Translation equivalence in free groups

Motivated by the work of Leininger on hyperbolic equivalence of homotopy classes of closed curves on surfaces, we investigate a similar phenomenon for free groups. Namely, we study the situation when two elements $g,h$ in a free group $F$ have the property that for every free isometric action of $F$ on an $\mathbb{R}$-tree $X$ the translation lengths of $g$ and $h$ on $X$ are equal. We give a combinatorial characterization of this phenomenon, called translation equivalence, in terms of Whitehead graphs and exhibit two difference sources of it. The first source of translation equivalence comes from representation theory and $SL_2$ trace identities. The second source comes from geometric properties of groups acting on real trees and a certain power redistribution trick. We also analyze to what extent these are applicable to the tree actions of surface groups that occur in the Thurston compactification of the Teichmuller space.