Approximations of delocalized eta invariants by their finite analogues

Abstract

For a given self-adjoint first order elliptic differential operator on a closed smooth manifold, we prove a list of results on when the delocalized eta invariant associated to a regular covering space can be approximated by the delocalized eta invariants associated to finite-sheeted covering spaces. One of our main results is the following. Suppose M is a closed smooth spin manifold and M is a -regular covering space of M. Let α be the conjugacy class of a non-identity element α∈ . Suppose \i\ is a sequence of finite-index normal subgroups of that distinguishes α . Let π_i be the quotient map from to /i and π_i(α) the conjugacy class of π_i(α) in /i. If the scalar curvature on M is everywhere bounded below by a sufficiently large positive number, then the delocalized eta invariant for the Dirac operator of M at the conjugacy class α is equal to the limit of the delocalized eta invariants for the Dirac operators of M_i at the conjugacy class π_i(α) , where M_i= M/i is the finite-sheeted covering space of M determined by i. In another main result of the paper, we prove that the limit of the delocalized eta invariants for the Dirac operators of M_i at the conjugacy class π_i(α) converges, under the assumption that the rational maximal Baum-Connes conjecture holds for .