Regular Language

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Revision as of 09:39, 10 June 2008 by imported>Mon Jed Liu (New page: {{subpages}} In computing theory, a regular language is one that is accepted by a finite automaton. == Closure Properties == Suppose <math>A, B \subseteq \Sigma^*</math> are reg...)
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In computing theory, a regular language is one that is accepted by a finite automaton.

Closure Properties

Suppose are regular languages. Then the following languages are also regular.

  • or (union)
  • and (intersection)
  • (complement)
  • and (concatenation)
  • and (asterate)

Regular languages are also closed under homomorphic images and preimages. Suppose is a regular language and is a string homomorphism. Then the following languages are regular.

  • (homomorphic image)
  • (homomorphic preimage)