The Steklov and Laplacian spectra of Riemannian manifolds with boundary

Abstract

Given two compact Riemannian manifolds with boundary M1 and M2 such that their respective boundaries 1 and 2 admit neighborhoods 1 and 2 which are isometric, we prove the existence of a constant C, which depends only on the geometry of 12, such that |σk(M1)-σk(M2)|≤ C for each k∈N. This follows from a quantitative relationship between the Steklov eigenvalues σk of a compact Riemannian manifold M and the eigenvalues λk of the Laplacian on its boundary. Our main result states that the difference |σk-λk| is bounded above by a constant which depends on the geometry of M only in a neighborhood of its boundary. The proofs are based on a Pohozaev identity and on comparison geometry for principal curvatures of parallel hypersurfaces. In several situations, the constant C is given explicitly in terms of bounds on the geometry of 12.