Regularity for the normalized p-Laplacian equation with an arbitrary degeneracy law

Abstract

We examine the interior regularity of solutions to a degenerate normalized p-Laplace equation, where the degeneracy is governed by a modulus of continuity whose inverse satisfies a Dini continuity condition. We prove that under very general assumptions on the degeneracy law, solutions belong to the C1 class. We argue by approximating the solutions by a sequence of hyperplanes, which allows us to prove the desired regularity.

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