On commutator length in free groups

Abstract

Let F be a free group. We present for arbitrary g∈N a LogSpace (and thus polynomial time) algorithm that determines whether a given w∈ F is a product of at most g commutators; and more generally an algorithm that determines, given w∈ F, the minimal g such that w may be written as a product of g commutators (and returns ∞ if no such g exists). The algorithm also returns words x1,y1,…,xg,yg such that w=[x1,y1]·s[xg,yg]. The algorithms we present are also efficient in practice. Using them, we produce the first example of a word in the free group whose commutator length decreases under taking a square. This disproves in a very strong sense a conjecture by Bardakov.