The conjugacy problem for UPG elements of Out(Fn)

Abstract

An element φ of the outer automorphism group () of the rank n free group Fn is polynomially growing if the word lengths of conjugacy classes in grow at most polynomially under iteration by φ. It is unipotent if additionally its action on the first homology of with integer coefficients is unipotent. In particular, if φ is polynomially growing and acts trivially on first homology with coefficients the integers mod 3 then φ is unipotent and also every polynomially growing element has a positive power that is unipotent. We solve the conjugacy problem in () for the subset of unipotent elements. Specifically, there is an algorithm that decides if two such are conjugate in ().