Conjugacy Distinguished Subgroups

Abstract

Let C be a nonempty class of finite groups closed under taking subgroups, homomorphic images and extensions. A subgroup H of an abstract residually C group R is said to be conjugacy C-distinguished if whenever y∈ R, then y has a conjugate in H if and only if the same holds for the images of y and H in every quotient group R/N∈ C of R. We prove that in a group having a normal free subgroup such that R/ is in C, every finitely generated subgroup is conjugacy C-distinguished. We also prove that finitely generated subgroups of limit groups, of Lyndon groups and certain one-relator groups are conjugacy distinguished ( C here is the class of all finite groups).