Equivalencies between beta-shifts and S-gap shifts

Abstract

Let Xβ be a sofic β -shift for β ∈ (1, 2] . We show that there is an S -gap shift X(S) such that Xβ and X(S) are right-resolving almost conjugate. Conversely, a condition on S ⊂eq N \0\ is given such that for this S, there is a β such that X(S) and Xβ have the same equivalency. We show that if Xβ is SFT, then there is an S-gap shift conjugate to this Xβ; however, if Xβ is not SFT, then no S-gap shift is conjugate to Xβ. Also we will investigate the existence of these sort of equivalencies for non-sofics.