Potential theory of Dirichlet forms degenerate at the boundary: the case of no killing potential
Abstract
In this paper we consider the Dirichlet form on the half-space Rd+ defined by the jump kernel J(x,y)=|x-y|-d-αB(x,y), where B(x,y) can be degenerate at the boundary. Unlike our previous works [6,7] where we imposed critical killing, here we assume that the killing potential is identically zero. In case α∈ (1,2) we first show that the corresponding Hunt process has finite lifetime and dies at the boundary. Then, as our main contribution, we prove the boundary Harnack principle and establish sharp two-sided Green function estimates. Our results cover the case of the censored α-stable process, α∈ (1,2), in the half-space studied in [2].
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