Knot concordance and homology sphere groups

Abstract

We study two homomorphisms to the rational homology sphere group. If denotes the inclusion homomorphism from the integral homology sphere group, then using work of Lisca we show that the image of intersects trivially with the subgroup of the rational homology sphere group generated by lens spaces. As corollaries this gives a new proof that the cokernel of is infinitely generated, and implies that a connected sum K of 2-bridge knots is concordant to a knot with determinant 1 if and only if K is smoothly slice. Furthermore, if β denotes the homomorphism from the knot concordance group defined by taking double branched covers of knots, we prove that the kernel of β contains a Z∞ summand by analyzing the Tristram-Levine signatures of a family of knots whose double branched covers all bound rational homology balls.