Characterizing slopes for torus knots

Abstract

A slope pq is called a characterizing slope for a given knot K0 in S3 if whenever the pq-surgery on a knot K in S3 is homeomorphic to the pq-surgery on K0 via an orientation preserving homeomorphism, then K=K0. In this paper we try to find characterizing slopes for torus knots Tr,s. We show that any slope pq which is larger than the number 30(r2-1)(s2-1)67 is a characterizing slope for Tr,s. The proof uses Heegaard Floer homology and Agol--Lackenby's 6--Theorem. In the case of T5,2, we obtain more specific information about its set of characterizing slopes by applying more Heegaard Floer homology techniques.