On the Dirichlet and Serrin problems for the inhomogeneous infinity Laplacian in convex domains: Regularity and geometric results

Abstract

Given an open bounded subset of Rn, which is convex and satisfies an interior sphere condition, we consider the pde -∞ u = 1 in , subject to the homogeneous boundary condition u = 0 on ∂ . We prove that the unique solution to this Dirichlet problem is power-concave (precisely, 3/4 concave) and it is of class C 1(). We then investigate the overdetermined Serrin-type problem obtained by adding the extra boundary condition |∇ u| = a on ∂ ; by using a suitable P-function we prove that, if satisfies the same assumptions as above and in addition contains a ball with touches ∂ at two diametral points, then the existence of a solution to this Serrin-type problem implies that necessarily the cut locus and the high ridge of coincide. In turn, in dimension n=2, this entails that must be a stadium-like domain, and in particular it must be a ball in case its boundary is of class C2.