On the spectra of three Steklov eigenvalue problems on warped product manifolds

Abstract

Let Mn=[0,R)× Sn-1 be an n-dimensional (n≥ 2) smooth Riemannian manifold equipped with the warped product metric g=dr2+h2(r)gSn-1 and diffeomorphic to a Euclidean ball. Assume that M has strictly convex boundary. First, for the classical Steklov eigenvalue problem, we obtain an optimal lower (upper, respectively) bound for its spectrum in terms of h'(R)/h(R) when Ricg≥ 0 (≤ 0, respectively). Second, for two fourth-order Steklov eigenvalue problems studied by Kuttler and Sigillito in 1968, we derive a lower bound for their spectra in terms of either h'(R)/h3(R) or h'(R)/h(R) when Ricg≥ 0, which is optimal for certain cases; in particular, we confirm a conjecture raised by Q. Wang and C. Xia for warped product manifolds of dimension n=2 or n≥ 4. For some proofs we utilize the Reilly's formula and reveal a new feature on its use.