Glauber dynamics of continuous particle systems
Abstract
This paper is devoted to the construction and study of an equilibrium Glauber-type dynamics of infinite continuous particle systems. This dynamics is a special case of a spatial birth and death process. On the space of all locally finite subsets (configurations) in , we fix a Gibbs measure corresponding to a general pair potential and activity . We consider a Dirichlet form on which corresponds to the generator of the Glauber dynamics. We prove the existence of a Markov process on that is properly associated with . In the case of a positive potential which satisfies , we also prove that the generator has a spectral gap . Furthermore, for any pure Gibbs state , we derive a Poincar\'e inequality. The results about the spectral gap and the Poincar\'e inequality are a generalization and a refinement of a recent result by L. Bertini, N. Cancrini, and F. Cesi.
Cite
@article{arxiv.math/0306252,
title = {Glauber dynamics of continuous particle systems},
author = {Yu. Kondratiev and E. Lytvynov},
journal= {arXiv preprint arXiv:math/0306252},
year = {2007}
}