Homotopy ribbon discs with a fixed group

Abstract

In the topological category, the classification of homotopy ribbon discs is known when the fundamental group G of the exterior is Z and the Baumslag-Solitar group BS(1,2). We prove that if a group G is geometrically 2-dimensional and satisfies the Farrell-Jones conjecture, then a condition involving the fundamental group ensures that exteriors of aspherical homotopy ribbon discs with fundamental group G are s-cobordant rel.\ boundary. When G is good, this leads to the classification of such discs. As an application, for any knot J ⊂ S3 whose knot group G(J) is good, we classify the homotopy ribbon discs for J \# -J whose complement has group G(J). A similar application is obtained for BS(m,n) when |m-n|=1.