Quantum and classical approaches in statistical physics: some basic inequalities
Abstract
We present some basic inequalities between the classical and quantum values of free energy, entropy and mean energy. We investigate the transition from the deterministic case (classical mechanics) to the probabilistic case (quantum mechanics). In the first part of the paper, we assume that the reduced Planck constant , the absolute temperature , the frequency of an oscillator , and the degree of freedom of a system are fixed. This approach to the problem of comparing quantum and classical mechanics is new (see [35]--[37]). In the second part of the paper, we simultaneously derive the semiclassical limits for four cases, that is, for , , , and . We note that only the case is usually considered in quantum mechanics (see [21]). The cases and in quantum mechanics were initially studied by M. Planck and by A. Einstein, respectively.
Cite
@article{arxiv.2006.11329,
title = {Quantum and classical approaches in statistical physics: some basic inequalities},
author = {Lev Sakhnovich},
journal= {arXiv preprint arXiv:2006.11329},
year = {2022}
}
Comments
We develop and generalize our previous results from the book "Levy processes, integral equations, statistical physics: connections and interactions" and earlier preprints arXiv:1105.4633 and arXiv:1105.0208. In the fourth version of the paper, the first part is improved and the second part (on quasi-classical limits) is added. The game theoretic interpretation is modified and improved as well