Boundary Harnack principle and gradient estimates for fractional Laplacian perturbed by non-local operators

Abstract

Suppose d 2 and 0<β<α<2. We consider the non-local operator Lb=α/2+Sb, where Sbf(x):= 0A(d,-β)∫|z|>(f(x+z)-f(x))b(x,z)|z|d+β\,dy. Here b(x,z) is a bounded measurable function on Rd×Rd that is symmetric in z, and A(d,-β) is a normalizing constant so that when b(x, z) 1, Sb becomes the fractional Laplacian β/2:=-(-)β/2. In other words, Lbf(x):= 0A(d,-β)∫|z|>(f(x+z)-f(x)) jb(x, z)\,dz, where jb(x, z):= A(d,-α) |z|-(d+α)+ A(d,-β) b(x, z)|z|-(d+β). It is recently established in Chen and Wang [arXiv:1312.7594 [math.PR]] that, when jb(x, z)≥ 0 on Rd× Rd, there is a conservative Feller process Xb having Lb as its infinitesimal generator. In this paper we establish, under certain conditions on b, a uniform boundary Harnack principle for harmonic functions of Xb (or equivalently, of Lb) in any -fat open set. We further establish uniform gradient estimates for non-negative harmonic functions of Xb in open sets.