Optimal Szeg\"o-Weinberger type inequalities

Abstract

Denote with μ1(;eh(|x|)) the first nontrivial eigenvalue of the Neumann problem equation* \arraylll -div(eh(|x|)∇ u) =μ eh(|x|)u & in & & & ∂ u∂ =0 & on & ∂ , array . equation* where is a bounded and Lipschitz domain in RN. Under suitable assumption on h we prove that the ball centered at the origin is the unique set maximizing μ1(;eh(|x|)) among all Lipschitz bounded domains of RN of prescribed eh(|x|)dx-measure and symmetric about the origin. Moreover, an example in the model case h(|x|) =|x|2, shows that, in general, the assumption on the symmetry of the domain cannot be dropped. In the one-dimensional case, i.e. when reduces to an interval (a,b), we consider a wide class of weights (including both Gaussian and anti-Gaussian). We then describe the behavior of the eigenvalue as the interval (a,b) slides along the x-axis keeping fixed its weighted length.