Primitivity rank for random elements in free groups

Abstract

For a free group Fr of finite rank r 2 and a nontrivial element w∈ Fr the primitivity rank π(w) is the smallest rank of a subgroup H Fr such that w∈ H and that w is not primitive in H (if no such H exists, one puts π(w)=∞). The set of all subgroups of Fr of rank π(w) containing w as a non-primitive element is denoted Crit(w). These notions were introduced by Puder in Pu14. We prove that there exists an exponentially generic subset V⊂eq Fr such that for every w∈ V we have π(w)=r and Crit(w)=\Fr\.