English

Unknotted Curves on Seifert Surfaces

Geometric Topology 2024-07-24 v1

Abstract

We consider homologically essential simple closed curves on Seifert surfaces of genus one knots in S3S^3, and in particular those that are unknotted or slice in S3S^3. We completely characterize all such curves for most twist knots: they are either positive or negative braid closures; moreover, we determine exactly which of those are unknotted. A surprising consequence of our work is that the figure eight knot admits infinitely many unknotted essential curves up to isotopy on its genus one Seifert surface, and those curves are enumerated by Fibonacci numbers. On the other hand, we prove that many twist knots admit homologically essential curves that cannot be positive or negative braid closures. Indeed, among those curves, we exhibit an example of a slice but not unknotted homologically essential simple closed curve. We further investigate our study of unknotted essential curves for arbitrary Whitehead doubles of non-trivial knots, and obtain that there is a precisely one unknotted essential simple closed curve in the interior of the doubles' standard genus one Seifert surface. As a consequence of all these we obtain many new examples of 3-manifolds that bound contractible 4-manifolds.

Keywords

Cite

@article{arxiv.2307.04313,
  title  = {Unknotted Curves on Seifert Surfaces},
  author = {Subhankar Dey and Veronica King and Colby T. Shaw and Bülent Tosun and Bruce Trace},
  journal= {arXiv preprint arXiv:2307.04313},
  year   = {2024}
}

Comments

26 pages

R2 v1 2026-06-28T11:25:36.922Z