Dirichlet heat kernel estimates of subordinate diffusion processes with diffusive components in C1, α open sets

Abstract

In this paper, we derive explicit sharp two-sided estimates of the Dirichlet heat kernels for a class of symmetric subordinate diffusion processes with diffusive components in C1, α(α∈ (0, 1]) open sets in Rd when the scaling order of the Laplace exponent of purely discontinuous part of the subordinator is between 0 and 1 including 1. The main result of this paper shows the stability of Dirichlet heat kernel estimates for such processes in C1, α open sets in the sense that the estimates depend on the divergence elliptic operator only via its uniform ellipticity constant and the Dini continuity modulus of the diffusion coefficients. As a corollary, we obtain the sharp two-sided estimates for Green functions of those processes in bounded C1, α open sets.