Boundary Harnack principle for non-local operators on metric measure spaces

Abstract

In this paper, a necessary and sufficient condition is obtained for the scale invariant boundary Harnack inequality (BHP in abbreviation) for a large class of Hunt processes on metric measure spaces that are in weak duality with another Hunt process. We next consider a discontinuous subordinate Brownian motion with Gaussian component Xt=WSt in Rd for which the L\'evy density of the subordinator S satisfies some mild comparability condition. We show that the scale invariant BHP holds for the subordinate Brownian motion X in any Lipschitz domain satisfying the interior cone condition with common angle θ∈ (-1(1/ d), π), but fails in any truncated circular cone with angle θ ≤ -1(1/ d), a Lipschitz domain whose Lipschitz constant is larger than or equal to 1/d-1.

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