English

Nonorientable surfaces bounded by knots: a geography problem

Geometric Topology 2020-07-29 v1

Abstract

The nonorientable 4-genus is an invariant of knots which has been studied by many authors, including Gilmer and Livingston, Batson, and Ozsv\'{a}th, Stipsicz, and Szab\'{o}. Given a nonorientable surface FB4F \subset B^4 with F=KS3\partial F = K\subset S^3 a knot, an analysis of the existing methods for bounding and computing the nonorientable 4-genus reveals relationships between the first Betti number β1\beta_1 of FF and the normal Euler class ee of FF. This relationship yields a geography problem: given a knot KK, what is the set of realizable pairs (e(F),β1(F))(e(F), \beta_1(F)) where FB4F\subset B^4 is a nonorientable surface bounded by KK? We explore this problem for families of torus knots. In addition, we use the Ozsv\'ath-Szab\'o dd-invariant of two-fold branched covers to give finer information on the geography problem. We present an infinite family of knots where this information provides an improvement upon the bound given by Ozsv\'ath, Stipsicz, and Szab\'o using the Upsilon invariant.

Keywords

Cite

@article{arxiv.2007.14332,
  title  = {Nonorientable surfaces bounded by knots: a geography problem},
  author = {Samantha Allen},
  journal= {arXiv preprint arXiv:2007.14332},
  year   = {2020}
}

Comments

17 pages, 14 figures

R2 v1 2026-06-23T17:28:14.098Z