The derivative map for diffeomorphism of disks: An example

Abstract

We prove that the derivative map d Diff∂(Dk) kSOk, defined by taking the derivative of a diffeomorphism, can induce a nontrivial map on homotopy groups. Specifically, for k = 11 we prove that the following homomorphism is non-zero: d* π5Diff∂(D11) π511SO11 π16SO11 As a consequence we give a counter-example to a conjecture of Burghelea and Lashof and so give an example of a non-trivial vector bundle E over a sphere which is trivial as a topological Rk-bundle (the rank of E is k=11 and the base sphere is S17.) The proof relies on a recent result of Burklund and Senger which determines those homotopy 17-spheres bounding 8-connected manifolds, the plumbing approach to the Gromoll filtration due to Antonelli, Burghelea and Kahn, and an explicit construction of low-codimension embeddings of certain homotopy spheres.