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Main Authors: Daletskii, Alexei, Finkelshtein, Dmitri
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2509.25427
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author Daletskii, Alexei
Finkelshtein, Dmitri
author_facet Daletskii, Alexei
Finkelshtein, Dmitri
contents We consider an infinite locally finite system (configuration) $γ$ of particles distributed over a Euclidean space $X$. Each particle located at $x\in X$ carries an internal parameter (mark, or ``spin'') $σ_{x}\in S=\mathbb{R}.$ Such collections of particles form the space of marked configurations $Γ(X,S)$. We construct the following stochastic dynamics in $Γ(X,S)$: while the configuration $γ$ of particle positions performs a random evolution, the corresponding marks interact with each other and perform a coupled infinite-dimensional diffusion. The study of a spin dynamics on a fixed configuration $γ$ was initiated by Daletskii and Finkelshtein, J. Stat. Phys. 122 ( 2018), and continued by Chargaziya and Daletskii, J. Math. Phys. 66 (2025), and is based on the generalisation of the Ovsjannikov method. In the present paper, the underlying configuration evolves according to a Birth-and-Death process. We prove the existence and uniqueness of such dynamics and show that it forms a càdlàg process in $Γ(X,S)$.
format Preprint
id arxiv_https___arxiv_org_abs_2509_25427
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Stochastic dynamics on evolving geometric graphs
Daletskii, Alexei
Finkelshtein, Dmitri
Probability
Functional Analysis
We consider an infinite locally finite system (configuration) $γ$ of particles distributed over a Euclidean space $X$. Each particle located at $x\in X$ carries an internal parameter (mark, or ``spin'') $σ_{x}\in S=\mathbb{R}.$ Such collections of particles form the space of marked configurations $Γ(X,S)$. We construct the following stochastic dynamics in $Γ(X,S)$: while the configuration $γ$ of particle positions performs a random evolution, the corresponding marks interact with each other and perform a coupled infinite-dimensional diffusion. The study of a spin dynamics on a fixed configuration $γ$ was initiated by Daletskii and Finkelshtein, J. Stat. Phys. 122 ( 2018), and continued by Chargaziya and Daletskii, J. Math. Phys. 66 (2025), and is based on the generalisation of the Ovsjannikov method. In the present paper, the underlying configuration evolves according to a Birth-and-Death process. We prove the existence and uniqueness of such dynamics and show that it forms a càdlàg process in $Γ(X,S)$.
title Stochastic dynamics on evolving geometric graphs
topic Probability
Functional Analysis
url https://arxiv.org/abs/2509.25427