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How can I construct a Context-Free Grammer for the language x^a y^b z^2(a+b) where a>=0, b>=0. Thanks for helps...

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3 Answers 3

up vote 3 down vote accepted

Think of it this way

x^a y^b z^2(a+b) = x^a y^b z^2a z^2b = x^a y^b (z^2)^b (z^2)^a 


S -> xSzz | S1
S1 -> yS1zz | e
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I just tried to undo my upvote for this answer, which I gave when it was only the "Think of it this way" hint, but for some reason I can't. Not only is the answer giving the solution away (for what is most likely a homework problem), it's also not very elegant because the first rule has a redundant e clause. –  larsmans Apr 26 '11 at 18:43
@larsmans Indeed. I edited the question, you can downvote now. –  cnicutar Apr 26 '11 at 19:01
no downvote, but I undid my upvote. –  larsmans Apr 26 '11 at 19:08

Observe that for each x and for each y, you need to generate two z's because of the 2(a + b). Also, observe that each string can be viewed as an "inside" part of y's and z's, and an "outside" part of x's and z's.

Since for each y you need two z's, the inside part can be described by (using capitals to denote non-terminal symbols and [] for the empty string):

I --> []
I --> y I z z

Now write a grammar for the outside part in the same way, but referring to I in the base case.

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There are essentially two cases that you need to treat:

  • You can either add an x at the beginning of the string, in which case you need to add two z’s at the end.
  • Or you can add a y in the middle, in which case you also need to add two z’s at the end.

Try reducing either of these descriptions to a simpler grammer (e.g. a^n b^n) for which you know the solution.

This hint should be enough to deduce the generative grammer.

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