Quasiperiodic and mixed commutator factorizations in free products of groups

Abstract

It is well known that a nontrivial commutator in a free group is never a proper power. We prove a theorem that generalizes this fact and has several worthwhile corollaries. For example, an equation [ x1, y1] … [ xk, yk] = zn, where n 2k, in a free product F of groups without nontrivial elements of order n implies that z is conjugate to an element of a free factor of F. If a nontrivial commutator in a free group factors into a product of elements which are conjugate to each other then all these elements are distinct.