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Is this a context free language?

{a^(2k) b^n c^n : k >= 0 ∧ 0 <= n <= m}
{a^(2k+1) b^n c^m :k >= 0 ∧ n >= m >= 0}

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closed as off topic by bmargulies, 500 - Internal Server Error, kmp, Nick Weaver, Ed Heal Jan 22 '13 at 8:44

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Is this your homework? –  fab Jan 22 '13 at 1:27
Yes it is. Try finding a grammar for each part and seeing how to combine them together. –  templatetypedef Jan 22 '13 at 1:30
I have an exam tomorrow and I need to solve this exercise. I dont know how to find the grammar. thank you –  croigsalvador Jan 22 '13 at 2:12
@RoxeeMan I think question is {a^(2k) b^n c^m : k >= 0 ∧ 0 <= n <= m} ∪ {a^(2k+1) b^n c^m :k >= 0 ∧ n >= m >= 0} you have a^(2k) b^n c^n before U operation –  Grijesh Chauhan Jan 22 '13 at 4:48
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1 Answer

up vote 1 down vote accepted

One way to prove a Language a Context-Free-Language is to write Context-Free-Grammar for the given language:(or either draw PDA)

The language below:

{a(2k) bn cm : k >= 0 and 0 <= n <= m} U {a(2k+1) bn cm : k >= 0 and n >= m >= 0}

is Context Free Language

I think you have made mistake in writing question as I commented to you question, I am doing for above grammar

We can write Context-Free-Grammar for this Language:

in Context-Free-Grammar productions of kind α --> β where α is a single variable.

S --> S1 | S2

S1 generates this part {a(2k) bn cm : k >= 0 and 0 <= n <= m} and S2 generates {a(2k+1) bn cm : k >= 0 and n >= m >= 0}

S1 --> AB

A --> Aaa | ^

B --> bBc | ^

B --> Bc


S2 --> AaC

C --> bCc | ^

C --> bC

In grammar S is start Variable and {S, S1, S2, A, B, C} all are variable.
So in above grammar every productions are in the form α --> β where α is a single variable hence given language is Context-Free-Language.

Let me know if you have other doubt or if your language I misunderstood

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