# How can I tell a regular language?

As we know, using pumping lemma, we can easily prove the language L = {WW|W ∈ {a,b}*} is not a regular language.

However, The language, L1 = {W1W2| |W1| = |W2|} is a regular language. Because we can get the DFA like below,

My question is, L = {WW|W ∈ {a,b}*} also has the even length of strings (|w|=|w|, definitely), L still can have some dfa like above. How come it not a regular language?

Thanks.

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In my opinion, this question belongs to cstheory.stackexchange.com –  Lorenzo Dematté Jan 25 at 12:50
Personally, I'd say cs.stackexchange.com, as this doesn't seem like something you'd write a Ph.D. about? Maybe I'm just too snobby, in that regard. =) –  J. Steen Jan 25 at 12:53
@dema80, Yeap, wrong place to put this thread. Sorry.:-) –  henry Jan 26 at 16:35

You are misinterpreting languages `ww` and language of `DFA` that is L1:

[Question]:

• `L ={ ww| w = w}` is a Regular Language`(RL)`. Because we can get the `DFA` like below is possible.

``````DFA:  L1 ={ w1w2| |w1| = |w2|, where w1 , w2 ∈ {a, b}* }

--►((even))------a,b---------►(odd)
▲                         |
|--------a,b--------------|
``````

[DOUBT]

What is L ={ ww | where w ∈ {a, b}* } is ?

L is even length string consist of `a` and `b` that is has some prefix sub string equal to suffix sub string. some example of `L` are `{ aa, bb, abab, aaaa, bbbb, abaaba, abbabb, .....}`

Whats language of DFA or L1 ={ w1w2| |w1| = |w2|, where w1 , w2 ∈ {a, b}* } ?

All even length strings consist of `a` and `b` say `L1` for example `{ab, ba, aabb, baab, ab, aa, bb, ababa, baba, abbba, ...}`

Note: all even length strings consist of `a` and `b` are not in `L` for example `{ab, ba, aabb, baab, ab}` but this string in `DFA`'s language = L1.

so, `L(DFA)=L1 != L`

[DOUBT-1]

Relation between `L` and `L(DFA)=L1` ?

As I wrote in note, `L ⊆ L(DFA)` so every string that belongs to `L` also element of language of DFA and accepted you `DFA`. (this is you confusion)

Also, language `L ={ ww| |w| = |w| }` is not Regular Language.And we can't draw `DFA` for this language. BOTH LANGUAGES ARE NOT SAME! `(L != L1)`

`L` is much restricted then `L(DFA)`

`L`= `{ WW|W }` is not regular can be proof using pumping lemma.

`L` also not even context free language, but context sensitive language

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Hi, Grijesh, I really appreciate you for putting so much effort on this thread!! :-) As you mention, "Note: all even length strings consist of a and b are not in L1 for example {ab, ba, aabb, baab, ab} but this string in DFA's language." I don't know why L1 can not contain these strings, since W1 maybe not equal to W2, ONLY the length of W1 and W2 are the same. That means, if W1=a, W2=b, then the string is ab ∈ L1. Form "even" state ---> a ---> "odd" state ---> b ---> "even" state. Accept. –  henry Jan 26 at 16:31
@henry Sorry I made mistake..now corrected –  Grijesh Chauhan Jan 27 at 4:27