Stable Moduli Spaces of High Dimensional Handlebodies

Abstract

We study the moduli space of handlebodies diffeomorphic to (Dn+1× Sn) g, i.e. the classifying space BDiff((Dn+1× Sn) g, D2n) of the group of diffeomorphisms that restrict to the identity near a 2n-dimensional disk embedded in the boundary, ∂(Dn+1× Sn) g. We construct a map colimg∞BDiff((Dn+1× Sn) g, D2n) Q0BO(2n+1) n + and prove that it induces an isomorphism on integral homology in the case that 2n+1 ≥ 9. Above, BO(2n+1) n denotes the n-connective cover of BO(2n+1). The (co)homology of the space Q0BO(2n+1) n + is well understood and so our results enable one to compute the homology groups Hk(BDiff((Dn+1× Sn) g, D2n)) in a range of degrees when k << g. Our main theorem can be viewed as an analogue of the Madsen-Weiss theorem for the moduli spaces of surfaces and the recent theorem of Galatius and Randal-Williams for the moduli spaces of manifolds of dimension 2n ≥ 6.