Concordance invariants from higher order covers
Geometric Topology
2008-09-08 v1 Algebraic Topology
Abstract
We generalize the Manolescu-Owens smooth concordance invariant delta(K) of knots K in the 3-sphere to invariants delta_{p^n}(K) obtained by considering covers of order p^n, with p prime. Our main result shows that for any odd prime p, the direct sum of delta_{p^n} as n ranges through the natural numbers, yields a homomorphism of infinite rank from the smooth concordance group to Z^\infty. We also show that unlike delta, these new invariants typically are not multiples of the knot signature, even for alternating knots. A significant portion of the article is devoted to exploring examples.
Cite
@article{arxiv.0809.1088,
title = {Concordance invariants from higher order covers},
author = {Stanislav Jabuka},
journal= {arXiv preprint arXiv:0809.1088},
year = {2008}
}
Comments
23 pages, 9 figures