Non-equilibrium stochastic dynamics in continuum: The free case
摘要
We study the problem of identification of a proper state-space for the stochastic dynamics of free particles in continuum, with their possible birth and death. In this dynamics, the motion of each separate particle is described by a fixed Markov process on a Riemannian manifold . The main problem arising here is a possible collapse of the system, in the sense that, though the initial configuration of particles is locally finite, there could exist a compact set in such that, with probability one, infinitely many particles will arrive at this set at some time . We assume that has infinite volume and, for each , we consider the set of all infinite configurations in for which the number of particles in a compact set is bounded by a constant times the -th power of the volume of the set. We find quite general conditions on the process which guarantee that the corresponding infinite particle process can start at each configuration from , will never leave , and has cadlag (or, even, continuous) sample paths in the vague topology. We consider the following examples of applications of our results: Brownian motion on the configuration space, free Glauber dynamics on the configuration space (or a birth-and-death process in ), and free Kawasaki dynamics on the configuration space. We also show that if , then for a wide class of starting distributions, the (non-equilibrium) free Glauber dynamics is a scaling limit of (non-equilibrium) free Kawasaki dynamics.
引用
@article{arxiv.math/0701736,
title = {Non-equilibrium stochastic dynamics in continuum: The free case},
author = {Y. Kondratiev and E. Lytvynov and M. Röckner},
journal= {arXiv preprint arXiv:math/0701736},
year = {2007}
}