English

The Powell Conjecture and reducing sphere complexes

Geometric Topology 2019-08-07 v1

Abstract

The Powell Conjecture offers a finite generating set for the genus gg Goeritz group, the group of automorphisms of S3S^3 that preserve a genus gg Heegaard surface Σg\Sigma_g, generalizing a classical result of Goeritz in the case g=2g=2. We study the relationship between the Powell Conjecture and the reducing sphere complex R(Σg)\mathcal{R}(\Sigma_g), the subcomplex of the curve complex C(Σg)\mathcal{C}(\Sigma_g) spanned by the reducing curves for the Heegaard splitting. We prove that the Powell Conjecture is true if and only if R(Σg)\mathcal{R}(\Sigma_g) is connected. Additionally, we show that reducing curves that meet in at most six points are connected by a path in R(Σg)\mathcal{R}(\Sigma_g); however, we also demonstrate that even among reducing curves meeting in four points, the distance in R(Σg)\mathcal{R}(\Sigma_g) between such curves can be arbitrarily large. We conclude with a discussion of the geometry of R(Σg)\mathcal{R}(\Sigma_g).

Keywords

Cite

@article{arxiv.1906.07664,
  title  = {The Powell Conjecture and reducing sphere complexes},
  author = {Alexander Zupan},
  journal= {arXiv preprint arXiv:1906.07664},
  year   = {2019}
}

Comments

21 pages, many figures

R2 v1 2026-06-23T09:57:06.157Z