Lipschitz regularity for p-harmonic interface transmission problems
Abstract
We prove optimal Lipschitz regularity for weak solutions of the measure-valued p-Poisson equation -p u = Q \; Hn-1 . Here p ∈ (1,2), is a compact and connected C2-hypersurface without boundary, and Q is a positive W2,∞-density. This equation can be understood as a nonlinear interface transmission problem. Our main result extends previous studies of the linear case and provides further insights on a delicate limit case of (linear and nonlinear) potential theory.
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