About Bounds for Eigenvalues of the Laplacian with Density

Abstract

Let M denote a compact, connected Riemannian manifold of dimension n∈ N. We assume that M has a smooth and connected boundary. Denote by g and dvg respectively, the Riemannian metric on M and the associated volume element. Let be the Laplace operator on M equipped with the weighted volume form dm:= e-h\, dvg. We are interested in the operator Lh·:= e-h(α-1) (· +α g(∇ h,∇·)), where α > 1 and h∈ C2(M) are given. The main result in this paper states about the existence of upper bounds for the eigenvalues of the weighted Laplacian Lh with the Neumann boundary condition if the boundary is non-empty.