Regular language

A regular language is a formal language (i.e. a possibly infinite set of finite sequences of symbols from a finite alphabet) that satisfies the following equivalent properties:

it can be accepted by a deterministic finite state machine

it can be accepted by a nondeterministic finite state machine

it can be accepted by an alternating finite automaton

it can be described by a regular expression

it can be generated by a regular grammar

it can be generated by a prefix grammar

it can be accepted by a read-only Turing machine

it can be defined in monadic second-order logic

The collection of regular languages over an alphabet Σ is defined recursively as follows:

the empty language Ų is a regular language.

the empty string language { ε } is a regular language.

For each a ∈ Σ, the singleton language { a } is a regular language.

If A and B are regular languages, then A U B, A • B, and A* are regular languages.

No other languages over Σ are regular.

All finite languages are regular. Other typical examples include the language consisting of all strings over the alphabet {a, b} which contain an even number of a's, or the language consisting of all strings of the form: several a's followed by several b's.

The results of the union, intersection and set-difference operations when applied to regular languages is itself a regular language; the complement of every regular language is a regular language as well. Reversing every string in a regular language yields another regular language. Concatenating two regular languages (in the sense of concatenating every string from the first language with every string from the second one) also yields a regular language. The shuffle operation, when applied to two regular languages, yields another regular language. The right quotient and the left quotient of a regular language by an arbitrary language is also regular.

To locate the regular languages in the Chomsky hierarchy, one notices that every regular language is context-free. The converse is not true: for example the language consisting of all strings having the same number of a's as b's is context-free but not regular. To prove that a language such as this is not regular, one uses the Myhill-Nerode theorem or the pumping lemma.

There are two purely algebraic approaches to defining regular languages. If Σ is a finite alphabet and Σ* denotes the free monoid over Σ consisting of all strings over Σ, f : Σ* → M is a monoid homomorphism where M is a finite monoid, and S is a subset of M, then the set f⁻¹(S) is regular. Every regular language arises in this fashion.

If L is any subset of Σ*, one defines an equivalence relation ~ on Σ* as follows: u ~ v is defined to mean
:uw in L if and only if vw in L for all w in Σ*
The language L is regular if and only if the number of equivalence classes of ~ is finite; if this is the case, this number is equal to the number of states of the minimal deterministic finite automaton accepting L.

External resource

Department of Computer Science at the University of Western Ontario: Grail+, http://www.csd.uwo.ca/research/grail/. A software package to manipulate regular expressions, finite-state machines and finite languages. Free for non-commercial use.

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