Power- and Log-concavity of viscosity solutions to some elliptic Dirichlet problems

Abstract

In this article we consider a special type of degenerate elliptic partial differential equations of second order in convex domains that satisfy the interior sphere condition. We show that any positive viscosity solution u of -|∇ u|α pN u = 1 has the property that uα + 1α + 2 is a concave function. Secondly we consider positive solutions of the eigenvalue problem -|∇ u|α pN u = λ |u|α u, in which case u turns out to be concave. The methods provided include a weak comparison principle and a Hopf-type Lemma.