On modules over group rings of groups with restrictions on the system of all proper subgroups

Abstract

We consider the class M of R--modules where R is an associative ring. Let A be a module over a group ring RG where G is a group and let L(G) be a set of all proper subgroups of G such that if H ∈ L(G) then A/CA(H) belongs to M. We study an RG--module A such that G = G', CG(A) = 1, A/CA(G) ∈ M, and M is one of the classes: artinian R--modules, minimax R--modules, finite R--modules. We consider the cases: 1) M is a class of all artinian R--modules, R is either a ring of integers or a ring of p--adic integers; 2) M is a class of all minimax R--modules, R is a ring of integers, G is a locally soluble group; 3) M is a class of all finite R--modules, R is an associative ring. In these cases we prove that G is isomorphic to a quasi--cyclic q--group for some prime q.