Abelian complexity function of the Tribonacci word

Abstract

According to a result of Richomme, Saari and Zamboni, the abelian complexity of the Tribonacci word satisfies ab(n)∈\3,4,5,6,7\ for each n∈N. In this paper we derive an automaton that evaluates the function ab(n) explicitly. The automaton takes the Tribonacci representation of n as its input; therefore, (ab(n))n∈N is an automatic sequence in a generalized sense. Since our evaluation of ab(n) uses O( n) operations, it is fast even for large values of n. Our result also leads to a solution of an open problem proposed by Richomme et al. concerning the characterization of those n for which ab(n)=c with c belonging to \4,5,6,7\. In addition, we apply the same approach on the 4-bonacci word. In this way we find a description of the abelian complexity of the 4-bonacci word, too.