Lp-Green-tight measures of Lp-Kato class for symmetric Markov processes

Abstract

In this paper, we introduce the notion of Lp-Green-tight measures of Lp-Kato class in the framework of symmetric Markov processes. The class of Lp-Green-tight measures of Lp-Kato class is defined by the p-th power of resolvent kernels. We first prove that under the Lp-Green tightness of the measure μ, the embedding of extended Dirichlet space into L2p(E;μ) is compact under the absolute continuity condition for transient Markov processes, which is an extension of recent seminal work by Takeda. Secondly, we prove the coincidence between two classes of Lp-Green-tightness, one is originally introduced by Zhao, and another one is invented by Chen. Finally, we prove that our class of Lp-Green-tight measures of Lp-Kato class coincides with the class of Lp-Green tight measures of Kato class in terms of Green kernel under the global heat kernel estimates. We apply our results to d-dimensional Brownian motion androtationally symmetric relativistic α-stable processes on Rd.