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I was just putting some thought into different languages (as I'm reviewing for final exams coming up) and I can not think of a valid pushdown automata to handle the language A = {0^n 1^n 0^n | n >= 0}. This is not a context-free language, am I correct?

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possible duplicate of stackoverflow.com/questions/2617675/… –  Andrew Medico Apr 11 '10 at 19:58
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@Andrew These are separate languages :) –  Tony Apr 11 '10 at 20:00
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@Andrew: plus, "regular" and "context-free" are entirely different classes of languages –  SamB Apr 11 '10 at 20:12
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Also, these questions are both from the same asker, so I hope he'd know if they were the same question or not (though I admit it's not a given) –  SamB Apr 11 '10 at 20:20

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up vote 5 down vote accepted

I believe you are. It looks quite similar to the language L = { a^i b^i c^i | i > 0 } which the Wikipedia article on the pumping lemma uses as an example of how to prove that a language is not context-free.

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To the original poster, I would suggest attempting to follow through the same steps of the proof referred to above with the language you're interested in. –  Dale Hagglund Apr 11 '10 at 21:14
    
that language fails the pumping lemma for CFLS –  jfisk Dec 8 '11 at 4:37

Think of just the {0^n 1^n} part for a second. Replace 0 with ( and 1 with ) and you've got the language of simple nested parentheses, which is a dead give-away that a language is not regular.

Adding the final 0^n makes it context-sensitive (i.e. not context-free). Keep in mind that a CFG can be decided by a finite-state computer with a single stack as its only data structure. Seeing a 0 will cause a character to be pushed onto the stack, and seeing a 1 will pop from the stack. This guarantees that there are as many 0's as 1's, but there's no way to then match more 0's.

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