Measure-Theoretic Aspects of Star-Free and Group Languages

Abstract

A language L is said to be C-measurable, where C is a class of languages, if there is an infinite sequence of languages in C that ``converges'' to L. We investigate the properties of C-measurability in the cases where C is SF, the class of all star-free languages, and G, the class of all group languages. It is shown that a language L is SF-measurable if and only if L is GD-measurable, where GD is the class of all generalised definite languages (a more restricted subclass of star-free languages). This means that GD and SF have the same ``measuring power'', whereas GD is a very restricted proper subclass of SF. Moreover, we give a purely algebraic characterisation of SF-measurable regular languages, which is a natural extension of Schutzenberger's theorem stating the correspondence between star-free languages and aperiodic monoids. We also show the probabilistic independence of star-free and group languages, which is an important application of the former result. Finally, while the measuring power of star-free and generalised definite languages are equal, we show that the situation is rather opposite for subclasses of group languages as follows. For any two local subvarieties C ⊂neq D of group languages, we have \L L is C-measurable\ ⊂neq \ L L is D-measurable\.