Spectrum of the Laplacian with weights

Abstract

Given a compact Riemannian manifold (M, g) and two positive functions and σ, we are interested in the eigenvalues of the Dirichlet energy functional weighted by σ, with respect to the L 2 inner product weighted by . Under some regularity conditions on and σ, these eigenvalues are those of the operator -1 div(σ∇u) with Neumann conditions on the boundary if ∂M = . We investigate the effect of the weights on eigenvalues and discuss the existence of lower and upper bounds under the condition that the total mass is preserved.