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I'm trying to wrap my head around CGS's. Let E^* be 'epsilon star', e be the empty string, and ww^r be w next to the reverse of w.

I know that building up a CFG to accept E^* is a simple S -> 0S | 1S | e.

A CGG that accepts {ww^r} such that w in E^* is a simple S –> 0S0 | 1S1 | e.

Does that mean a CFG accepting {wxw^r} such that w, x in E^* is a sort of 'composition' of these two resulting in S –> 0S0 | 1S1 | e | B where B –> 0B | 1B | e?

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possible duplicate of Why L={wxw^R| w, x belongs to {a,b}^+ } is a regular language –  Patrick87 Feb 22 '13 at 16:40
this Title for you question is not correct: CFG and its reverse –  Grijesh Chauhan Feb 23 '13 at 11:22
@clever Although You have accepted but I made some changes in answer and added one more link. –  Grijesh Chauhan Feb 24 '13 at 19:11

1 Answer 1

up vote 1 down vote accepted

Yes, your grammar is correct!

CFG to {wxw^r} such that w, x in E^* is S –> 0S0 | 1S1 | e | B where B –> 0B | 1B | e is correct grammar.

But important is Language {wxw^r} such that w, x in E^* is Regular Language so it also possible to write Left-Linear and Right-Linear Grammars.

A Right-Liner equivalent Grammar for this language is:

S --> 0B | 1A | ^
B --> 0B | 1B | 0
A --> 0A | 1A | 1

And Left Liner equivalent is:

S --> B0 | A1 | ^
B --> B0 | B1 | 0
A --> A0 | A1 | 1

Its regular expression is:

0(0 + 1)*0 + 1(0 + 1)*1 + ^

A similar language I described here in my answer with DFA.

note: language structure is same but symbol are not, also there is ^ null string is not possible. Also there is + on ( 0 + 1) here is *



Additionally, I would also encourage you to view DFA for 0(1 + 0)*0 + 1(1 + 0)*1 . Notice a small change of ^ in RE but DFAs are quite different.

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Umm, wxw^r - where w^r is the reverse of w - is not regular. You can prove this easily using the Myhill-Nerode theorem or the pumping lemma for regular languages. –  Patrick87 Feb 22 '13 at 16:33
@Patrick87 Are you serious?? Please think again –  Grijesh Chauhan Feb 22 '13 at 16:37
Oh wait a sec, you're right. :) Forgot about this one. Looking at the linked question, it looks like I got the right answer there. Oops. –  Patrick87 Feb 22 '13 at 16:39

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