Remarks on recognizable subsets and local rank

Abstract

Given a monoid (M,,· ) it is shown that a subset A⊂eq M is recognizable in the sense of automata theory if and only if the -rank of x=x is zero in the first-order theory Th(M, ,· ,A), where (x;u) is the formula xu∈ A. In the case where M is a finitely generated free monoid on a finite alphabet , this gives a model-theoretic characterization of the regular languages over . If A is a regular language over then the -multiplicity of x=x is the state complexity of A. Similar results holds for ' (x;u,v) given by uxv∈ A, with the ' -multiplicity now equal to the size of the syntactic monoid of A.