The semigroup of the Glauber dynamics of a continuous system of free particles

Yuri Kondratiev, Eugene Lytvynov, Michael Röckner

Published 2004-07-21Version 1

We study properties of the semigroup $(e^{-tH})_{t\ge 0}$ on the space $L^ 2(\Gamma_X,\pi)$, where $\Gamma_X$ is the configuration space over a locally compact second countable Hausdorff topological space $X$, $\pi$ is a Poisson measure on $\Gamma_X$, and $H$ is the generator of the Glauber dynamics. We explicitly construct the corresponding Markov semigroup of kernels $(P_t)_{t\ge 0}$ and, using it, we prove the main results of the paper: the Feller property of the semigroup $(P_t)_{t\ge 0}$ with respect to the vague topology on the configuration space $\Gamma_X$, and the ergodic property of $(P_t)_{t\ge 0}$. Following an idea of D. Surgailis, we also give a direct construction of the Glauber dynamics of a continuous infinite system of free particles. The main point here is that this process can start in every $\gamma\in\Gamma_X$, will never leave $\Gamma_X$ and has cadlag sample paths in $\Gamma_X$.