Filtered instanton homology and cosmetic surgery

Abstract

The cosmetic surgery conjecture predicts that for a non-trivial knot in the three-sphere, performing two different Dehn surgeries results in distinct oriented three-manifolds. Hanselman reduced the problem to 2 or 1/n surgeries being the only possible cosmetic surgeries. We remove the case of 1/n-surgeries using the Chern-Simons filtration on Floer's original irreducible-only instanton homology, reducing the conjecture to the case of 2 surgery on genus 2 knots with trivial Alexander polynomial. We also prove some similar results for surgeries on knots in S2 × S1. As key steps in establishing these results, we define invariants of the oriented homeomorphism type of three-manifolds derived from filtered instanton Floer homology and introduce a new surgery relationship for Floer's instanton homology.

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