On the dynamics of endomorphisms of the direct product of two free groups

Abstract

We prove that Brinkmann's problems are decidable for endomorphisms of Fn× Fm: given (x,y),(z,w)∈ Fn× Fm and ∈ End(Fn× Fm), it is decidable whether there is some k∈ N such that (x,y)k=(z,w) (or (x,y)k(z,w)). We also prove decidability of a two-sided version of Brinkmann's conjugacy problem for injective endomorphisms which, from the work of Logan, yields a solution to the conjugacy problem in ascending HNN-extensions of Fn× Fm. Finally, we study the dynamics of automorphisms of Fn× Fm at the infinity, proving that that their dynamics at the infinity is asymptotically periodic, as occurs in the free and free-abelian times free cases.