Uniqueness of extremals for some sharp Poincar\'e-Sobolev constants

Abstract

We study the sharp constant for the embedding of W1,p0() into Lq(), in the case 2<p<q. We prove that for smooth connected sets, when q>p and q is sufficiently close to p, extremal functions attaining the sharp constant are unique, up to a multiplicative constant. This in turn gives the uniqueness of solutions with minimal energy to the Lane-Emden equation, with super-homogeneous right-hand side. The result is achieved by suitably adapting a linearization argument due to C.-S. Lin. We rely on some fine estimates for solutions of p-Laplace--type equations by L. Damascelli and B. Sciunzi.