Questions tagged [pumping-lemma]

Necessary properties of formal langagues in certain classes that rely on closure against repetition of certain subwords. Make sure your question isn't covered by applying the techniques in https://cs.stackexchange.com/q/1031/755.

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How to prove this language is not regular?

I am currently learning Pumping Lemma and found this question. But I am not able to prove it not regular. L = { $0^n$ | n is power of 2}. So, here I considered w = $0^{2^n}$ where n is constant of ...
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Is there a language that pumps, but is not regular? [duplicate]

I'm looking for a concrete language that can be pumped but is not regular. I understand that closure properties can be used to further test if a language is regular/nonregular.
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Pumping lemma for L = {a^i b^j c^k: i < j < k}

I had a question regarding a specific proof I found online that I had some concerns with, I have quoted it below. Show that the language L = {a^i b^j c^k: i < j < k} is not a context-free ...
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Pumping lemma regarding {a^2k w | w ∈ {a, b}*, |w| = k}

I had a question regarding the Pumping lemma for regular languages, I have been studying for an exam and came across the question {a^2k w | w ∈ {a, b}*, |w| = k}. In the website it lists the answer ...
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Pumping Lemma for Regular Languages with 3 variables (a^nb^mc^m)

I've been trying to understand the pumping lemma, and how to apply it to a language such as a^nb^mc^m where n >= 0 and m >= 0. The pumping lemma states that: For any regular language L, there exists ...
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Converse of pumping lemma for regular expressions

I want to come up with a language that satisfies the pumping lemma while not being a regular expression. I thought of $\{0^i1^j: i > j > 0\} $. The pumping seems to work just fine, and this is ...
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Getting from one language to the other using closure properties(automata) [duplicate]

I am trying to deduct how i can, using closure properties, deduct that since the following language is not context free $$L=\left\{abc^{i_1}bc^{i_2}...bc^{i_{2m}}def^{j_1}ef^{j_2}..ef^{j_{2n}}ghq^{k_1}...
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Using pumping lemma to show a language is not context free(Complicated)

How can i show that the following long language is not context free using the pumping lemma? $L=\left\{abc^{i_1}bc^{i_2}...bc^{i_{2m}}def^{j_1}ef^{j_2}..ef^{j_{2n}}ghq^{k_1}hq^{k_2}...hq^{k_o}\right\}...
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$L = \{ a^{j!} \mid j \geq1\}$ is not context free by pumping lemma

How I use the pumping lemma to prove that the language $L = \{ a^{j!} \mid j \geq1\}$ is not context-free?
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Using pumping lemma to prove irregularity of regular language - what is my error? [duplicate]

I have a vital misunderstanding of the pumping lemma. In the following example I show an example of using it on a regular language to come to incorrect conclusions. What am I doing wrong? L={ab}, ...
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Confused about 3rd rule of CFG pumping lemma

Let $L = \{\space ww \space | \space w \in \{0,1\}^*$} (need to prove that $L$ is not CFL) Assuming $L$ is CFL we can use the PL and split $s=uvxyz$ and we choose $s = 0^p1^p0^p1^p$ where $p$ is the ...
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Show that the Language L is not regular (pumping lemma) [closed]

$L = \{cda^nb^n\mid n\in \Bbb N\} \cup \{a,b,d\}^*$ Assuming $L$ is regular then there exist a pumping length $n$ for $L$. Lets use w = $cda^nb^n$. Thus $w \in L$ and $|w| = 2n+2$ $\implies$ $|w| \...
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What does pump down means in this solution?

Problem text (from Sipser's "Introduction to the Theory of Computation"): 2.42 Let $E = \{1,\#\}$ and $Y = \{ w \mid w = t_1\#t_2\# ...... \#t_k \, \text{for $k \geq 0$, each $t_i \in 1^*$, and $...
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Closure properties of a non-regular language under complement? [duplicate]

Assume I have L1 which is a regular language, so we know since regular language is closed under complement, the complement of L1 is also a regular language. But let's say if the complement of L1 is a ...
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Does |xy| ≤ p in the pumping lemma count for all i?

While learning about the pumping lemma, I came across the following question: Given the language L is $ a^n(0|1)^* $ with $ c_0 \cdot c_1 = n $, where $ c_0 $ indicates the amount of zeros present, ...
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Prove $\{abc : a+b=c\}$ is not context-free using pumping lemma

I have the following alphabet: $Σ = {0, 1, . . . , 9}$ and the Language $L$ defined as: $L = \{ abc | a + b = c\} $ where substrings $a$, $b$ and $c$ are interpreted as ordinary integers. My answer ...
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Pumping lemma — Is this enough to prove that the language L is not regular?

