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An Injectivity Theorem for Casson-Gordon Type Representations relating to the Concordance of Knots and Links

arXiv:1011.4678

Abstract

In the study of homology cobordisms, knot concordance and link concordance, the following technical problem arises frequently: let $π$ be a group and let $M \to N$ be a homomorphism between projective $\Z[π]$-modules such that $\Z_p \otimes_{\Z[π]} M\to \Z_p \otimes_{\Z[π]} N$ is injective; for which other right $\Z[π]$-modules $V$ is the induced map $V \otimes_{\Z[π]} M\to V\otimes_{\Z[π]}N$ also injective? Our main theorem gives a new criterion which combines and generalizes many previous results.

15 pages, added reference to the work of Letsche