English

On n-punctured ball tangles

Geometric Topology 2007-05-23 v4

Abstract

We consider a class of topological objects in the 3-sphere S3S^3 which will be called {\it nn-punctured ball tangles}. Using the Kauffman bracket at A=eπi/4A=e^{\pi i/4}, an invariant for a special type of nn-punctured ball tangles is defined. The invariant FF takes values in PM2×2n(Z)PM_{2\times2^n}(\mathbb Z), that is the set of 2×2n2\times 2^n matrices over Z\mathbb Z modulo the scalar multiplication of ±1\pm1. This invariant leads to a generalization of a theorem of D. Krebes which gives a necessary condition for a given collection of tangles to be embedded in a link in S3S^3 disjointly. We also address the question of whether the invariant FF is surjective onto PM2×2n(Z)PM_{2\times2^n}(\mathbb Z). We will show that the invariant FF is surjective when n=0n=0. When n=1n=1, nn-punctured ball tangles will also be called spherical tangles. We show that detF(S)=0\text{det} F(S)=0 or 1 {\rm mod} 4 for every spherical tangle SS. Thus FF is not surjective when n=1n=1.

Keywords

Cite

@article{arxiv.math/0502176,
  title  = {On n-punctured ball tangles},
  author = {Jae-Wook Chung and Xiao-Song Lin},
  journal= {arXiv preprint arXiv:math/0502176},
  year   = {2007}
}

Comments

34 pages, 13 figures. Corrected Definition 4.13