Annotation
An equation chain has been solved for correlation functions on the basis that the correlation integrals are small; the first approximation is obtained for a homogeneous system. The result is the same as the expression derived by Bogolyubov by expanding the distributions as series in terms of a small parameter, while for a crystal it is the same as the analogous expression for the binary distribution.
© 2016 Publisher M.V.Lomonosov Moscow State University
Authors
I.P. Bazarov and P.N. Nikolaev
Кафедра квантовой статистики
Кафедра квантовой статистики
Science News of the Faculty of Physics, Lomonosov Moscow State University
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