The growth function of S-recognizable sets

Abstract

A set X⊂eq N is S-recognizable for an abstract numeration system S if the set S(X) of its representations is accepted by a finite automaton. We show that the growth function of an S-recognizable set is always either (((n))c-dfnf) where c,d∈ N and f 1, or (nr θ(nq)), where r,q∈ Q with q 1. If the number of words of length n in the numeration language is bounded by a polynomial, then the growth function of an S-recognizable set is (nr), where r∈ Q with r 1. Furthermore, for every r∈ Q with r 1, we can provide an abstract numeration system S built on a polynomial language and an S-recognizable set such that the growth function of X is (nr). For all positive integers k and l, we can also provide an abstract numeration system S built on a exponential language and an S-recognizable set such that the growth function of X is (((n))k nl).