Local language (formal language)

In mathematics, a local language is a formal language for which membership of a word in the language can be determined by looking at the first and last symbol and each two-symbol substring of the word. Equivalently, it is a language recognised by a local automaton, a particular kind of deterministic finite automaton.

Formally, a language L over an alphabet A is defined to be local if there are subsets R and S of A and a subset F of A×A such that a word w is in L if and only if the first letter of w is in R, the last letter of w is in S and no factor of length 2 in w is in F. This corresponds to the regular expression

(RA^{*}\cap A^{*}S)\setminus A^{*}FA^{*}\ .

More generally, a k-testable language L is one for which membership of a word w in L depends only on the prefix and suffix of length k and the set of factors of w of length k; a language is locally testable if it is k-testable for some k. A local language is 2-testable.

Examples

Over the alphabet {a,b,}

aa^{*},\ \ .

Properties

The family of local languages over A is closed under intersection and Kleene star, but not complement, union or concatenation.
Every regular language not containing the empty string is the image of a local language under a strictly alphabetic morphism.

References

^ Salomaa (1981) p.97
Lawson (2004) p.130
Lawson (2004) p.129
^ Sakarovitch (2009) p.228
Caron, Pascal (2000-07-06). "Families of locally testable languages". Theoretical Computer Science. 242 (1): 361–376. doi:10.1016/S0304-3975(98)00332-6. ISSN 0304-3975.
McNaughton & Papert (1971) p.14
Lawson (2004) p.132
McNaughton & Papert (1971) p.18

Lawson, Mark V. (2004). Finite automata. Chapman and Hall/CRC. ISBN 1-58488-255-7. Zbl 1086.68074.
McNaughton, Robert; Papert, Seymour (1971). Counter-free Automata. Research Monograph. Vol. 65. With an appendix by William Henneman. MIT Press. ISBN 0-262-13076-9. Zbl 0232.94024.
Sakarovitch, Jacques (2009). Elements of automata theory. Translated from the French by Reuben Thomas. Cambridge: Cambridge University Press. ISBN 978-0-521-84425-3. Zbl 1188.68177.
Salomaa, Arto (1981). Jewels of Formal Language Theory. Pitman Publishing. ISBN 0-273-08522-0. Zbl 0487.68064.

Automata theory: formal languages and formal grammars

Chomsky hierarchy	Grammars	Languages	Abstract machines
Type-0 — Type-1 — — — — — Type-2 — — Type-3 — —	Unrestricted (no common name) Context-sensitive Positive range concatenation Indexed — Linear context-free rewriting systems Tree-adjoining Context-free Deterministic context-free Visibly pushdown Regular — Non-recursive	Recursively enumerable Decidable Context-sensitive Positive range concatenation Indexed — Linear context-free rewriting language Tree-adjoining Context-free Deterministic context-free Visibly pushdown Regular Star-free Finite	Turing machine Decider Linear-bounded PTIME Turing Machine Nested stack Thread automaton restricted Tree stack automaton Embedded pushdown Nondeterministic pushdown Deterministic pushdown Visibly pushdown Finite Counter-free (with aperiodic finite monoid) Acyclic finite

Each category of languages, except those marked by a , is a proper subset of the category directly above it. Any language in each category is generated by a grammar and by an automaton in the category in the same line.

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