The number of ergodic measures for transitive subshifts under the regular bispecial condition

Abstract

If A is a finite set (alphabet), the shift dynamical system consists of the space AN of sequences with entries in A, along with the left shift operator S. Closed S-invariant subsets are called subshifts and arise naturally as encodings of other systems. In this paper, we study the number of ergodic measures for transitive subshifts under a condition ("regular bispecial condition") on the possible extensions of words in the associated language. Our main result shows that under this condition, the subshift can support at most K+12 ergodic measures, where K is the limiting value of p(n+1)-p(n), and p is the complexity function of the language. As a consequence, we answer a question of Boshernitzan from `84, providing a combinatorial proof for the bound on the number of ergodic measures for interval exchange transformations.