On the kernel of the zero-surgery homomorphism from knot concordance

Abstract

Kawauchi defined a group structure on the set of homology S1×S2's under an equivalence relation called H-cobordism. This group receives a homomorphism from the knot concordance group, given by the operation of zero-surgery. It is natural to ask whether the zero-surgery homomorphism is injective. We show that this question has a negative answer in the smooth category. Indeed, using knot concordance invariants derived from knot Floer homology we show that the kernel of the zero-surgery homomorphism contains a Z∞-subgroup.