Characterisation of homotopy ribbon discs
Abstract
Let be either the infinite cyclic group Z or the Baumslag-Solitar group Z Z[12]. Let K be a slice knot admitting a slice disc D in the 4-ball whose exterior has fundamental group . We classify the -homotopy ribbon slice discs for K up to topological ambient isotopy rel. boundary. In the infinite cyclic case, there is a unique equivalence class of such slice discs. When is the Baumslag-Solitar group, there are at most two equivalence classes of -homotopy ribbon discs, and at most one such slice disc for each lagrangian of the Blanchfield pairing of K.
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