On the reverse Faber-Krahn inequalities

Abstract

Payne-Weinberger showed that `among the class of membranes with given area A, free along the interior boundaries and fixed along the outer boundary of given length L0, the annulus \# has the highest fundamental frequency,' where \# is a concentric annulus with the same area as and the same outer boundary length as L0. We extend this result for the higher dimensional domains and p-Laplacian with p∈ (1,∞), under the additional assumption that the outer boundary is a sphere. As an application, we prove that the nodal set of the second eigenfunctions of p-Laplacian (with mixed boundary conditions) on a ball and a concentric annulus cannot be a concentric sphere.