Regular Language

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In computing theory, a regular language is one that is accepted by a finite automaton.

Equivalent Characterizations

• ${\displaystyle A}$ is a regular language.
• ${\displaystyle A}$ is accepted by a deterministic finite automaton.
• ${\displaystyle A}$ is accepted by a non-deterministic finite automaton.
• ${\displaystyle A}$ can be described by a regular expression.

Closure Properties

Suppose ${\displaystyle A,B\subseteq \Sigma ^{*}}$ are regular languages. Then the following languages are also regular.

• ${\displaystyle A\cup B=\{x~|~x\in A\ \mathrm {or} \ x\in B\}}$ (union)
• ${\displaystyle A\cap B=\{x~|~x\in A\ \mathrm {and} \ x\in B\}}$ (intersection)
• ${\displaystyle {\bar {A}}=\{x\in \Sigma ^{*}~|~x\not \in A\}}$ (complement)
• ${\displaystyle AB=\{xy~|~x\in A\ \mathrm {and} \ y\in B\}}$ (concatenation)
• ${\displaystyle A^{*}=\{x_{1}x_{2}\ldots x_{n}~|~n\geq 0\ \mathrm {and} \ x_{i}\in A,~1\leq i\leq n\}}$ (asterate)
• ${\displaystyle A-B=\{x-y~|~x\in A\ \mathrm {and} \ y\in B\}}$ (difference)
• ${\displaystyle A^{R}=\{x^{R}|~x\in A\ \}}$ (reversal)

Regular languages are also closed under homomorphic images and preimages. Suppose ${\displaystyle C\subseteq \Gamma ^{*}}$ is a regular language and ${\displaystyle h:\Sigma ^{*}\to \Gamma ^{*}}$ is a string homomorphism. Then the following languages are regular.

• ${\displaystyle h(A)=\{h(x)~|~x\in A\}\subseteq \Gamma ^{*}}$ (homomorphic image)
• ${\displaystyle h^{-1}(C)=\{x~|~h(x)\in C\}\subseteq \Sigma ^{*}}$ (homomorphic preimage)