The boundary Harnack principle for nonlocal elliptic operators in non-divergence form
Abstract
We prove a boundary Harnack inequality for nonlocal elliptic operators L in non-divergence form with bounded measurable coefficients. Namely, our main result establishes that if Lu1=Lu2=0 in B1, u1=u2=0 in B1, and u1,u2≥0 in Rn, then u1 and u2 are comparable in B1/2. The result applies to arbitrary open sets . When is Lipschitz, we show that the quotient u1/u2 is H\"older continuous up to the boundary in B1/2.
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