On generalized σ-soluble groups

Abstract

Let σ =\σi | i∈ I\ be a partition of the set of all primes P and G a finite group. Let σ (G)=\σ i : σ i π (G) . A set H of subgroups of G is said to be a complete Hall σ -set of G if every member 1 of H is a Hall σ i-subgroup of G for some i∈ I and H contains exactly one Hall σ i-subgroup of G for every i such that σ i∈ σ (G). We say that G is σ-full if G possesses a complete Hall σ -set. A complete Hall σ -set H of G is said to be a σ-basis of G if every two subgroups A, B ∈ H are permutable, that is, AB=BA. In this paper, we study properties of finite groups having a σ-basis. In particular, we prove that if G has a a σ-basis, then G is generalized σ-soluble, that is, G has a complete Hall σ -set and for every chief factor H/K of G we have |σ (H/K)|≤ 2. Moreover, answering to Problem 8.28 in [A.N. Skiba, On some results in the theory of finite partially soluble groups, Commun. Math. Stat., 4(3) (2016), 281--309], we prove the following Theorem A. Suppose that G is σ-full. Then every complete Hall σ-set of G forms a σ-basis of G if and only if G is generalized σ-soluble and for the automorphism group G/CG(H/K), induced by G on any its chief factor H/K, we have either σ (H/K)=σ (G/CG(H/K)) or σ (H/K) =\σ i\ and G/CG(H/K) is a σ i σ j-group for some i j.