Generalized star-height problem
Unsolved problem in formal language theory From Wikipedia, the free encyclopedia
The generalized star-height problem in formal language theory is the open question whether all regular languages can be expressed using generalized regular expressions with a limited nesting depth of Kleene stars. Here, generalized regular expressions are defined like regular expressions, but they have a built-in complement operator. For a regular language, its generalized star height is defined as the minimum nesting depth of Kleene stars needed in order to describe the language by means of a generalized regular expression, hence the name of the problem.
Unsolved problem in computer science
Can all regular languages be expressed using generalized regular expressions with a limited nesting depth of Kleene stars?
More specifically, it is an open question whether a nesting depth of more than 1 is required, and if so, whether there is an algorithm to determine the minimum required star height.[1]
Regular languages of star-height 0 are also known as star-free languages. The theorem of Schützenberger provides an algebraic characterization of star-free languages by means of aperiodic syntactic monoids. In particular star-free languages are a proper decidable subclass of regular languages.
See also
- Eggan's theorem and Generalized star height sections of the Star height article
- Star height problem
References
External links
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