An upper bound for the first nonzero Steklov eigenvalue

Abstract

Let (Mn,g) be a complete simply connected n-dimensional Riemannian manifold with curvature bounds Sectg≤ for ≤ 0 and Ricg≥(n-1)Kg for K≤ 0. We prove that for any bounded domain ⊂ Mn with diameter d and Lipschitz boundary, if * is a geodesic ball in the simply connected space form with constant sectional curvature enclosing the same volume as , then σ1() ≤ C σ1(*), where σ1() and σ1(*) denote the first nonzero Steklov eigenvalues of and * respectively, and C=C(n,, K, d) is an explicit constant. When =K, we have C=1 and recover the Brock-Weinstock inequality, asserting that geodesic balls uniquely maximize the first nonzero Steklov eigenvalue among domains of the same volume, in Euclidean space and the hyperbolic space.