The nonequilibrium statistical operator with finite duration of the   present time moment

V.V. Ryazanov

arXiv:0711.0124·cond-mat.stat-mech·November 2, 2007

The nonequilibrium statistical operator with finite duration of the present time moment

V.V. Ryazanov

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TL;DR

This paper proposes a modification to the nonequilibrium statistical operator method by incorporating the finite duration of the present time, linked to the average Lyapunov time, to better account for a system's history.

Contribution

It introduces a new approach that considers the finite duration of the present moment in nonequilibrium statistical mechanics, based on Lyapunov time.

Findings

01

Accounts for the influence of the finite present time on system history

02

Links the present time duration to the average Lyapunov time

03

Enhances the modeling of nonequilibrium systems

Abstract

The method of the nonequilibrium statistical operator accounts for the history of a system, influence of its past history to its present state. It is suggested to take into account the finite duration of the present time moment, which according to I.Prigogine's results, is equal to the average Lyapunov time.

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Taxonomy

TopicsStatistical Mechanics and Entropy · Advanced Thermodynamics and Statistical Mechanics · Opinion Dynamics and Social Influence