English

A new characterization of simple $K_3$-groups using same-order type

Group Theory 2021-05-10 v2

Abstract

Let GG be a group, define an equivalence relation \sim as below:  g,hG, ghg=h\forall \ g, h \in G, \ g \sim h \Longleftrightarrow |g| = |h| the set of sizes of equivalence classes with respect to this relation is called the same-order type of GG and denoted by α(G)\alpha(G). And GG is said a αn\alpha_n-group if α(G)=n|\alpha(G)|=n. Let π(G)\pi(G) be the set of prime divisors of the order of GG. A simple group of GG is called a simple KnK_n-group if π(G)=n|\pi(G)|=n. We give a new characterization of simple K3K_3-groups using same-order type. Indeed we prove that a nonabelian simple group GG has same-order type \{r, m, n, k, l\} if and only if GPSL(2,q)G \cong PSL(2,q), with q=7,8q=7, 8 or 99. This result generalizes the main results in \cite{KKA}, \cite{Sh} and \cite{TZ1}. Motived by the main result in \cite{TZ1} L. J. Taghvasani and M. Zarrin put the following Conjecture 2.10: \textit{Let SS be a nonabelian simple αn\alpha_n-group and GG a αn\alpha_n-group such that S=G|S|=|G|. Then SGS \cong G}. In this paper with a counterexample we give a negative answer to this question.

Keywords

Cite

@article{arxiv.1912.00125,
  title  = {A new characterization of simple $K_3$-groups using same-order type},
  author = {Igor Lima and Josyane Pereira},
  journal= {arXiv preprint arXiv:1912.00125},
  year   = {2021}
}

Comments

Any suggestions are welcome. A mistake has been corrected

R2 v1 2026-06-23T12:31:44.803Z