Boundary H\"older regularity for the fractional Laplacian over Reifenberg flat domains via ABP maximum principle
Abstract
For 0<s<1, we consider the nonlocal equation (-)s u = f over a Reifenberg flat domain with f ∈ C() and null Dirichlet exterior condition. Given α ∈ (0,s), we prove that weak solutions are α-H\"older continuous up to the boundary when the flatness parameter is small enough. The main ingredients of the proof are an iterative argument and a nonlocal version of the ABP maximum principle.
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