Suffix conjugates for a class of morphic subshifts

Abstract

Let A be a finite alphabet and f: A* --> A* be a morphism with an iterative fixed point fω(α), where α is in A. Consider the subshift (X, T), where X is the shift orbit closure of fω(α) and T: X --> X is the shift map. Let S be a finite alphabet that is in bijective correspondence via a mapping c with the set of nonempty suffixes of the images f(a) for a in A. Let calS be a subset SN be the set of infinite words s = (sn)n≥ 0 such that π(s):= c(s0)f(c(s1)) f2(c(s2))... is in X. We show that if f is primitive and f(A) is a suffix code, then there exists a mapping H: calS --> calS such that (calS, H) is a topological dynamical system and π: (calS, H) --> (X, T) is a conjugacy; we call (calS, H) the suffix conjugate of (X, T). In the special case when f is the Fibonacci or the Thue-Morse morphism, we show that the subshift (calS, T) is sofic, that is, the language of calS is regular.