Jump to content

Kuroda normal form

From Wikipedia, the free encyclopedia

This is the current revision of this page, as edited by Rp (talk | contribs) at 18:02, 25 May 2023 (people keep confusing classes of grammars with classes of languages, and contest-sensitive grammars with noncontracting grammars). The present address (URL) is a permanent link to this version.

(diff) ← Previous revision | Latest revision (diff) | Newer revision → (diff)

In formal language theory, a noncontracting grammar is in Kuroda normal form if all production rules are of the form:[1]

ABCD or
ABC or
AB or
Aa

where A, B, C and D are nonterminal symbols and a is a terminal symbol.[1] Some sources omit the AB pattern.[2]

It is named after Sige-Yuki Kuroda, who originally called it a linear bounded grammar, a terminology that was also used by a few other authors thereafter.[3]

Every grammar in Kuroda normal form is noncontracting, and therefore, generates a context-sensitive language. Conversely, every noncontracting grammar that does not generate the empty string can be converted to Kuroda normal form.[2]

A straightforward technique attributed to György Révész transforms a grammar in Kuroda normal form to a context-sensitive grammar: ABCD is replaced by four context-sensitive rules ABAZ, AZWZ, WZWD and WDCD. This proves that every noncontracting grammar generates a context-sensitive language.[1]

There is a similar normal form for unrestricted grammars as well, which at least some authors call "Kuroda normal form" too:[4]

ABCD or
ABC or
Aa or
Aε

where ε is the empty string. Every unrestricted grammar is weakly equivalent to one using only productions of this form.[2]

If the rule AB → CD is eliminated from the above, one obtains context-free grammars in Chomsky Normal Form.[5] The Penttonen normal form (for unrestricted grammars) is a special case where first rule above is ABAD.[4] Similarly, for context-sensitive grammars, the Penttonen normal form, also called the one-sided normal form (following Penttonen's own terminology) is:[1][2]

ABAD or
ABC or
Aa

For every context-sensitive grammar, there exists a weakly equivalent one-sided normal form.[2]

See also

[edit]

References

[edit]
  1. ^ a b c d Masami Ito; Yūji Kobayashi; Kunitaka Shoji (2010). Automata, Formal Languages and Algebraic Systems: Proceedings of AFLAS 2008, Kyoto, Japan, 20-22 September 2008. World Scientific. p. 182. ISBN 978-981-4317-60-3.
  2. ^ a b c d e Mateescu, Alexandru; Salomaa, Arto (1997). "Chapter 4: Aspects of Classical Language Theory". In Rozenberg, Grzegorz; Salomaa, Arto (eds.). Handbook of Formal Languages. Volume I: Word, language, grammar. Springer-Verlag. p. 190. ISBN 978-3-540-61486-9.
  3. ^ Willem J. M. Levelt (2008). An Introduction to the Theory of Formal Languages and Automata. John Benjamins Publishing. pp. 126–127. ISBN 978-90-272-3250-2.
  4. ^ a b Alexander Meduna (2000). Automata and Languages: Theory and Applications. Springer Science & Business Media. p. 722. ISBN 978-1-85233-074-3.
  5. ^ Alexander Meduna (2000). Automata and Languages: Theory and Applications. Springer Science & Business Media. p. 728. ISBN 978-1-85233-074-3.

Further reading

[edit]