# Is it possible to simplify this regular expression any further?

I'm working on some homework for my compiler class and I have the following problem:

Write a regular expression for all strings of a's and b's that contain an odd number of a's or an odd number of b's (or both).

After a lot of whiteboard work I came up with the following solution:

``````(aa|bb)* (ab|ba|a|b) ((aa|bb)* (ab|ba) (aa|bb)* (ab|ba) (aa|bb)*)*
``````

However, Is this is the most simplified I can get it? I've considered constructing the DFA trying to minimize the number of states there to see if it would help me simplify but I figured I would ask the regex gurus on SO first.

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What advanced features of regex are you allowed to use? –  Brad Gilbert Sep 16 '09 at 19:30
he is using regular expressions in Computer Science, not PCRE or posix regex's ;) They are different. –  Byron Whitlock Sep 16 '09 at 19:31
@Brad Gilbert, I assume we are only allowed to use the regex which has been introduced so far in the book which isn't much. (*, +, ?, |, [], ^). Pretty plain. –  Simucal Sep 16 '09 at 19:33
Brings back memories from when I graded such homework as a TA. Some of the most interesting stuff I've graded, by far. :) –  Greg D Sep 16 '09 at 19:35
Thank you everyone! From the combined insight of Greg D, Walt W, and sepp2k we were able to come up with a valid answer. –  Simucal Sep 16 '09 at 20:14
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Take Greg D's recommendation of starting with a(aa)*, and going from there. Sepp2k almost has it right, but the real consideration is that you don't care about the other letter. What I mean is, when you are looking at the "odd number of a's" constraint, you don't care at all about what b's are in your string. Thus, stick b*'s anywhere you can :)

Sepp2k's answer is almost right, but this one is correct:

``````b* a b* (a b* a b* )* | a* b a* (b a* b a* )*
``````

To elaborate, this regex figures out all strings with an odd number of a's (first section), and OR's those strings with any strings containing an odd number of b's.

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@Walt W, I'm running this one through its paces but I think you are correct. –  Simucal Sep 16 '09 at 20:05
please tell me the regular expression for any string that contain even number of a's and even number of b's ? –  nadeem gc Sep 21 '13 at 7:00
Do you mean an even number of a's OR an even number of b's? I suppose you could do an AND with zero-length lookaheads... That's not standard regex stuff though. If you want to change this equation from odd to even, just drop the first two terms of each segment (b*a from the left side and a*b from the right side) –  Walt W Sep 23 '13 at 23:35

This should work:

``````b* a b* (a b* a b*)* |  a* b a* (b a* b a*)*
``````
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I was writing something similar :) To elaborate, this regex figures out all strings with an odd number of a's (first section), and OR's those strings with any strings containing an odd number of b's. There's a slight error here though, as first term needs b* at the end, and second option needs a* at the end. Otherwise, abbba will not be accepted. –  Walt W Sep 16 '09 at 19:55
@sepp2k, this is working in all my test cases. Can you describe your thought process when you were making that? It is far simpler than the path I was going down. –  Simucal Sep 16 '09 at 19:55
Nobody said it can't be ambiguous. Walt is correct, it isn't finished, but all the important bits are there. :) –  Greg D Sep 16 '09 at 19:57
@Walt W: You're absolutely right. Fixed. @Simucal: Walt explained it pretty well. –  sepp2k Sep 16 '09 at 19:57
@sepp2k, yea, we submitted out comments at the same time. –  Simucal Sep 16 '09 at 19:58
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I'm afraid that I don't believe your regex as written is correct. Consider the string:

``````aba
``````

We have a couple choices for matches, but the fact that it's odd-length means we must match a lone a at the front, so:

``````(a)(ba)
``````

But, sadly, it's impossible for your second main grouping there to match (ba).

When dealing with a constraint like this, I found it easier to start from the core constraint and go from there. In this case, your constraint is "odd," so start with

``````a(aa)*
``````

to force an odd number of `a`'s and go from there. :)

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@Greg D, that is true. Let me think on it for a second. –  Simucal Sep 16 '09 at 19:42
You are trying to match anything that doesn't have even numbers of both `a` and `b`.
It would probably be easier to start with something that matches even numbers of `a` and `b`. All you have to do at that point would be to add something on the end that matches the smallest string that you actually want to match.