Heat Kernel Estimate for +α/2 in C1,1 open sets

Abstract

We consider a family of pseudo differential operators \+ aα α/2; a∈ (0, 1]\ on d for every d≥ 1 that evolves continuously from to + α/2, where α ∈ (0, 2). It gives rise to a family of L\'evy processes \Xa, a∈ (0, 1]\ in d, where Xa is the sum of a Brownian motion and an independent symmetric α-stable process with weight a. We establish sharp two-sided estimates for the heat kernel of + aα α/2 with zero exterior condition in a family of open subsets, including bounded C1, 1 (possibly disconnected) open sets. This heat kernel is also the transition density of the sum of a Brownian motion and an independent symmetric α-stable process with weight a in such open sets. Our result is the first sharp two-sided estimates for the transition density of a Markov process with both diffusion and jump components in open sets. Moreover, our result is uniform in a in the sense that the constants in the estimates are independent of a∈ (0, 1] so that it recovers the Dirichlet heat kernel estimates for Brownian motion by taking a 0. Integrating the heat kernel estimates in time t, we recover the two-sided sharp uniform Green function estimates of Xa in bounded C1,1 open sets in d, which were recently established in CKSV2 by using a completely different approach.