Orbit decidability and the conjugacy problem for some extensions of groups

Abstract

Given a short exact sequence of groups with certain conditions, 1 F G H 1, we prove that G has solvable conjugacy problem if and only if the corresponding action subgroup A≤slant Aut(F) is orbit decidable. From this, we deduce that the conjugacy problem is solvable, among others, for all groups of the form Z2 Fm, F2 Fm, Fn Z, and Zn A Fm with virtually solvable action group A≤slant GLn(Z). Also, we give an easy way of constructing groups of the form Z4 Fn and F3 Fn with unsolvable conjugacy problem. On the way, we solve the twisted conjugacy problem for virtually surface and virtually polycyclic groups, and give an example of a group with solvable conjugacy problem but unsolvable twisted conjugacy problem. As an application, an alternative solution to the conjugacy problem in Aut(F2) is given.