Dynamics and Topology of S-gap Shifts

Abstract

Let S=\si∈ N\0\:0≤ si<si+1\ and let d0=s0 and (S)=\dn\n where dn=sn-sn-1. In this note, we show that an S-gap shift is subshift of finite type (SFT) if and only if S is finite or cofinite, is almost-finite-type (AFT) if and only if (S) is eventually constant and is sofic if and only if (S) is eventually periodic. We also show that there is a one-to-one correspondence between the set of all S-gap shifts and \r ∈ R: r ≥ 0\ \1n: n ∈ N\ up to conjugacy. This enables us to induce a topology and measure structure on the set of all S-gaps. By using this, we give the frequency of certain S-gap shifts with respect to their dynamical properties.