Purely cosmetic surgeries and Casson--Walker--Lescop invariants

Abstract

Using the rational surgery formula for the Casson--Walker--Lescop invariant of links in the 3-sphere, we show that any null-homologous knot in a rational homology sphere admits at most two pairs of integral purely cosmetic surgeries. We also present constraints for null-homologous knots in certain 3-manifolds with the first Betti number one or two to admit purely cosmetic surgeries. As another application, we show that, for a null-homologous knot in some 3-manifolds, including S2 × S1, there are at most two knots which are inequivalent to the given one, but whose exteriors are orientation-preservingly homeomorphic to that of the given one.

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