Global heat kernel estimates for symmetric Markov processes dominated by stable-like processes in exterior C1,η open sets

Abstract

In this paper, we establish sharp two-sided heat kernel estimates for a large class of symmetric Markov processes in exterior C1,η open sets for all t> 0. The processes are symmetric pure jump Markov processes with jumping kernel intensity (x, y)(|x-y|)-1|x-y|-d-α where α∈(0,2), is an increasing function on [ 0, ∞) with (r)=1 on 0<r 1 and c1ec2rβ (r) c3ec4rβ on r>1 for β∈[0, ∞]. A symmetric function (x, y) is bounded by two positive constants and |(x, y)-(x,x)| c5 |x-y| for |x-y|<1 and >α/2. As a corollary of our main result, we estimates sharp two-sided Green function for this process in C1,η exterior open sets.