23

Write an expression that contains an even number of 0s or an odd number of 1s

I got it down to:

1*(01*01*)* + 0*10*(10*10*)*

where the first part represents an even number of 0s and the second part an odd number of 1s

However, there's supposed to be a simplified solution that I'm not seeing. Any tips?

13
  • What programming language uses + for alternatives in regexp? AFAIK, that's only used in automata theory, not when programming.
    – Barmar
    Dec 10, 2013 at 3:31
  • 7
    homework huh? LOL
    – jondinham
    Dec 10, 2013 at 4:18
  • 1
    I tried this on regexpal.com and it seemed to work: ^(1(11)*|(00)+)$
    – bdean20
    Dec 10, 2013 at 5:21
  • 2
    I just wrote a regex from scratch OP and came up with a regex of exactly the same length as yours (and 95% identical). I intentionally didnt read over yours first so I suspect there might not be a shorter expression.
    – OGHaza
    Dec 19, 2013 at 18:01
  • 1
    @user3085290 Do you want "an even number of 0s and an odd number of 1s" or "an even number of 0s or an odd number of 1s"? Dec 21, 2013 at 18:32

6 Answers 6

19

Odd-1s part: 0*1(0|10*1)*

Even-0s part, depends:

  1. Empty string is correct: (1|01*0)*
  2. No-0s is even-0s: (1|01*0)+
  3. Must have at least two 0s: 1*(01*01*)+ (as in OP)

old answer: correct under case 1 and 2

(1*(01*0)*)+ | 0*1(0*(10*1)*)*

Kudos to @OGHaza for helpful comments.

12
  • example of string with odd number of 1s that isn't matched
    – OGHaza
    Dec 19, 2013 at 17:38
  • @OGHaza you're right, had a + instead of a * there, thanks! regexr.com?37nfq Dec 19, 2013 at 17:46
  • 1
    It doesn't appear to match the empty string (zero 0s is still even). Easy to fix though: changing any or both +s to *.
    – DPenner1
    Dec 19, 2013 at 18:34
  • @DPenner yeah, I'm intentionally forcing it to be non-empty Dec 19, 2013 at 18:35
  • Well you shaved 4 chars from OPs regex and I think you've taken it as far as it can go ;) +1
    – OGHaza
    Dec 19, 2013 at 19:18
11
+100

Making use of the fact that even-length strings ALWAYS satisfy your constraints:

^(([01]{2})*|1*(01*01*)*)$
3
  • This uses as many symbols as my regex, but I think that very nice catch about even length strings deserves this bounty. Note that this regex requires the no 0s-is-even-0s case. Dec 25, 2013 at 2:51
  • 1
    It would be shorter if 1*(01*01*)* was replaced by (1|01*0)* (as in @JuliánUrbano's solution). But yes, very smart, +1!
    – Volatility
    Dec 25, 2013 at 3:17
  • and even more importantly...shortest execution time as well!
    – gillyspy
    Dec 28, 2013 at 3:25
1

Define "shortest". If you're looking for the shortest evaluation time (i.e. fastest) then make sure you do not use capture groups.

here's an example in javascript

^(?:1*(?:01*0)*)+|0*1(?:0*(?:10*1)*)*$

which shows as 20% faster than this expression that uses capture groups but will give you the same answer

^(1*(01*0)*)+|0*1(0*(10*1)*)*$
4
  • I mean shortest as in fewest symbols. After all, non-capturing groups are just language-dependent sugar. Dec 24, 2013 at 15:02
  • yes I think we know what you were going for @JuliánUrbano. So my question is for the op. You're not also the op are you? But for you julian...curious on in what practical scenarios would you (you specifically not the general "you") would prefer the shortest length of expression and not the shortest evaluation time?
    – gillyspy
    Dec 24, 2013 at 17:45
  • the bounty is just for fun, to see if there is something shorter Dec 24, 2013 at 17:47
  • your comment came in before I saved my question so to clarify: so no practical purpose, just for fun? Also, can we get confirmation that you and the op mean "shorter" in the same way? And who is down-voting me any way, is there some way in which my answer / comments are not relevant given the information we are provided?
    – gillyspy
    Dec 24, 2013 at 17:50
0

The most simplified solution I found is:

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

what about this expression:

(1(11)*+(00)*)

0

With the fewest symbols,

1*(01*01*)*

Your Answer

By clicking “Post Your Answer”, you agree to our terms of service and acknowledge you have read our privacy policy.

Not the answer you're looking for? Browse other questions tagged or ask your own question.