Homological Stability for Diffeomorphism Groups of High Dimensional Handlebodies

Abstract

In this paper we prove a homological stability theorem for the diffeomorphism groups of high dimensional manifolds with boundary, with respect to forming the boundary connected sum with the product Dp+1× Sq for |q - p| < \p, q\ - 2. In a recent joint paper with Boris Botvinnik (see arXiv:1509.03359 ), we identify the homology of colimg ∞BDiff((Dn+1× Sn) g, \; D2n) with that of the infinite loopspace Q0BO(2n+1) n+, in the case that n ≥ 4. Combining this "stable homology" calculation with this paper's homological stability theorem enables one to compute the (co)homology groups of BDiff((Dn+1× Sn) g, D2n) in degrees k ≤ 12(g - 4). This leads to the determination of the characteristic classes in degrees k ≤ 12(g - 4) for all smooth fibre-bundles with fibre diffeomorphic to (Dn+1× Sn) g.