Regularity of stable solutions to semilinear elliptic equations on Riemannian models

Abstract

We consider the reaction-diffusion problem -g u = f(u) in BR with zero Dirichlet boundary condition, posed in a geodesic ball BR with radius R of a Riemannian model (M,g). This class of Riemannian manifolds includes the classical space forms, i.e., the Euclidean, elliptic, and hyperbolic spaces. For the class of semistable solutions we prove radial symmetry and monotonicity. Furthermore, we establish L∞, Lp, and W1,p estimates which are optimal and do not depend on the nonlinearity f. As an application, under standard assumptions on the nonlinearity λ f(u), we prove that the corresponding extremal solution u* is bounded whenever n≤9. To establish the optimality of our regularity results we find the extremal solution for some exponential and power nonlinearities using an improved weighted Hardy inequality.