Effective bounds on characterising slopes for all knots

Abstract

A slope p/q is characterising for a knot K ⊂ S3 if the orientation-preserving homeomorphism type of the manifold S3K(p/q) obtained by performing Dehn surgery of slope p/q along K uniquely determines the knot K. We combine new applications of results from hyperbolic geometry with previous individual work of the authors to determine, for any given knot K, an explicit bound C(K) such that |q| > C(K) implies that p/q is a characterising slope for K. Furthermore, we find an optimal such C(K) for certain satellite knots with winding number zero patterns.

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