English

Absolutely split metacyclic groups and weak metacirculants

Combinatorics 2018-01-29 v1

Abstract

Let m,n,rm,n,r be positive integers, and let G=a:bZn:ZmG=\langle a\rangle: \langle b\rangle \cong \mathbb{Z}_n: \mathbb{Z}_m be a split metacyclic group such that b1ab=arb^{-1}ab=a^r. We say that GG is {\em absolutely split with respect to a\langle a\rangle} provided that for any xGx\in G, if xa=1\langle x\rangle\cap\langle a\rangle=1, then there exists yGy\in G such that xyx\in\langle y\rangle and G=a:yG=\langle a\rangle: \langle y\rangle. In this paper, we give a sufficient and necessary condition for the group GG being absolutely split. This generalizes a result of Sanming Zhou and the second author in [arXiv: 1611.06264v1]. We also use this result to investigate the relationship between metacirculants and weak metacirculants. Metacirculants were introduced by Alspach and Parsons in 19821982 and have been a rich source of various topics since then. As a generalization of this classes of graphs, Maru\v si\v c and \v Sparl in 2008 posed the so called weak metacirculants. A graph is called a {\em weak metacirculant} if it has a vertex-transitive metacyclic automorphism group. In this paper, it is proved that a weak metacirculant of 22-power order is a metacirculant if and only if it has a vertex-transitive split metacyclic automorphism group. This provides a partial answer to an open question in the literature.

Keywords

Cite

@article{arxiv.1801.08681,
  title  = {Absolutely split metacyclic groups and weak metacirculants},
  author = {Li Cui and Jin-Xin Zhou},
  journal= {arXiv preprint arXiv:1801.08681},
  year   = {2018}
}
R2 v1 2026-06-22T23:57:28.211Z