Boundary Harnack principle for + α/2

Abstract

For d≥ 1 and α ∈ (0, 2), consider the family of pseudo differential operators \+ b α/2; b∈ [0, 1]\ on d that evolves continuously from to + α/2. In this paper, we establish a uniform boundary Harnack principle (BHP) with explicit boundary decay rate for nonnegative functions which are harmonic with respect to +b α/2 (or equivalently, the sum of a Brownian motion and an independent symmetric α-stable process with constant multiple b1/α) in C1, 1 open sets. Here a "uniform" BHP means that the comparing constant in the BHP is independent of b∈ [0, 1]. Along the way, a uniform Carleson type estimate is established for nonnegative functions which are harmonic with respect to + b α/2 in Lipschitz open sets. Our method employs a combination of probabilistic and analytic techniques.