(S,w)-Gap Shifts and Their Entropy

Abstract

The S-gap shifts have a dynamically and combinatorially rich structure. Dynamical properties of the S-gap shift can be related to the properties of the set S. This interplay is particularly interesting when S is not syndetic such as when S is the set of prime numbers or when S=\2n\. It is a well known result that the entropy of the S-gap shift is given by h(X) = λ, where λ>0 is the unique solution to the equation Σn ∈ S λ-(n+1)=1. Fix a point w of the full shift \1,2, …, k\Z. We introduce the (S,w)-gap shift which is a generalization of the S-gap shift consisting of sequences in \0,1, …, k\Z in which any two 0's are separated by a word u appearing in w such that |u|∈ S. We extend the formula for the entropy of the S-gap shift to a formula describing the entropy of this new class of shift spaces. Additionally we investigate the dynamical properties including irreducibility and mixing of this generalization of the S-gap shift.