I have a language $L$: $$L = \{w : a^ib^j; i > j \}$$ I need to prove this language is not regular using Pumping Lemma. I'm wondering if I'm doing it correctly: $L$ Is assumed to be regular. A ...
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Pumping lemma occurrence of c > d

I'm trying to prove a language is not regular through using pumping lemma, but can't seem to come up with any way of doing it. The alphabet is: $$ \Sigma = \{c, d\} $$ The language is: $$ A = \{z ...
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Proving that L is not regular using closure properties

I need to show that the following language is not regular. $$L = \{\ ab^jc^j\ |\ j \geq 0\ \}\ \cup\ \{\ a^ib^jc^k\ |\ i, j, k \geq 0 \ and\ i \neq 1\ \}$$ There is also a hint that it cannot be ...
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Prove that $L = \{ xy \in \{a , b \}\textbf{*} \mid |x|_a = 2|y|_b \}$ is not regular

Prove that $L = \{ xy \in \{a,b\}^* \mid |x|_a = 2|y|_b \}$ is not regular. I have already tried to prove it by using the pumping lemma and reduction to absurdity, but have been unsuccesful on both. ...
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What is the importance of the condition “| xy | < p” in pumping lemma? [duplicate]

Let L be a language. w $\in$ L , and w could be broken in xyz. Then if L is regular, there exists a pumping length p such that: |y| $\gt$ 0 |xy| $\le$ p $\forall$ i $\ge$ 0, xy$^i$z $\in$ L I ...
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Irregularity of language of prefixes of decimal expansion of pi

Let $L_{\pi}$ be the language consisting of prefixes of the decimal expansion of $\pi$: $$L_\pi = \{3, 31, 314, 3141, 31415, 314159, \ldots\}.$$ Prove that Lπ is not DFA-recognizable. You may use the ...
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Regularity of a language contains more 1's than 0's

The language of all bitstrings with more 1s than 0s, i.e., $ A = \{x: 2\Sigma_{i}^{|x|} x_{i} > |x|\}$ is regular. I know I should apply Pumping Lemma and the proof as well, what I cannot ...
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Confused about pumping lemma, What i'm missing? [duplicate]

When I apply pumping lemma on this language: ${L=\{010^n:n\ge0\}}$ over the alphabet ${\Sigma =\{0,1\}}$ I get that it is non-regular despite the fact that it is regular. let ${n=4}$, then $w=010000$...
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Proving non-regularity of $\{a^p \mid p \in \text{Prime} \}$ without pumping lemma

I was wondering whether it is possible to prove $\{a^p \mid p \in \text{Prime} \}$ is a non-regular language without using the pumping lemma. I'm having trouble choosing an alphabet that completes the ...
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Is this language L context-free?

The language $$L = \{x^r \# y | x, y \in \{a, b, c\}^*\\ \text{ and }x\text{ is a contiguous sub-string of }y\}$$ where $x ^ r$ denotes the backward written word x, is context-free. Can someone ...
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Pumping lemma for regular languages [duplicate]

I have a vey specific question regarding the pumping lemma in the context of regular languages. The theorem states that if $L$ is a regular language, then there exists a constant $n$ such that for ...
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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 ...
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Which word could I use for the Pumping Lemma proof?

I have the language $ A_{1} \triangleq\left\{a w c^{l} d^{m}\mid l \in \mathbb{N} \wedge m \in \mathbb{N}^{+} \wedge w \in\{a, b\}^{*} \wedge |\left.w\right|_{a}=l+m\right\} \operatorname{with} \...
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Pumping Lemma vs Myhill-Nerode [duplicate]

I was searching for a difference on both ways of proving that a language is not regular but I didn't came up with much. Let us take the following as an example: $$ L = \{ a^n b^n \mid n \ge 0\} $$ ...
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Show that the language L = {www : w ∈ {0, 1} ∗} is not regular [duplicate]

Hey was wondering if I'm applying the pumping lemma correctly for this proof or if this proof could be improved? Suppose $L = \{www:w\in\{0,1\}^*\}$ is a regular language. Let $p$ be the number from ...
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Pumping Lemma on Language with subtracted length

My study group and I have had some back and forth on one exercise and I haven't found any matching solution online. The task looks as follows: Prove that $L$ is not regular given $$ L = \{ a^k b a^{m-...
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Is complement $L = \{ w : |w|_{a} \equiv |w|_{b} \vee |w|_{c} \equiv |w|_{d} \}$ context-free

$L = \{ w : |w|_{a} \equiv |w|_{b} \vee |w|_{c} \equiv |w|_{d} \}$ In my opinion complement of the L language is $L^{C} = \{ w : |w|_{a} \neq |w|_{b} \wedge |w|_{c} \neq |w|_{d} \}$ I choose to ...
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Prove $ L = \{ww^{R} \in \{a, b\}^{*} : |w|_{a} \equiv |w|_{b} \equiv 0$ $ (mod$ $13) \} $ is regular or context-free or neither

$ L = \{ww^{R} \in \{a, b\}^{*} : |w|_{a} \equiv |w|_{b} \equiv 0$ $ (mod$ $13) \} $ Exercises: If the language L is regular (build a DFA or regular expression) else if the language L is context-...
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Is the language of words that contain a square regular or context-free? [duplicate]

$ L = \{w \in\{a,b\}^{*} : \exists_{x,y,z} , w=xyyz \wedge y \neq \epsilon \}$ I have a problem with this exercise. I need to determine if this language is regular, context-free or not both and ...
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Is Language $ L = \{ww^{R} \in \{a,b,c\}^{*} : |w|_{a} \not\equiv |w|_{b} $ and $ |w|_{b} \not\equiv |w|_{c} \} $ context free?

