On the conjugacy problem for finite-state automorphisms of regular rooted trees

Abstract

We study the conjugacy problem in the automorphism group Aut(T) of a regular rooted tree T and in its subgroup FAut(T) of finite-state automorphisms. We show that under the contracting condition and the finiteness of what we call the orbit-signalizer, two finite-state automorphisms are conjugate in Aut(T) if and only if they are conjugate in FAut(T), and that this problem is decidable. We prove that both these conditions are satisfied by bounded automorphisms and establish that the (simultaneous) conjugacy problem in the group of bounded automata is decidable.