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Auteurs principaux: Lee, Sangyun, Lee, Jae Sung, Park, Jong-Min
Format: Preprint
Publié: 2024
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Accès en ligne:https://arxiv.org/abs/2406.17966
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author Lee, Sangyun
Lee, Jae Sung
Park, Jong-Min
author_facet Lee, Sangyun
Lee, Jae Sung
Park, Jong-Min
contents As a fundamental thermodynamic principle, speed limits reveal the lower bound of entropy production (EP) required for a system to transition from a given initial state to a final state. While various speed limits have been developed for continuous-time Markov processes, their application to discrete-time Markov chains remains unexplored. In this study, we investigate the speed limits in discrete-time Markov chains, focusing on two types of EP commonly used to measure the irreversibility of a discrete-time process: time-reversed EP and time-backward EP. We find that time-reversed EP satisfies the speed limit for the continuous-time Markov processes, whereas time-backward EP does not. Additionally, for time-reversed EP, we derive practical speed limits applicable to systems driven by cyclic protocols or with unidirectional transitions, where conventional speed limits become meaningless or invalid. We show that these relations also hold for continuous-time Markov processes by taking the time-continuum limit of our results. Finally, we validate our findings through several examples.
format Preprint
id arxiv_https___arxiv_org_abs_2406_17966
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Discrete-time thermodynamic speed limit
Lee, Sangyun
Lee, Jae Sung
Park, Jong-Min
Statistical Mechanics
As a fundamental thermodynamic principle, speed limits reveal the lower bound of entropy production (EP) required for a system to transition from a given initial state to a final state. While various speed limits have been developed for continuous-time Markov processes, their application to discrete-time Markov chains remains unexplored. In this study, we investigate the speed limits in discrete-time Markov chains, focusing on two types of EP commonly used to measure the irreversibility of a discrete-time process: time-reversed EP and time-backward EP. We find that time-reversed EP satisfies the speed limit for the continuous-time Markov processes, whereas time-backward EP does not. Additionally, for time-reversed EP, we derive practical speed limits applicable to systems driven by cyclic protocols or with unidirectional transitions, where conventional speed limits become meaningless or invalid. We show that these relations also hold for continuous-time Markov processes by taking the time-continuum limit of our results. Finally, we validate our findings through several examples.
title Discrete-time thermodynamic speed limit
topic Statistical Mechanics
url https://arxiv.org/abs/2406.17966