Potential theory of Dirichlet forms with jump kernels blowing up at the boundary

Abstract

In this paper we study the potential theory of Dirichlet forms on the half-space Rd+ defined by the jump kernel J(x,y)=|x-y|-d-αB(x,y) and the killing potential xd-α, where α∈ (0, 2) and B(x,y) can blow up to infinity at the boundary. The jump kernel and the killing potential depend on several parameters. For all admissible values of the parameters involved and all d 1, we prove that the boundary Harnack principle holds, and establish sharp two-sided estimates on the Green functions of these processes.