On a lattice characterization of finite soluble PST-groups

Abstract

Let F be a class of finite groups and G a finite group. Let LF(G) be the set of all subgroups A of G with AG/AG∈ F. A chief factor H/K of G is F-central in G if (H/K) (G/CG(H/K)) ∈F. We study the structure of G under the hypothesis that every chief factor of G between AG and AG is F-central in G for every subgroup A∈ LF(G). As an application, we prove that a finite soluble group G is a PST-group if and only if AG/AG≤ Z∞(G/AG) for every subgroup A∈ LN(G), where N is the class of all nilpotent groups.