English

Regular maps of order $2$-powers

Combinatorics 2019-01-23 v1

Abstract

In this paper, we consider the possible types of regular maps of order 2n2^n, where the order of a regular map is the order of automorphism group of the map. For n11n \le 11, M. Conder classified all regular maps of order 2n2^n. It is easy to classify regular maps of order 2n2^n whose valency or covalency is 22 or 2n12^{n-1}. So we assume that n12n \geq 12 and 2s,tn22\leq s,t\leq n-2 with sts\leq t to consider regular maps of order 2n2^n with type {2s,2t}\{2^s, 2^t\}. We show that for s+tns+t\leq n or for s+t>ns+t>n with s=ts=t, there exists a regular map of order 2n2^n with type {2s,2t}\{2^s, 2^t\}, and furthermore, we classify regular maps of order 2n2^n with types {2n2,2n2}\{2^{n-2},2^{n-2}\} and {2n3,2n3}\{2^{n-3},2^{n-3}\}. We conjecture that, if s+t>ns+t>n with s<ts<t, then there is no regular map of order 2n2^n with type {2s,2t}\{2^s, 2^t\}, and we confirm the conjecture for t=n2t=n-2 and n3n-3.

Cite

@article{arxiv.1901.07135,
  title  = {Regular maps of order $2$-powers},
  author = {Dong-Dong Hou and Yan-Quan Feng and Young Soo Kwon},
  journal= {arXiv preprint arXiv:1901.07135},
  year   = {2019}
}

Comments

16pages

R2 v1 2026-06-23T07:17:59.487Z