Diffeomorphisms of odd-dimensional discs, glued into a manifold

Abstract

For a compact (2n+1)-dimensional smooth manifold, let μM : B Diff∂ (D2n+1) B Diff (M) be the map that is defined by extending diffeomorphisms on an embedded disc by the identity. By a classical result of Farrell and Hsiang, the rational homotopy groups and the rational homology of B Diff∂ (D2n+1) are known in the concordance stable range. We prove two results on the behaviour of the map μM in the concordance stable range. Firstly, it is injective on rational homotopy groups, and secondly, it is trivial on rational homology, if M contains sufficiently many embedded copies of Sn× Sn+1 int(D2n+1). The homotopical statement is probably not new and follows from the theory of smooth torsion invariants. The homological statement relies on work by Botvinnik and Perlmutter on diffeomorphism of odd-dimensional manifolds.