Recognition by the set of exponents in the prime factorization of the product of element orders

Abstract

Let G be a finite group. Let (G) = Πg ∈ G o(g)=p1α1 p2α2 ·s pkαk, where p1, p2, ·s, pk are distinct prime numbers and o(g) denotes the order of g ∈ G. The set of exponents in the prime factorization of the product of element orders is denoted by Exp(G), i.e., Exp(G)=\α1,α2, ·s,αk\. In this paper, we give a new characterization for some groups by Exp(G). We prove that the groups PSL(2, 5) × Zp, PSL(2, 7) and PSL(2, 11) are uniquely determined by Exp(G). Furthermore, we prove that the groups PSL(2, 5) and PSL(2, 13) are uniquely determined by the parameters Exp(G) and |G|. Additionally, we prove that if Exp(G) = Exp(Z2qr), then G PSL(2, 5) or G Z2qr, where q and r are distinct odd prime numbers.