Linked Questions

4
votes
1answer
571 views

A context free grammar proof

There is a problem which I cannot solve. If you give a tip I will be very glad. Prove that following language is not context free: $L= \{ a^nb^m | \gcd(n,m) = 1 \}$. It can be proven using the ...
3
votes
2answers
38 views

Can the pumping lemma for context free languages be extended to any subword?

It is known that in the case of a Regular Language $L$ , the pumping lemma can be extended to apply to any sufficiently long subword of the language, ie, if $uwv \in L$ and $|w| \ge p$ then we can ...
3
votes
1answer
2k views

Are permutations of context-free languages context-free?

Given a context-free language $L$, define the language $p(L)$ as containing all permutations of strings in $L$ (i.e. all strings in $L$ such that the order of symbols is not important). Is $p(L)$ ...
3
votes
1answer
137 views

Prove that $\{0^n 1^{n\cdot m} : n,m \in \mathbb{N}\}$ is not context-free

This is a homework problem I have spent several hours on. A "hint" is given that we may use this fact: If $n,j,k \in \mathbb{N}$ satisfy $ n \geq 2$ and $1 \leq j+k \leq n$, then $n^2+j$ does not ...
3
votes
1answer
400 views

Use the pumping lemma to prove that {www} is not context-free

Use the pumping lemma to prove that the following language is not context-free. $\qquad L = \{ w w w \mid w \in \{a,b\}^*\}$ I am studying for an exam and really trying to understand this question. ...
2
votes
2answers
2k views

Are regular and context free languages closed against making them prefix-free?

For a language L we define: $\qquad A(L) = \{ x \in L \mid \text{ no proper prefix of x is in L} \} $ Are regular / context free languages closed under this operation ? For regular languages I ...
2
votes
3answers
2k views

Is this language LL(1) parseable?

I tried to find a simple example for a language that is not parseable with an LL(1) parser. I finally found this language. $$L=\{a^nb^m|n,m\in\mathbb N\land n\ge m\}$$ Is my hypothesis true or is ...
2
votes
3answers
931 views

Structure of a Pumping Lemma proof: contradiction or counterexample?

This site is full of Pumping Lemma questions, and I do admit I've not read them all. I've tried some proofs myself and they seem to work, but I can't find anywhere what is the (general) exact ...
2
votes
2answers
1k views

Show that $0^i$ where $i$ is a power of 2 is not context free

I'm having difficulty trying to use the pumping lemma in order to show that $L= \{0^i \mid \ i \text{ is a power of 2 }\} $ is not context free. I"m starting by stating that $ s = 0^p$ and then $ s = ...
2
votes
2answers
69 views

Interpreting a Language

I'm having trouble understanding some language notation, primarily what rules I can take away from it. The language is as follows: $\qquad L = \{a^n b^m b^p c^p b^{n-m} \mid n > 0, m < n, p >...
2
votes
1answer
2k views

Use pumping lemma to show L is not context free

Show that L = $\{0^{2^n}| n\geq 0\}$ is not a context free language. Let string $s = 0^{2^p}$. Then we know we can write $s$ as $s = uvxyz$. I know that |vy| > 0 and $|vxy| \leq p$. So how do I ...
2
votes
2answers
89 views

Can the String, $0^p 0^p 0^p$, be Used with the Pumping Lemma to Show that $w^r w w^r$ is Not Context Free?

I'm trying to show that $L=\left\{w^rww^r:w \in \{0,1\}^*\right\}$ is not context free using the pumping lemma. I thought picking the string, $0^p0^p0^p$, would be a good candidate for this, but ...
2
votes
2answers
296 views

Does this language have a context-free grammar?

Here is a question that I encountered in one of my exams: Find one context-free grammar that recognizes the language: $\qquad L = \{a^n(b^mc^m)^pd^n \mid m, n, p \geq 0\} $ Can you find such a ...
2
votes
1answer
183 views

How to prove that $L = \{a^n b^m a^n b^m \mid n,m \ge 0\}$ is not a CFL?

I'm stuck with the proof. I've tried Ogden's lemma but it doesn't seem to help. The problem is: Let $N$ be the constant of Ogden, let $z = a^N b^{N+1} a^N b^{N+1}$, and $z = uvwxy$. Now I should ...
2
votes
0answers
40 views

How to use homomorphisms to prove irregularity [duplicate]

I'm a bit confused on how to use homomorphims to prove irregularity or to prove that a language is not context free. This is what I'm currently thinking: Example 1: Let $L = \{ a^{i}b^{j}c^{k} : i ...

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