Eigenvalues of perturbed Laplace operators on compact manifolds

Abstract

We obtain upper bounds for the eigenvalues of the Schr\"odinger operator L=g+q depending on integral quantities of the potential q and a conformal invariant called the min-conformal volume. Moreover, when the Schr\"odinger operator L is positive, integral quantities of q which appear in upper bounds, can be replaced by the mean value of the potential q. The upper bounds we obtain are compatible with the asymptotic behavior of the eigenvalues. We also obtain upper bounds for the eigenvalues of the weighted Laplacian or the Bakry-Emery Laplacian φ=g+∇gφ·∇g using two approaches: First, we use the fact that φ is unitarily equivalent to a Schr\"odinger operator and we get an upper bound in terms of the L2-norm of ∇gφ and the min-conformal volume. Second, we use its variational characterization and we obtain upper bounds in terms of the L∞-norm of ∇gφ and a new conformal invariant. The second approach leads to a Buser type upper bound and also gives upper bounds which do not depend on φ when the Bakry-Emery Ricci curvature is non-negative.