On Concavity of Solutions of the Nonlinear Poisson Equation

Abstract

We consider the nonlinear Poisson equation - u = f(u) in domains ⊂ Rn with Dirichlet boundary conditions on ∂ . We show (for monotonically increasing concave f with small Lipschitz constant) that if D2 u is negative semi-definite on the boundary, then u is concave. A conjecture of Saint Venant from 1856 (proven by Polya in 1948) is that among all domains of fixed measure, the solution of - u =1 assumes its largest maximum when is a ball. We extend this to - u =f(u) for monotonically increasing f with small Lipschitz constant.