Radial symmetry for p-harmonic functions in exterior and punctured domains

Abstract

We prove symmetry for the p-capacitary potential satisfying p u = 0 \, in RN , \; u=1 \, on , \; |x|→ ∞ u(x)=0 , \; \; \; \; \; \; \; \; 1<p<N, under Serrin's overdetermined condition | ∇ u| = c on . Here is any bounded domain on which no a priori assumption is made, and denotes its boundary. Our result improves on a work of Garofalo and Sartori, where the same conclusion was obtained when is star-shaped. Our proof uses the maximum principle for an appropriate P-function, some integral identities, the isoperimetric inequality, and a Soap Bubble-type Theorem. We then treat the case 1<p=N, improving previous results present in the literature. Finally, with analogous tools we give a new proof of symmetry for the interior overdetermined problem - p u = K \, δ0 \, in , \, u=c \, on , \; \; \; \; \; \; \; \; 1<p<N, | ∇ u| = 1 on , in a bounded star-shaped domain .