On conditions for the approximability of the fundamental groups of graphs of groups by root classes of groups

Abstract

Suppose that is a non-empty connected graph, G is the fundamental group of a graph of groups over , and C is a root class of groups (the last means that C contains non-trivial groups and is closed under taking subgroups, extensions, and Cartesian powers of a certain type). It is known that G is residually a C-group if it has a homomorphism onto a group from C acting injectively on all vertex groups. We prove that, in this assertion, the words "vertex groups" can be replaced by "edge subgroups" provided all vertex groups are residually C-groups. We also show that the converse doesn't need to hold if C consists of periodic groups and contains at least one infinite group.