Retracts of free groups and a question of Bergman

Abstract

Let Fn be a free group of finite rank n ≥ 2. We prove that if H is a subgroup of Fn with rk(H)=2 and R is a retract of Fn, then H R is a retract of H. However, for every m ≥ 3 and every 1 ≤ k ≤ n-1, there exist a subgroup H of Fn of rank m and a retract R of Fn of rank k such that H R is not a retract of H. This gives a complete answer to a question of Bergman. Furthermore, we provide positive evidence for the inertia conjecture of Dicks and Ventura. More precisely, we prove that rk(H Fix(S)) ≤ rk(H) for every family S of endomorphisms of Fn and every subgroup H of Fn with rk(H) ≤ 3.