On the intersection of the F-maximal subgroups and the generalized F-hypercentre of a finite group

Abstract

Let F be a class of groups. A chief factor H/K of a group G is called F-central in G provided (H/K) (G/CG(H/K)) ∈ F. We write Zπ F(G) to denote the product of all normal subgroups of G whose G-chief factors of order divisible by at least one prime in π are F-central. We call Zπ F(G) the π F-hypercentre of G. A subgroup U of a group G is called F-maximal in G provided that (a) U∈ F, and (b) if U≤ V≤ G and V∈ F, then U=V. In this paper we study the properties of the intersection of all F-maximal subgroups of a finite group. In particular, we analyze the condition under which Zπ F(G) coincides with the intersection of all F-maximal subgroups of G.