A sharp fixed-volume product inequality for the first N nonzero Steklov eigenvalues

Abstract

We prove a sharp fixed-volume product inequality for the first N nonzero Steklov eigenvalues of bounded Lipschitz domains in RN. More precisely, if N2 and Ω⊂ RN is a bounded Lipschitz domain, then Πj=1N σj(Ω) ωN|Ω|, where 0=σ0(Ω)<σ1(Ω)σ2(Ω)·s are the Steklov eigenvalues of Ω, and ωN denotes the volume of the unit ball in RN. This extends the convex-domain theorem of Henrot, Philippin, and Safoui to arbitrary bounded Lipschitz domains, and in particular settles the remaining higher-dimensional case of a problem posed by Henrot.