large; mso-fareast-font-family: "Times New Roman"; mso-fareast-language: DE; mso-font-kerning: large;">Die Kontakte zwischen Goos und mir profitierten davon, dass wir in vielen
Dingen ganz ähnliche Einschätzungen und Präferenzen hatten. So gaben wir den
Fachkollegen Recht, die sich darum bemühten die Informatik primär technisch
und wirtschaftlich weiterzubringen und dabei soziale und politische Ziele nicht ganz außer Acht
ließen. Wir hatten nicht selten Übereinstimmung auch in politischen und
gesellschaftlichen Fragen, und tauschten uns aus. Lediglich der Sport blieb
außen vor. Wie bekannt, war Goos ein sehr aktiver Segler, den es jeden Sommer
auf die Ostsee zog. Ich reiste lieber per Flugzeug oder per Kreuzfahrtschiff um
die ganze Welt.</span></div>
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<span style="font-size: small;"><i style="mso-bidi-font-style: normal;"><span style="font-family: "arial" , "sans-serif"; font-size: medium;">Goos 2008 in
Sindelfingen</span></i></span></div>
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<span style="font-family: "arial" , "sans-serif"; font-size: large;">Goos und ich pflegten auch in den letzten 10-15 Jahren weiterhin regen Kontakt.
Seine Gattin und er beehrten mich mit ihrer Teilnahme an den Feiern zu meinem
70. und 75. Geburtstag hier in Sindelfingen. Gerne erinnere ich mich an unser
Treffen vor einigen Jahren während meines Aufenthalts in Baden-Baden. Mehrmals
im Jahr erhielt ich lange Mails aus Karlsruhe oder wir führten ein
ausführliches Telefonat.</span></div>
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<span style="font-family: "arial" , "sans-serif"; font-size: large;">Ich werde Gerhard Goos wegen seiner stets anregenden Unterhaltungen und
seiner zugehenden Art sehr vermissen. Es verbleibt mir die Erinnerung an einen
äußerst klugen, vorbildlichen und hochgeschätzten Kollegen.</span><br />
<br />
<span style="font-family: "arial" , "sans-serif"; font-size: large;">PS: Hinweisen möchte ich auf die Gedenk-Plattform, wo viele seiner Schüler, Bekannten, Freunde und Kollegen einen Nachruf hinterlassen haben. Es ist der Link:</span><br />
<br />
<a href="https://trauerhilfe-stier-karlsruhe.gemeinsam-trauern.net/Begleiten/gerhard-goos/Kerzen"><span style="font-family: "arial" , "sans-serif"; font-size: large;">https://trauerhilfe-stier-karlsruhe.gemeinsam-trauern.net/Begleiten/gerhard-goos/Kerzen</span></a><br />
<span style="font-family: "arial" , "sans-serif"; font-size: large;"><br /></span></div>
Bertal Dresenhttp://www.blogger.com/profile/01435152037884170636noreply@blogger.com0