Maximization of Neumann eigenvalues

Abstract

This paper is motivated by the maximization of the k-th eigenvalue of the Laplace operator with Neumann boundary conditions among domains of RN with prescribed measure. We relax the problem to the class of (possibly degenerate) densities in RN with prescribed mass and prove the existence of an optimal density. For k=1,2 the two problems are equivalent and the maximizers are known to be one and two equal balls, respectively. For k 3 this question remains open, except in one dimension of the space where we prove that the maximal densities correspond to a union of k equal segments. This result provides sharp upper bounds for Sturm-Liouville eigenvalues and proves the validity of the P\'olya conjecture in the class of densities in R. Based on the relaxed formulation, we provide numerical approximations of optimal densities for k=1, …, 8 in R2.