Eigenvalues of the drifted Laplacian on complete metric measure spaces

Abstract

I In this paper, first we study a complete smooth metric measure space (Mn,g, e-fdv) with the (∞)-Bakry-\'Emery Ricci curvature Ricf a2g for some positive constant a. It is known that the spectrum of the drifted Laplacian f for M is discrete and the first nonzero eigenvalue of f has lower bound a2. We prove that if the lower bound a2 is achieved with multiplicity k≥ 1, then k≤ n, M is isometric to n-k× Rk for some complete (n-k)-dimensional manifold and by passing an isometry, (Mn,g, e-fdv) must split off a gradient shrinking Ricci soliton (Rk, gcan, a4|t|2), t∈ Rk. This result has an application to gradient shrinking Ricci solitons. Secondly, we study the drifted Laplacian L for properly immersed self-shrinkers in the Euclidean space Rn+p, p≥1 and show the discreteness of the spectrum of L and a logarithmic Sobolev inequality.