In formal language theory, the Chomsky–Schützenberger representation theorem is a theorem derived by Noam Chomsky and Marcel-Paul Schützenberger in 1959[1] about representing a given context-free language in terms of two simpler languages. These two simpler languages, namely a regular language and a Dyck language, are combined by means of an intersection and a homomorphism.
The theorem Proofs of this theorem are found in several textbooks, e.g. Autebert, Berstel & Boasson (1997) or Davis, Sigal & Weyuker (1994).
Mathematics
editNotation
editA few notions from formal language theory are in order.
A context-free language is regular, if it can be described by a regular expression, or, equivalently, if it is accepted by a finite automaton.
A homomorphism is based on a function which maps symbols from an alphabet to words over another alphabet ; If the domain of this function is extended to words over in the natural way, by letting for all words and , this yields a homomorphism .
A matched alphabet is an alphabet with two equal-sized sets; it is convenient to think of it as a set of parentheses types, where contains the opening parenthesis symbols, whereas the symbols in contains the closing parenthesis symbols. For a matched alphabet , the typed Dyck language is given by
For example, the following is a valid sentence in the 3-typed Dyck language:
( [ [ ] { } ] ( ) { ( ) } )
Theorem
editA language L over the alphabet is context-free if and only if there exists
- a matched alphabet
- a regular language over ,
- and a homomorphism
- such that .
We can interpret this as saying that any CFG language can be generated by first generating a typed Dyck language, filtering it by a regular grammar, and finally converting each bracket into a word in the CFG language.
References
edit- ^ Chomsky, N.; Schützenberger, M. P. (1959-01-01), Braffort, P.; Hirschberg, D. (eds.), "The Algebraic Theory of Context-Free Languages*", Studies in Logic and the Foundations of Mathematics, Computer Programming and Formal Systems, vol. 26, Elsevier, pp. 118–161, doi:10.1016/S0049-237X(09)70104-1, ISBN 978-0-444-53391-3, retrieved 2024-09-28
- Autebert, Jean-Michel; Berstel, Jean; Boasson, Luc (1997). "Context-Free Languages and Push-Down Automata" (PDF). In G. Rozenberg and A. Salomaa, eds., Handbook of Formal Languages, Vol. 1: Word, Language, Grammar (pp. 111–174). Berlin: Springer-Verlag. ISBN 3-540-60420-0.
- Davis, Martin D.; Sigal, Ron; Weyuker, Elaine J. (1994). Computability, Complexity, and Languages: Fundamentals of Theoretical Computer Science (2nd ed.). Elsevier Science. p. 306. ISBN 0-12-206382-1.