Jennifer Hom
Published 2012-02-07, updated 2013-06-12Version 2
We define a concordance invariant, epsilon(K), associated to the knot Floer complex of K, and give a formula for the Ozsv\'ath-Szab\'o concordance invariant tau of K_{p,q}, the (p,q)-cable of a knot K, in terms of p, q, tau(K), and epsilon(K). We also describe the behavior of epsilon under cabling, allowing one to compute tau of iterated cables. Various properties and applications of epsilon are also discussed.
Comments: 40 pages, 13 figures. v2: minor revisions throughout, 2 additional figures. This is the version to appear in the Journal of Topology
The knot Floer complex and the smooth concordance group
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