On the subgroup separability of the free product of groups

Abstract

Suppose that C is a root class of groups (i.e., a class of groups that contains non-trivial groups and is closed under taking subgroups and unrestricted wreath products), G is the free product of residually C-groups Ai (i ∈ I), and H is a subgroup of G satisfying a non-trivial identity. We prove a criterion for the C-separability of H in G. It follows from this criterion that, if \Vj j ∈ J\ is a family of group varieties, each Vj (j ∈ J) is distinct from the variety of all groups, and V = j ∈ J Vj, then one can give a description of C-separable V-subgroups of G provided such a description is known for every group Ai (i ∈ I).