Lp-Kato class measures for symmetric Markov processes under heat kernel estimates

Abstract

In this paper, we establish the coincidence of two classes of Lp-Kato class measures in the framework of symmetric Markov processes admitting upper and lower estimates of heat kernel under mild conditions. One class of Lp-Kato class measures is defined by the p-th power of positive order resolvent kernel, another is defined in terms of the p-th power of Green kernel depending on some exponents related to the heat kernel estimates. We also prove that q-th integrable functions on balls with radius 1 having uniformity of its norm with respect to centers are of Lp-Kato class if q is greater than a constant related to p and the constants appeared in the upper and lower estimates of the heat kernel. These are complete extensions of some results by Aizenman-Simon and the recent results by the second named author in the framework of Brownian motions on Euclidean space. We further give necessary and sufficient conditions for a Radon measure with Ahlfors regularity to belong to Lp-Kato class. Our results can be applicable to many examples, for instance, symmetric (relativistic) stable processes, jump processes on d-sets, Brownian motions on Riemannian manifolds, diffusions on fractals and so on.