The convergence rate of p-harmonic to infinity-harmonic functions

Abstract

The purpose of this paper is to prove a uniform convergence rate of the solutions of the p-Laplace equation p u = 0 with Dirichlet boundary conditions to the solution of the infinity-Laplace equation ∞ u = 0 as p∞. The rate scales like p-1/4 for general solutions of the Dirichlet problem and like p-1/2 for solutions with positive gradient. An explicit example shows that it cannot be better than p-1. The proof of this result solely relies on the comparison principle with the fundamental solutions of the p-Laplace and the infinity-Laplace equation, respectively. Our argument does not use viscosity solutions, is purely metric, and is therefore generalizable to more general settings where a comparison principle with H\"older cones and H\"older regularity is available.