Twisted Blanchfield pairings and twisted signatures II: Relation to Casson-Gordon invariants

Abstract

This paper studies twisted signature invariants and twisted linking forms, with a view towards obstructions to knot concordance. Given a knot K and a representation of the knot group, we define a twisted signature function σK, S1 Z. This invariant satisfies many of the same algebraic properties as the classical Levine-Tristram signature σK. When the representation is abelian, σK, recovers σK, while for appropriate metabelian representations, σK, is closely related to the Casson-Gordon invariants. Additionally, we prove satellite formulas for σK, and for twisted Blanchfield forms.