English

Embedding surfaces into $S^3$ with maximum symmetry

Geometric Topology 2016-06-07 v4 Combinatorics Group Theory

Abstract

We restrict our discussion to the orientable category. For g>1g > 1, let OEgOE_g be the maximum order of a finite group GG acting on the closed surface Σg\Sigma_g of genus gg which extends over (S3,Σg)(S^3, \Sigma_g), where the maximum is taken over all possible embeddings ΣgS3\Sigma_g\hookrightarrow S^3. We will determine OEgOE_g for each gg, indeed the action realizing OEgOE_g. In particular, with 23 exceptions, OEgOE_g is 4(g+1)4(g+1) if gk2g\ne k^2 or 4(g+1)24(\sqrt{g}+1)^2 if g=k2g=k^2, and moreover OEgOE_g can be realized by unknotted embeddings for all gg except for g=21g=21 and 481481.

Keywords

Cite

@article{arxiv.1209.1170,
  title  = {Embedding surfaces into $S^3$ with maximum symmetry},
  author = {Chao Wang and Shicheng Wang and Yimu Zhang and Bruno Zimmermann},
  journal= {arXiv preprint arXiv:1209.1170},
  year   = {2016}
}

Comments

42 pages, 37 figures, 6 tables of figures

R2 v1 2026-06-21T22:00:39.437Z