Covering link calculus and iterated Bing doubles

Cha, Jae Choon; Kim, Taehee

doi:10.2140/gt.2008.12.2173

Geodesic

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Covering link calculus and iterated Bing doubles

Cha, Jae Choon ¹ ; Kim, Taehee ²

¹ Department of Mathematics and Pohang Mathematics Institute, Pohang University of Science and Technology, Pohang, Gyungbuk 790–784, Republic of Korea
² Department of Mathematics, Konkuk University, Seoul 143–701, Republic of Korea

Geometry & topology, Tome 12 (2008) no. 4, pp. 2173-2201.

Voir la notice de l'article provenant de la source Mathematical Sciences Publishers

Résumé

We give a new geometric obstruction to the iterated Bing double of a knot being a slice link: for $n > 1$ the $(n + 1)$ –st iterated Bing double of a knot is rationally slice if and only if the $n$ –th iterated Bing double of the knot is rationally slice. The main technique of the proof is a covering link construction simplifying a given link. We prove certain similar geometric obstructions for $n \leq 1$ as well. Our results are sharp enough to conclude, when combined with algebraic invariants, that if the $n$ –th iterated Bing double of a knot is slice for some $n$ , then the knot is algebraically slice. Also our geometric arguments applied to the smooth case show that the Ozsváth–Szabó and Manolescu–Owens invariants give obstructions to iterated Bing doubles being slice. These results generalize recent results of Harvey, Teichner, Cimasoni, Cha and Cha–Livingston–Ruberman. As another application, we give explicit examples of algebraically slice knots with nonslice iterated Bing doubles by considering von Neumann $ρ$ –invariants and rational knot concordance. Refined versions of such examples are given, that take into account the Cochran–Orr–Teichner filtration.

DOI : 10.2140/gt.2008.12.2173

Keywords: iterated Bing doubles, covering links, slice links, rational concordance, von Neumann $\rho$–invariants, Heegaard Floer invariants

Affiliations des auteurs :

Cha, Jae Choon ¹ ; Kim, Taehee ²

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Cha, Jae Choon; Kim, Taehee. Covering link calculus and iterated Bing doubles. Geometry & topology, Tome 12 (2008) no. 4, pp. 2173-2201. doi : 10.2140/gt.2008.12.2173. http://geodesic.mathdoc.fr/articles/10.2140/gt.2008.12.2173/

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