Abelian Complexity and Synchronization

Abstract

We present a general method for computing the abelian complexity ab s (n) of an automatic sequence s in the case where (a) ab s (n) is bounded by a constant and (b) the Parikh vectors of the length-n prefixes of s form a synchronized sequence. We illustrate the idea in detail, using the free software Walnut to compute the abelian complexity of the Tribonacci word TR = 0102010·s, the fixed point of the morphism 0 → 01, 1 → 02, 2 → 0. Previously, Richomme, Saari, and Zamboni showed that the abelian complexity of this word lies in \ 3,4,5,6,7 \, and Turek gave a Tribonacci automaton computing it. We are able to "automatically" rederive these results, and more, using the method presented here.