Reilly's type inequality for the Laplacian associated to a density related with shrinkers for MCF

Abstract

Let (M,<,>,e) be a Riemannian manifold with a density, and let M be a closed n-dimensional submanifold of M with the induced metric and density. We give an upper bound on the first eigenvalue λ1 of the closed eigenvalue problem for (the Laplacian on M associated to the density) in terms of the average of the norm of the vector H + ∇ with respect to the volume form induced by the density, where H is the mean curvature of M associated to the density e. When M= Rn+k or M=Sn+k-1, the equality between λ1 and its bound implies that e is a Gaussian density ((x) = C2 |x|2, C<0), and M is a shrinker for the mean curvature flow (MCF) on Rn+k. We prove also that λ1 =-C on the standard shrinker torus of revolution. Based on this and on the Yau's conjecture on the first eigenvalue of minimal submanifolds of Sn, we conjecture that the equality λ1=-C is true for all the shrinkers of MCF in Rn+k.