Spectral distribution and $L^2$-isoperimetric profile of Laplace operators on groups
arXiv:0901.0271
Abstract
We give a formula relating the $L^2$-isoperimetric profile to the spectral distribution of the Laplace operator associated to a finitely generated group $Î$ or a Riemannian manifold with a cocompact, isometric $Î$-action. As a consequence, we can apply techniques from geometric group theory to estimate the spectral distribution of the Laplace operator in terms of the growth and the Følner's function of the group, generalizing previous estimates by Gromov and Shubin. This leads, in particular, to sharp estimates of the spectral distributions for several classes of solvable groups. Furthermore, we prove the asymptotic invariance of the spectral distribution under changes of measures with finite second moment.
22 pages; changed title; improved exposition and gave more details in some of the proofs