Generating Infinitely Many Hyperbolic Knots with Plats
Abstract
In this paper we study the relationships between links in plat position, the dynamics of the braid group, and Heegaard splittings of double branched covers of over a link. These relationships offer new ways to view links in plat position and a new tool kit for analyzing links. In particular, we show that the Hempel distance of the Heegaard splitting of the double branched cover obtained from a plat is a lower bound for the Hempel distance of that plat. Using the Hempel distance of a knot in bridge position and pseudo-Anosov braids we obtain our main result: a construction of infinitely many sequences of prime hyperbolic -bridge knots for , infinitely many of which are distinct. We consider known results to show that the knot genus and hyperbolic volume of these knots are bounded below by a linear function.
Keywords
Cite
@article{arxiv.2410.17443,
title = {Generating Infinitely Many Hyperbolic Knots with Plats},
author = {Carolyn Engelhardt and Seth Hovland},
journal= {arXiv preprint arXiv:2410.17443},
year = {2024}
}
Comments
17 pages, 14 figures,v2. Major changes include: removing Section 5, the main result of the section was proved in greater generality by Ichihara and Ma in "A random link via bridge position is hyperbolic", an added discussion and examples of highly-twisted plats and Hempel distance