Theory: Difference between revisions

Revision as of 22:24, 9 October 2009

Type 3 of the Chomsky Hierarchy
Recognized by finite state machines. Equivalent to DSPACE(1).
Closed under union, concatenation, Kleene, intersection, difference, complement, reverse, right-quotient, homomorphism
Pumping lemma: A language L is regular if and only if there exists a positive integer m such that for any w ∈ L with |w| ≥ m there exist strings x, y and z such that:
- w = xyz,
- |xy| ≤ m,
- |y| ≥ 1, and
- xyⁱz ∈ L for all i ≥ 0

Type 2 of the Chomsky Hierarchy, a proper superset of RL's
Recognized by nondeterministic pushdown automata
- Deterministic pushdown automata cannot recognize all CFL's!
Closed under union, concatenation, Kleene, reverse
Not closed under complement or difference
The intersection of an RL and CFL is a CFL, but CFLs are not closed under intersection

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 * Type 3 of the Chomsky Hierarchy
 * Recognized by finite state machines. Equivalent to [http://qwiki.stanford.edu/wiki/Complexity_Zoo:D#dspace DSPACE(1)].
-* Closed under union, concatenation, Kleene, intersection, difference, complement, reverse
+* Closed under union, concatenation, Kleene, intersection, difference, complement, reverse, right-quotient, homomorphism
+* Pumping lemma: A language '''L''' is regular if and only if there exists a positive integer ''m'' such that for any ''w'' ∈ '''L''' with |''w''| ≥ ''m'' there exist strings ''x'', ''y'' and ''z'' such that:
+** ''w'' = ''xyz'',
+** |''xy''| ≤ ''m'',
+** |''y''| ≥ 1, and
+** ''xy<sup>i</sup>z'' ∈ '''L''' for all ''i'' ≥ 0
 ===Context-Free Languages (CFLs) / Grammars (CFGs)===
 * Type 2 of the Chomsky Hierarchy, a proper superset of RL's