On the separability of subgroups of nilpotent groups by root classes of groups

Abstract

Suppose that C is a class of groups consisting only of periodic groups and P(C) is the set of prime numbers each of which does not divide the order of any element of a C-group. A subgroup Y of a group X is called a) C-separable in this group if, for each x ∈ X Y, there exists a homomorphism σ of X onto a group from C such that xσ Yσ; b) P(C)-isolated in X if, for any x ∈ X, q ∈ P(C), the inclusion xq ∈ Y implies that x ∈ Y. It is easy to see that if Y is C-separable in X, then it is P(C)-isolated in this group. Let us say that X has the property C-Sep if all its P(C)-isolated subgroups are C-separable. We find a condition that is sufficient for a nilpotent group N to have the property C-Sep provided C is a root class (i.e., it contains non-trivial groups and is closed under taking subgroups, extensions, and Cartesian products of the form Πv ∈ VUv, where U, V ∈ C and Uv is an isomorphic copy of U for each v ∈ V). We also prove that if N is torsion-free, then the indicated condition is necessary for this group to have C-Sep.