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2. Pumping lemma for context-free languages - Wikipedia

   en.wikipedia.org/wiki/Pumping_lemma_for_context...

   In computer science, in particular in formal language theory, the pumping lemma for context-free languages, also known as the Bar-Hillel lemma, [1] is a lemma that gives a property shared by all context-free languages and generalizes the pumping lemma for regular languages. The pumping lemma can be used to construct a refutation by ...

3. File:Pumping-Lemma xyz.pdf - Wikipedia

   en.wikipedia.org/wiki/File:Pumping-Lemma_xyz.pdf

   Illustration of the pumping lemma for regular languages, using xyz decomposition. Date: 29 November 2014: Source: Own work, inspired by File:Pumping-Lemma.png: Author: Jochen Burghardt: Other versions: File:Pumping-Lemma xyz.pdf * File:Pumping-Lemma xyz svg.svg

4. Pumping lemma for regular languages - Wikipedia

   en.wikipedia.org/wiki/Pumping_lemma_for_regular...

   In the theory of formal languages, the pumping lemma for regular languages is a lemma that describes an essential property of all regular languages. Informally, it says that all sufficiently long strings in a regular language may be pumped —that is, have a middle section of the string repeated an arbitrary number of times—to produce a new ...

5. Context-free grammar - Wikipedia

   en.wikipedia.org/wiki/Context-free_grammar

   In a context-free grammar, we can pair up characters the way we do with brackets. The simplest example: S → aSb S → ab. This grammar generates the language {:}, which is not regular (according to the pumping lemma for regular languages). The special character ε stands for the empty string.

6. Pumping lemma - Wikipedia

   en.wikipedia.org/wiki/Pumping_lemma

   Pumping lemma for context-free languages, the fact that all sufficiently long strings in such a language have a pair of substrings that can be repeated arbitrarily many times, usually used to prove that certain languages are not context-free; Pumping lemma for indexed languages; Pumping lemma for regular tree languages

7. Ogden's lemma - Wikipedia

   en.wikipedia.org/wiki/Ogden's_lemma

   Ogden's lemma is often stated in the following form, which can be obtained by "forgetting about" the grammar, and concentrating on the language itself: If a language L is context-free, then there exists some number (where p may or may not be a pumping length) such that for any string s of length at least p in L and every way of "marking" p or more of the positions in s, s can be written as

8. Chomsky normal form - Wikipedia

   en.wikipedia.org/wiki/Chomsky_normal_form

   To convert a grammar to Chomsky normal form, a sequence of simple transformations is applied in a certain order; this is described in most textbooks on automata theory. [4]: 87–94 [5] [6] [7] The presentation here follows Hopcroft, Ullman (1979), but is adapted to use the transformation names from Lange, Leiß (2009).

9. Parikh's theorem - Wikipedia

   en.wikipedia.org/wiki/Parikh's_theorem

   The proof is essentially the same as the standard pumping lemma: use the pigeonhole principle to find copies of some nonterminal symbol in the longest path in the shortest derivation tree. Now we prove the first part of Parikh's theorem, making use of the above lemma.