Szego-Weinberger type inequalities for symmetric domains with holes

Abstract

Let μ2() be the first positive eigenvalue of the Neumann Laplacian in a bounded domain ⊂RN. It was proved by Szego for N=2 and by Weinberger for N ≥ 2 that among all equimeasurable domains μ2() attains its global maximum if is a ball. In the present work, we develop the approach of Weinberger in two directions. Firstly, we refine the Szego-Weinberger result for a class of domains of the form outin which are either centrally symmetric or symmetric of order 2 (with respect to every coordinate plane (xi,xj)) by showing that μ2(outin)≤μ2(BβBα), where Bα, Bβ are balls centered at the origin such that Bα⊂in and |outin|=|BβBα|. Secondly, we provide Szego-Weinberger type inequalities for higher eigenvalues by imposing additional symmetry assumptions on the domain. Namely, if outin is symmetric of order 4, then we prove μi(outin)≤μi(BβBα) for i=3,…,N+2, where we also allow in and Bα to be empty. If N=2 and the domain is symmetric of order 8, then the latter inequality persists for i=5. Counterexamples to the obtained inequalities for domains outside of the considered symmetry classes are given. The existence and properties of nonradial domains with required symmetries in higher dimensions are discussed. As an auxiliary result, we obtain the non-radiality of the eigenfunctions associated to μN+2(BβBα).