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I heard that a*b*c* is not regular. At the same time, i got the following regular grammar to generate it as well.

S → A
A → aA
A → B
B → bB
B → C
C → cC
C-> empty

Can anyone clarify is this grammar correct to generate a*b*c*


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Since nobody answer your literal question "Can anyone clarify [whether] this grammar [is] correct to generate abc*", I would answer here with the answer: Yes, and so the language is regular. –  justhalf Feb 25 '14 at 10:19

2 Answers 2

up vote 2 down vote accepted

a*b*c* is a perfectly regular language. In fact, the presentation is itself a proof that the language is regular; it's a regular expression in the classical sense.

The language you're probably thinking of is (a^n)(b^n)(c^n), or, since code formatting is a horrible substitute for TeX typesetting, the language of strings consisting of n a's, n b's, and n c's for all n. The important difference is that there must be the same number of a's, b's, and c's.

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Hello,Thanks a lot. then if that's the case, is the language a^nb*c^n is context free? –  Vinod Chelladurai Feb 25 '14 at 8:16
@VinodChelladurai: If you really do mean b* in there, rather than b^n, then yes, that's context free. –  user2357112 Feb 25 '14 at 8:44

a*b*c* is indeed regular. L={a^nb^nc^n | n>=0} is not regular.

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