On the eigenvalues of the Laplacian on fibred manifolds

Abstract

We prove various comparison theorems of the i-th eigenvalue λi of the Laplacian on fibred Riemannian manifolds by using fiberwise spherical and Euclidean (or hyperbolic) symmetrization. In particular we generalize the Lichnerowicz inequality and the Faber-Krahn inequality to fiber bundles, and prove a counterpart to Cheng's λ1 comparison theorem under a lower Ricci curvature bound. By applying these, it is shown that λ1,·s,λk of a fiber bundle given by a Riemannian submersion with totally geodesic fibers of sufficiently positive Ricci curvature are respectively equal to λ1,·s,λk of its base, and λ1 of a (possibly singular) fibration with Euclidean subsets as fibers is no less than λ1 of the disk bundle obtained by replacing each fiber with a Euclidean disk of the same dimension and volume.