Shifts of Finite Type Obtained by Forbidding a Single Pattern

Abstract

Given a finite word w, Guibas and Odlyzko (J. Combin. Theory Ser. A, 30, 1981, 183-208) showed that the autocorrelation polynomial φw(t) of w, which records the set of self-overlaps of w, explicitly determines for each n, the number |Bn(w)| of words of length n that avoid w. We consider this and related problems from the viewpoint of symbolic dynamics, focusing on the setting of X\w\, the space of all bi-infinite sequences that avoid w. We first summarize and elaborate upon (J. Combin. Theory Ser. A, 30, 1981, 183-208) and other work to show that the sequence |Bn(w)| is equivalent to several invariants of X\w\. We then give a finite-state labeled graphical representation Lw of X\w\ and show that w can be recovered from the graph isomorphism class of the unlabeled version of Lw. Using Lw, we apply ideas from probability and Perron-Frobenius theory to obtain results comparing features of X\w\ for different w. Next, we give partial results on the problem of classifying the spaces X\w\ up to conjugacy. Finally, we extend some of our results to spaces of multi-dimensional arrays that avoid a given finite pattern.