Spectrum of the Laplacian on Quaternionic Kahler Manifolds

Abstract

Let M4n be a complete quaternionic K\"ahler manifold with scalar curvature bounded below by -16n(n+2). We get a sharp estimate for the first eigenvalue λ1(M) of the Laplacian which is λ1(M) (2n+1)2. If the equality holds, then either M has only one end, or M is diffeomorphic to R× N with N given by a compact manifold. Moreover, if M is of bounded curvature, M is covered by the quaterionic hyperbolic space QHn and N is a compact quotient of the generalized Heisenberg group. When λ1(M) 8(n+2)3, we also prove that M must have only one end with infinite volume.