# Regular expression problem

What is the regular expression for the language 0m1n where m+n is even?

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Either I'm tired or your question makes very little sense. –  Andy E Mar 9 '10 at 15:22
Yes, it does. I'd explain it, but all I'd be doing is copying the question here -- I don't think it can be much simpler than that. –  Michael Myers Mar 9 '10 at 15:27
Why people above don't try to help but joke with the question? it can be wrong or very simple. that doesn't mean, it doesn't have an answer. –  erasmus Mar 9 '10 at 15:31
Why was this question closed? Its a question about computation which is the basis of programming. Its a valid question although definitely homeworkish. Its a pretty interesting boundary case of a regular language that doesn't look regular. –  Il-Bhima Mar 9 '10 at 15:34
@Binary Worrier, @Andy E please explain what is wrong for you with this question? People want to learn here. why their questions are closed and mocked? –  erasmus Mar 9 '10 at 15:40

If you mean a string `000...111...` where the length of the string is even, you can use `^(00)*(01)?(11)*\$`

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this is not an answer because it also validates 00 01 1 11 whose lenght is not even. –  erasmus Mar 9 '10 at 15:53
That's because I forgot to anchor the regex. It works correctly now. –  SLaks Mar 9 '10 at 15:55
+1 for the answer. Now, how do I up-vote you for understanding the question in the first place? –  Amarghosh Mar 9 '10 at 16:06
My 1600th answer, and a fitting one too. –  SLaks Mar 10 '10 at 1:31
Yes, +1 for understanding the question in the first place, then answering so casually! Wow, that's style. :) @Amarghosh, if you remember your comment from four years ago, I took care of that for you. :) –  zx81 Jul 23 '14 at 5:15

Ok, so you need to consider for zero the cases when there are odd and when they are even. This requires two states, one for even zeros, one for odd zeros. Then for the odd zero case you need to have 1 one then an even number of ones. For the even case you just need an even number of ones.

Its easy to write the DFA, but I don't know how to plot it here, so I'm going to hazard a guess at the regular expression:

``````(0 (00)* 1 (11)*) \/ (00)*(11)*
``````
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Here're plotted machines for that regex. Full NFA: static.max99x.com/misc/nfa.png. Cleaned NFA: static.max99x.com/misc/nfa2.png. Minimized DFA: static.max99x.com/misc/dfa.png. –  Max Shawabkeh Mar 9 '10 at 19:13
@Max: Awesome! Is that a tool of your own design? I remember implementing a NFA to minimal DFA converter many years ago, but it never occurred to me to render it with graphviz :) –  Il-Bhima Mar 9 '10 at 21:59
@Il-Bhima: Yeah. max99x.com/school/automata-editor. Might be somewhat buggy, though, since it was a quick school project. –  Max Shawabkeh Mar 9 '10 at 22:16