On the Order of Products of Coprime Elements in Finite Groups

Abstract

In this work, we introduce the subgroups Dm(G) and Dm,n(G), defined in terms of the orders of products of coprime elements in a finite group G. We show that both subgroups are characteristic, that Dm,n(G) is always nilpotent, and that their nilpotent structure provides a characterization of Frobenius group decompositions. Furthermore, we define the E-series, which extends this framework to the study of an important class of solvable groups of Fitting height at most 4. We prove that a finite group G has an E-series of length at most 4 if and only if there exists a characteristic subgroup F ≤ G such that G/F is nilpotent and F is either nilpotent, a Frobenius group, or a 2-Frobenius group.