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Main Authors: Yuge, Koretaka, Sakamoto, Yutaro
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2403.16383
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author Yuge, Koretaka
Sakamoto, Yutaro
author_facet Yuge, Koretaka
Sakamoto, Yutaro
contents For classical discrete systems under constant composition (specifically substitutional alloys), canonical average acts as a map from a set of many-body interatomic interactions to a set of configuration in thermodynamic equilibrium, which is generally nonlinear. In terms of the configurational geometry (i.e., information about configurational density of states), the nonlinearity has been measured as special vector on configuration space, which is extended to Kullback-Leibler (KL) divergence on statistical manifold. Although they successfully provide new insight into how the geometry of lattice characterizes the nonlinearity, their application is essentially restricted to thermodynamic equilibrium. Based on the resource theory (especially, thermo-majorization), we here extend the applicability of the nonlinearity to nonequilibrium states obtained through single-shot work on Gibbs state. We reveal that the extended nonlinearity for nonequilibrium state is bounded from upper and lower by the information about one of the optimal Renyi divergences for equilibrium states in between practical and linear systems, and temperature and work.
format Preprint
id arxiv_https___arxiv_org_abs_2403_16383
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Nonequilibrium Bounds for Canonical Nonlinearity Under Single-Shot Work
Yuge, Koretaka
Sakamoto, Yutaro
Statistical Mechanics
For classical discrete systems under constant composition (specifically substitutional alloys), canonical average acts as a map from a set of many-body interatomic interactions to a set of configuration in thermodynamic equilibrium, which is generally nonlinear. In terms of the configurational geometry (i.e., information about configurational density of states), the nonlinearity has been measured as special vector on configuration space, which is extended to Kullback-Leibler (KL) divergence on statistical manifold. Although they successfully provide new insight into how the geometry of lattice characterizes the nonlinearity, their application is essentially restricted to thermodynamic equilibrium. Based on the resource theory (especially, thermo-majorization), we here extend the applicability of the nonlinearity to nonequilibrium states obtained through single-shot work on Gibbs state. We reveal that the extended nonlinearity for nonequilibrium state is bounded from upper and lower by the information about one of the optimal Renyi divergences for equilibrium states in between practical and linear systems, and temperature and work.
title Nonequilibrium Bounds for Canonical Nonlinearity Under Single-Shot Work
topic Statistical Mechanics
url https://arxiv.org/abs/2403.16383