Classification of automorphic conjugacy classes in the free group on two generators

Abstract

We associate a finite directed graph with each equivalence class of words in F2 under *Aut F2, and we completely classify these graphs, giving a structural classification of the automorphic conjugacy classes of F2. This classification refines work of Khan and proves a conjecture of Myasnikov and Shpilrain on the number of minimal words in an automorphic conjugacy class whose minimal words have length n, which in turn implies a sharp upper bound on the running time of Whitehead's algorithm for determining whether two words in F2 are automorphic conjugates.