English

Conjugacy classes of maximal cyclic subgroups

Group Theory 2022-01-19 v1

Abstract

In this paper, we set η(G)\eta (G) to be the number of conjugacy classes of maximal cyclic subgroups of GG. We consider η\eta and direct and semi-direct products. We characterize the normal subgroups NN so that η(G/N)=η(G)\eta (G/N) = \eta (G). We set G={gGg is not maximal cyclic}G^- = \{ g \in G \mid \langle g \rangle {\rm ~is~not ~maximal~cyclic} \}. We show if G<G\langle G^- \rangle < G, then G/GG/\langle G^- \rangle is either (1) an elementary abelian pp-group for some prime pp, (2) a Frobenius group whose Frobenius kernel is a pp-group of exponent pp and a Frobenius complement has order qq for distinct primes pp and qq, or (3) isomorphic to A5A_5.

Keywords

Cite

@article{arxiv.2201.05637,
  title  = {Conjugacy classes of maximal cyclic subgroups},
  author = {M. Bianchi and R. D. Camina and Mark L. Lewis and E. Pacifici},
  journal= {arXiv preprint arXiv:2201.05637},
  year   = {2022}
}

Comments

18 pages

R2 v1 2026-06-24T08:50:34.765Z