Upper Rate Functions of Brownian Motion Type for Symmetric Jump Processes

Abstract

Let X be a symmetric jump process on d such that the corresponding jumping kernel J(x,y) satisfies J(x,y) c|x-y|d+21+(e+|x-y|) for all x,y∈d with |x-y|1 and some constants c,>0. Under additional mild assumptions on J(x,y) for |x-y|<1, we show that Cr r with some constant C>0 is an upper rate function of the process X, which enjoys the same form as that for Brownian motions. The approach is based on heat kernel estimates of large time for the process X. As a by-product, we also obtain two-sided heat kernel estimates of large time for symmetric jump processes whose jumping kernels are comparable to 1|x-y|d+2+ for all x,y∈d with |x-y|1 and some constant >0.