English

Braid Index Bounds Ropelength From Below

Geometric Topology 2019-01-31 v1

Abstract

For an un-oriented link K\mathcal{K}, let L(K)L(\mathcal{K}) be the ropelength of K\mathcal{K}. It is known that when K\mathcal{K} has more than one component, different orientations of the components of K\mathcal{K} may result in different braid index. We define the largest braid index among all braid indices corresponding to all possible orientation assignments of K\mathcal{K} the {\em absolute braid index} of K\mathcal{K} and denote it by B(K)\textbf{B}(\mathcal{K}). In this paper, we show that there exists a constant a>0a>0 such that L(K)aB(K)L(\mathcal{K})\ge a \textbf{B}(\mathcal{K}) for any K\mathcal{K}, {\em i.e.}, the ropelength of any link is bounded below by its absolute braid index (up to a constant factor).

Cite

@article{arxiv.1901.10663,
  title  = {Braid Index Bounds Ropelength From Below},
  author = {Yuanan Diao},
  journal= {arXiv preprint arXiv:1901.10663},
  year   = {2019}
}
R2 v1 2026-06-23T07:26:36.125Z