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Autor principal: Xu, Chuang
Formato: Preprint
Publicado: 2026
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Acceso en línea:https://arxiv.org/abs/2601.00176
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author Xu, Chuang
author_facet Xu, Chuang
contents Chemical reaction networks are a widely accepted modeling framework for diverse science phenomena stemming from all disciplines of science, such as biochemistry, ecology, epidemiology, social and political science. In this paper we prove that every first order endotactic stochastic mass-action reaction system (SMART) is essential (i.e., every state in the state space is within a closed communicating class of the underlying continuous time Markov chain model) and is exponentially ergodic. The proof is based on a recent result on first order endotactic reaction networks in a companion paper [C.X., First order endotactic reaction networks. arXiv:2409.01598v2]. Besides, we show that a stochastic reaction system (of possibly nonlinear propensities) dominated by a first order endotactic SMART is exponentially erogdic. To demonstrate the applicability of results, we provide various examples of higher order SMART, including e.g., (1) SMART with a first order endotactic asymptotic limit as well as, (2) joint of translations of first order endotactic SMART.
format Preprint
id arxiv_https___arxiv_org_abs_2601_00176
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Exponential ergodicity of first order endotactic stochastic reaction systems
Xu, Chuang
Probability
37N25, 60J27, 97C42
Chemical reaction networks are a widely accepted modeling framework for diverse science phenomena stemming from all disciplines of science, such as biochemistry, ecology, epidemiology, social and political science. In this paper we prove that every first order endotactic stochastic mass-action reaction system (SMART) is essential (i.e., every state in the state space is within a closed communicating class of the underlying continuous time Markov chain model) and is exponentially ergodic. The proof is based on a recent result on first order endotactic reaction networks in a companion paper [C.X., First order endotactic reaction networks. arXiv:2409.01598v2]. Besides, we show that a stochastic reaction system (of possibly nonlinear propensities) dominated by a first order endotactic SMART is exponentially erogdic. To demonstrate the applicability of results, we provide various examples of higher order SMART, including e.g., (1) SMART with a first order endotactic asymptotic limit as well as, (2) joint of translations of first order endotactic SMART.
title Exponential ergodicity of first order endotactic stochastic reaction systems
topic Probability
37N25, 60J27, 97C42
url https://arxiv.org/abs/2601.00176