The heat semigroup on configuration spaces
摘要
In this paper, we study properties of the heat semigroup of configuration space analysis. Using a natural ``Riemannian-like'' structure of the configuration space over a complete, connected, oriented, and stochastically complete Riemannian manifold of infinite volume, the heat semigroup was introduced and studied in [{\it J. Func. Anal.} {\bf 154} (1998), 444--500]. Here, is the Dirichlet operator of the Dirichlet form over the space , where is the Poisson measure on with intensity --the volume measure on . We construct a metric space that is continuously embedded into . Under some conditions on the manifold and we prove that is a set of full measure. The central results of the paper are two types of Feller properties for the heat semigroup. Next, we give a direct construction of the independent infinite particle process on the manifold , which is a realization of the Brownian motion on the configuration space. The main point here is that we prove that this process can start in every , will never leave , and has continuous sample path in , provided . In this case, we also prove that this process is a strong Markov process whose transition probabilities are given by the above. Furthermore, we discuss the necessary changes to be done for constructing the process in the case . Finally, as an easy consequence we get a ``path-wise'' construction of the independent particle process on from the underlying Brownian motion.
引用
@article{arxiv.math/0211325,
title = {The heat semigroup on configuration spaces},
author = {Yuri Kondratiev and Eugene Lytvynov and Michael Roeckner},
journal= {arXiv preprint arXiv:math/0211325},
year = {2007}
}