Orbit equivalent substitution dynamical systems and complexity

Abstract

For any primitive proper substitution σ, we give explicit constructions of countably many pairwise non-isomorphic substitution dynamical systems (Xζn, Tζn)n=1∞ such that they all are (strong) orbit equivalent to (Xσ, Tσ). We show that the complexity of the substitution dynamical systems (Xζn, Tζn) is essentially different that prevents them from being isomorphic. Given a primitive (not necessarily proper) substitution τ, we find a stationary simple properly ordered Bratteli diagram with the least possible number of vertices such that the corresponding Bratteli-Vershik system is orbit equivalent to (Xτ, Tτ).