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Main Authors: Hilder, Bastian, van Meurs, Patrick, Sharma, Upanshu
Format: Preprint
Published: 2026
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Online Access:https://arxiv.org/abs/2602.17579
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author Hilder, Bastian
van Meurs, Patrick
Sharma, Upanshu
author_facet Hilder, Bastian
van Meurs, Patrick
Sharma, Upanshu
contents Functional inequalities such as the Poincaré and log-Sobolev inequalities quantify convergence to equilibrium in continuous-time Markov chains by linking generator properties to variance and entropy decay. However, many applications, including multiscale and non-reversible dynamics, require analysing probability measures that are not at equilibrium, where the classical theory tied to steady states no longer applies. We introduce generalised versions of these inequalities for arbitrary positive measures on a finite state space, retaining key structural properties of their classical counterparts. In particular, we prove continuity of the associated constants with respect to the reference measure and establish explicit positive lower bounds. As an application, we derive quantitative coarse-graining error estimates for non-reversible Markov chains, both with and without explicit scale separation, and propose a quantitative criterion for assessing the quality of coarse-graining maps.
format Preprint
id arxiv_https___arxiv_org_abs_2602_17579
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Non-equilibrium functional inequalities for finite Markov chains
Hilder, Bastian
van Meurs, Patrick
Sharma, Upanshu
Probability
Functional Analysis
39B05, 39B62, 60J27, 60J28, 34C29, 34E13
Functional inequalities such as the Poincaré and log-Sobolev inequalities quantify convergence to equilibrium in continuous-time Markov chains by linking generator properties to variance and entropy decay. However, many applications, including multiscale and non-reversible dynamics, require analysing probability measures that are not at equilibrium, where the classical theory tied to steady states no longer applies. We introduce generalised versions of these inequalities for arbitrary positive measures on a finite state space, retaining key structural properties of their classical counterparts. In particular, we prove continuity of the associated constants with respect to the reference measure and establish explicit positive lower bounds. As an application, we derive quantitative coarse-graining error estimates for non-reversible Markov chains, both with and without explicit scale separation, and propose a quantitative criterion for assessing the quality of coarse-graining maps.
title Non-equilibrium functional inequalities for finite Markov chains
topic Probability
Functional Analysis
39B05, 39B62, 60J27, 60J28, 34C29, 34E13
url https://arxiv.org/abs/2602.17579