• DocumentCode
    1822260
  • Title

    Lambek grammars are context free

  • Author

    Pentus, M.

  • Author_Institution
    Dept. of Math. Logic, Moscow State Univ., Russia
  • fYear
    1993
  • fDate
    19-23 Jun 1993
  • Firstpage
    429
  • Lastpage
    433
  • Abstract
    Basic categorial grammars are the context-free ones. Another kind of categorial grammars was introduced by J. Lambek (1958). These grammars are based on a syntactic calculus, known as the Lambek calculus. Chomsky (1963) conjectured that these grammars are also equivalent to context-free ones. Every basic categorial grammar (and thus every context-free grammar) is equivalent to a Lambek grammar. Conversely, some special kinds of Lambek grammars are context-free. These grammars use weakly unidirectional types, or types of order at most two. The main result of this paper says that Lambek grammars generate only context-free languages. Thus they are equivalent to context-free grammars and also to basic categorial grammars. The Chomsky conjecture, that all languages recognized by the Lambek calculus are context-free, is thus proved
  • Keywords
    category theory; context-free grammars; context-free languages; Chomsky conjecture; Lambek calculus; Lambek grammars; categorial grammars; context-free grammars; context-free languages; syntactic calculus; weakly unidirectional types; Bismuth; Calculus; Logic; Mars; Mathematics; Text recognition;
  • fLanguage
    English
  • Publisher
    ieee
  • Conference_Titel
    Logic in Computer Science, 1993. LICS '93., Proceedings of Eighth Annual IEEE Symposium on
  • Conference_Location
    Montreal, Que.
  • Print_ISBN
    0-8186-3140-6
  • Type

    conf

  • DOI
    10.1109/LICS.1993.287565
  • Filename
    287565