English

Several Quantitative Characterizations of Some Specific Groups

Group Theory 2017-05-16 v1

Abstract

Let GG be a finite group and let π(G)={p1,p2,,pk}\pi(G)=\{p_1, p_2, \ldots, p_k\} be the set of prime divisors of G|G| for which p1<p2<<pkp_1<p_2<\cdots<p_k. The Gruenberg-Kegel graph of GG, denoted GK(G){\rm GK}(G), is defined as follows: its vertex set is π(G)\pi(G) and two different vertices pip_i and pjp_j are adjacent by an edge if and only if GG contains an element of order pipjp_ip_j. The degree of a vertex pip_i in GK(G){\rm GK}(G) is denoted by dG(pi)d_G(p_i) and the kk-tuple D(G)=(dG(p1),dG(p2),,dG(pk))D(G)=\left(d_G(p_1), d_G(p_2), \ldots, d_G(p_k)\right) is said to be the degree pattern of GG. Moreover, if ωπ(G)\omega \subseteq \pi(G) is the vertex set of a connected component of GK(G){\rm GK}(G), then the largest ω\omega-number which divides G|G|, is said to be an order component of GK(G){\rm GK}(G). We will say that the problem of OD-characterization is solved for a finite group if we find the number of pairwise non-isomorphic finite groups with the same order and degree pattern as the group under study. The purpose of this article is twofold. First, we completely solve the problem of OD-characterization for every finite non-abelian simple group with orders having prime divisors at most 29. In particular, we show that there are exactly two non-isomorphic finite groups with the same order and degree pattern as U4(2)U_4(2). Second, we prove that there are exactly two non-isomorphic finite groups with the same order components as U5(2)U_5(2).

Keywords

Cite

@article{arxiv.1511.08558,
  title  = {Several Quantitative Characterizations of Some Specific Groups},
  author = {A. Mohammadzadeh and A. R. Moghaddamfar},
  journal= {arXiv preprint arXiv:1511.08558},
  year   = {2017}
}

Comments

14 pages

R2 v1 2026-06-22T11:55:18.923Z