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Teoreticheskaya i Matematicheskaya Fizika, 1971, Volume 7, Number 3, Pages 372–394
(Mi tmf4319)
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This article is cited in 29 scientific papers (total in 29 papers)
Equivalence of various methods in the statistical mechanics of irreversible processes
D. N. Zubarev, V. P. Kalashnikov
Abstract:
It is shown that the nonequilbrium statistical methods proposed in the authors investigations [1, 3] are equivalent in the sense that they lead to the same transport equations for macroscopic
nonequilibrium systems if the flux operators satisfy conditions of correlation weakening.
It is shown that the Robertson procedure for constructing the nonequilibrium statistical
operator [4] is equivalent to the procedure of [3] if one chooses the lower limit of integration
in Robertson's equation for the nonequilibrium statistical operator to be $t_0=-\infty$ and not $t_0=0$ and one introduces an infinitesimally small damping. It is shown that the Peletminskii–Yatsenko procedure for constructing the nonequilibrium statistical operator [5] corresponds to
the procedure of [3] if memory effects are ignored in the latter. However, if one alters the
boundary condition in the method of [5], replacing the “mixing” condition by evolution along
the phase trajectory, the method of [5] becomes equivalent to the other methods [1–4].
Received: 03.12.1970
Citation:
D. N. Zubarev, V. P. Kalashnikov, “Equivalence of various methods in the statistical mechanics of irreversible processes”, TMF, 7:3 (1971), 372–394; Theoret. and Math. Phys., 7:3 (1971), 600–616
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https://www.mathnet.ru/eng/tmf4319 https://www.mathnet.ru/eng/tmf/v7/i3/p372
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Abstract page: | 416 | Full-text PDF : | 141 | References: | 39 | First page: | 1 |
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