$ L = \{ww^{R} \in \{a,b,c\}^{*} : |w|_{a} \not\equiv |w|_{b} $ and $ |w|_{b} \not\equiv |w|_{c} \} $ I would use the Ogden pumping lemma. Assumption $n < m$ where $n$ is a number from lemma. My ...
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Find the Pumping Length for Language L of (2+3k) a's or (10+12k) b's

The following question on the theory of computation is GATE 2019 CS question 24: For $Σ = \{a, b\}$, let us consider the regular language: $$L = \{x \mid x = a^{2+3k} \text{ or } x = b^{10+12k}, k ...
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Pumping Lemma. Why is there a word w in L for infinite languages with n≤|w|≤2n

The following comment on an other question says that if we have an infinite language L that satisfies the pumping lemma for regular languages then we have a word with n≤|w|≤2n which is in L. (n is the ...
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How to choose a word to apply the Pumping Lemma?

I have some questions about the PUMPING LEMMA. First of all, I do not study computer science, I still go to school, but I'm very interested, so I could make mistakes. And sorry about my English :) ...
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Which word could I use for the pumping lemma?

I have a problem to start my proof because I do not find a word $w$ where I can use the pumping lemma. Task: Be $\sum { =\left\{ a,b,c \right\} } $ and $S=\left\{ bx{ c }^{ m }|x\in { \left\{ a,b \...
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How to prove a language is not regular using the Pumping Lemma?

I need some help with my proof, because I'm not sure if the following works. Tips and Tricks are welcome since this topic is completely new to me and very difficult. Task: Prove that $M = \left\{ a^...
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picking a word for pumping lemma for L = {a^n b^m c^n b^m a^n | m,n≥0}

If i have a language like $L = \{a^n b^m c^n b^m a^n \mid m,n\ge0\}$ when i pick a word for the language, would it be correct if i pick any of these words: $w = a^k c^k$, $w = a^k b^m c^k $, $w = b^...
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Language that fulfills pumping lemma but is not in RE

I am supposed to find a language $$L\subseteq \Sigma ^*, \Sigma \subseteq \mathbb{N}$$ that fullfills the pumping lemma and is not in RE and not in coRE. I've never constructed a language with a given ...
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Is this language context-free? $\Sigma$ = {a,b,#} L = {x1#x2#…#xk : k$\geq$2, every $x_i \in$ {a,b}* and xi $\neq$ xj for every pair i $\neq$ j} [duplicate]

Is this language context-free? $\Sigma$ = {a,b,#}, L = {x1#x2#...#xk : k$\geq$2, every $x_i \in$ {a,b}* and xi $\neq$ xj for every pair i $\neq$ j} I think it is not, because the PDA can't memorize ...
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contextfree? {w1w2 | w1,w2 $\in$ {a,b}* $\land$ |w1| = |w2| $\land$ w1 $\neq$ w2} [duplicate]

Is this language contextfree? {w1w2 | w1,w2 $\in$ {a,b}* $\land$ |w1| = |w2| $\land$ w1 $\neq$ w2}. I think it's not but can't prove it.
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Prove a^4n b^m is irregular using puming lemma

My assignment is to prove that the language $L = \{ a^{4n} b^m \mid n > m >= 0\}$ is not a regular language. My first attempt was to prove that if if you set $a^l$ and $b^{l-1}$ you'd have an ...
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What is the minimum pumping length of the union of two languages?

If I have two languages L1 and L2 that are pumpable, what is the minimum pumping length for the union of them? Does it differ if either of them contains just one string like 001?
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Prove or disprove L is regular

There is question in one of my exercise but I couldn't prove or disprove anything about it. This is language $L$ which is introduced with grammar: $$S \to 0S1 | 1S0 | AA$$ $$A \to 0A | \lambda|A1$$ ...
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Justification for the pumping lemma of context free languages

I understand intuitively why the pumping lemma for regular languages must hold. That is to recognize a infinite string with a finite amount of states you must repeat states and you can "pump" those ...
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Several simple propositions about regular languages

(Originally posted on Math-Stackexchange) https://math.stackexchange.com/questions/2982949/regular-languages-and-regular-expressions Notation: $\Sigma:=\{a_1,\cdots ,a_\Delta\}$ finite alphabet $\...