Abstract numeration systems on bounded languages and multiplication by a constant

Abstract

A set of integers is S-recognizable in an abstract numeration system S if the language made up of the representations of its elements is accepted by a finite automaton. For abstract numeration systems built over bounded languages with at least three letters, we show that multiplication by an integer λ2 does not preserve S-recognizability, meaning that there always exists a S-recognizable set X such that λ X is not S-recognizable. The main tool is a bijection between the representation of an integer over a bounded language and its decomposition as a sum of binomial coefficients with certain properties, the so-called combinatorial numeration system.