Dirichlet heat kernel estimates for fractional Laplacian under non-local perturbation

Abstract

For d 2 and 0<β<α<2, consider a family of non-local operators Lb=α/2+Sb on Rd, where Sbf(x):= 0A(d,-β)∫ \z∈ Rd: |z|>\ (f(x+z)-f(x))b(x,z)|z|d+β\,dz, and b(x,z) is a bounded measurable function on Rd×Rd with b(x,z)=b(x,-z) for every x,z∈Rd. Here A(d, -β) is a normalizing constant so that Sb=-(-)β/2 when b(x, z) 1. It was recently shown in Chen and Wang [arXiv:1312.7594 [math.PR]] that when b(x, z) ≥ -A(d, -α) A(d, -β)\, |z|β -α, then Lb admits a unique fundamental solution pb(t, x, y) which is strictly positive and continuous. The kernel pb(t, x, y) uniquely determines a conservative Feller process Xb, which has strong Feller property. The Feller process Xb is also the unique solution to the martingale problem of (Lb, S(Rd)), where S(Rd) denotes the space of tempered functions on Rd. In this paper, we are concerned with the subprocess Xb,D of Xb killed upon leaving a bounded C1,1 open set D⊂ Rd. We establish explicit sharp two-sided estimates for the transition density function of Xb, D.