- Autor(in)
- Referenz
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1 Lange, O., "Ganzheit und Entwicklung in kybernetischer Sicht", Berlin 1966.
2 Pompe, W., u. K. Voss, Ann. Physik 19 (1967) 253.
3 Pompe, W., u. K. Voss, Ann. Physik 19 (1967) 261.
4 Zwanzig, R., J. chem. Physics 33 (1960) 1338.
5 Pompe, W., Ann. Physik 20 (1968) 326.
6 Fuliński, A., u. W. J. Kramarczyk, Physica, im Druck.
7 Pompe, W., u. K. Voss, Ann. Physik 18 (1966) 194.
8 Smirnow, W. I., "Lehrgang der höheren Mathematik. V", Abschn. 97, Berlin 1962.
- Seitenbereich
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0167 - 0173
- Zusammenfsg.
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An exact markovian master equation for the smoothed classical distribution function &fmacr; = <I>Mf</I> is derived using the existence of the operator [1 + <I>M</I>(-1 + exp (-<I>it L</I>))]<sup>-1</sup>. It is shown that according to the information theory &fmacr;<sub>0</sub> = 0 ("initial random phase approximation") should be taken. Then in the first order of a perturbation approach the master equation given by POMPE and VOSS can be derived in the long time approximation.
- Artikel-Typen
- Forschungsartikel