Stack Overflow is a community of 4.7 million programmers, just like you, helping each other.

Join them; it only takes a minute:

Sign up
Join the Stack Overflow community to:
  1. Ask programming questions
  2. Answer and help your peers
  3. Get recognized for your expertise

I am trying to create a regular expression that determines if a string (of any length) matches a regex pattern such that the number of 0s in the string is even, and the number of 1s in the string is even. Can anyone help me determine a regex statement that I could try and use to check the string for this pattern?

share|improve this question
What have you tried? – Bart Kiers Apr 18 '12 at 7:16
is there any limit as to how long that string (containing the binary) might be? how many bits? – Dr.Kameleon Apr 18 '12 at 7:21
There is no limit (except for whatever the string character limit is obviously). :-( – canton Apr 18 '12 at 7:25
@BartKiers Sorry i missed your initial post. I have tried breaking the options down to repeatable 2,4,8 character sections but have failed to find something that is capable of capturing all available options. – canton Apr 18 '12 at 7:34
@pst, does the pumping lemma work? You just take p = 4, and y to be the first occurrence of 11 or 00 (or if that doesn't occur in the first 4 characters: 1010 or 0101), then it satisfies the condition of the pumping lemma (as far as I understand), and the proof by contradiction fails. – huon Apr 18 '12 at 7:44

So completely reformulated my answer to reflect all the changes:

This regex would match all strings with only zeros and ones and only equal amounts of those


See it here on Regexr

I am working here with positive lookahead assertions. The big advantage here of a lookahead assertion is, that it checks the complete string, but without matching it, so both lookaheads start to check the string from the start, but for different assertions.

  1. (?=1*(?:01*01*)*$) does check for an equal amount of 0 (including 0)

  2. (?=0*(?:10*10*)*$) does check for an equal amount of 1 (including 0)

  3. .* does then actually match the string

Those lookaheads checks:

    1*    # match 0 or more 1
    (?:   # open a non capturing group
        0     # match one 0
        1*    # match 0 or more 1
        0     # match one 0
        1*    # match 0 or more 1
    *     # repeat this pattern at least once
    $     # till the end of the string
share|improve this answer
It works; though it doesn't recognize 11, or 1111, but it works... Well done! ;-) – Dr.Kameleon Apr 18 '12 at 7:43
So I'm just a tad bit confused. That's pretty incredible. But how does that not accept the pattern 00000? Because we've matched 0 with each of your 3 separate [0^\s]* checks and additionally a 0 with each 0 check. – canton Apr 18 '12 at 7:53
@Dr.Kameleon added workaround to allow the completely absence of a digit. – stema Apr 18 '12 at 7:54
@dbaupp I thought again over my solution and of course there is a solution without alternation. I updated my answer. – stema Apr 18 '12 at 8:48
If you're only going to allow 0 and 1 anyway (via the part of the regex that actually consumes the matching characters, namely the ^[01]*$ part, then you don't need all those [^0\s]* and [^1\s]* - 1* and 0* will work just as well. – Tim Pietzcker Apr 18 '12 at 8:50

For even sets of 0s, you can use the following regex to ensure that the number of 0s is even.


However, I believe that the question is to have both an even number of 0s and also an even number of 1s. Since it is possible to construct a non-deterministic finite automaton (NFA) for this problem, the solution is regular and can be represented using a regex expression. The NFA is represented via the machine below, S1 is the start/exit state.

S1 ---1----->S2
|^ <--1----- |^
||           ||
00           00
||           ||
v|           v|

From there, there's a way to convert NFAs to regex expressions but it's been a while since my computation course. There's some notes below that seem to be helpful in explaining the steps required to convert a NFA to a regex.

share|improve this answer
Based on this, I think ^((1|0(11)*10)(00|0110)*(1|01(11)*0)|0(11)*0)*$ works. (It can possibly be factorised smaller). – huon Apr 18 '12 at 8:25
I've been working on the solution as well but that looks right to me. I'm not sure what the tradeoffs are between using the lookaheads. However, I'm guessing this is a homework problem (otherwise there are far easier ways of tackling this solution). – David Z. Apr 18 '12 at 8:40
Nope, I was wrong. That one doesn't match 10111101, but this does: ^((1|0(11)*10)(0(11)*0)*(1|01(11)*0)|0(11)*0)*$ – huon Apr 18 '12 at 8:50
up vote 4 down vote accepted

So, I have come up with a solution to the problem:

share|improve this answer
+1. Clever solution. It would be written as ^(11|00|(10|01)(11|00)*(10|01))*$ in common regex flavors. The trick here is to realize that the question is in fact equivalent to "even number of As in a string of As and Bs", where A is matched by 10|01 and B is matched by 11|00. – Qtax Jul 2 '12 at 11:49


Try this : [ check out this demo : ]


Hint :

Even numbers are divisible by 2, thus - in binary - they always end in zero (0)

share|improve this answer
This is for even binary numbers ... does not mean that count(0) is even and count(1) is even ... – user166390 Apr 18 '12 at 7:19
@pst Looks like you've got a point here; I misread the question... Let me think about it a bit... – Dr.Kameleon Apr 18 '12 at 7:20
Yes, @pst is correct. I'm not looking at the binary value; I'm only concerned with the numbers of 1s and 0s. Thank you. – canton Apr 18 '12 at 7:24
@canton Just updated my answer; check it out ;-) – Dr.Kameleon Apr 18 '12 at 7:25
@Dr.Kameleon wouldn't that allow the string 0111? that would only assert that the total number of characters is even, I believe. – canton Apr 18 '12 at 7:30

Not a regular expression (which is likely to be impossible, although I can't prove it: the proof by contradiction via the pumping lemma fails), but the "correct" solution is avoiding a complicated and inefficient regular expression all together and using something like (in Python):

def even01(string):
     return string.count("1") % 2 == 0 and string.count("0") % 2 == 0

Or if the string has to consist only of 1s and 0s:

import re
def even01(string):
     return not"[^01]",string) and \
            string.count("1") % 2 == 0 and string.count("0") % 2 == 0
share|improve this answer

If I haven't overlooked anything, this matches any bit string where the number of 0s is even and the number of 1s is even, using only rudimentary regex operators (*, ^, $). It's slightly easier to see how it works if written like this:


The following test code should illustrate the correctness - we compare the result of the pattern match against a function that tells us if a string has an even number of 0s and 1s. All bit strings of length 16 are tested.

import re

balanced = lambda s: s.count('0') % 2 == 0 and s.count('1') % 2 == 0

pat = re.compile('^(0((1(00)*1)*0|1(11|00)*01)|1((0(11)*0)*1|0(11|00)*10))*$')

size = 16
num = 2**size
for i in xrange(num):
    binstr = bin(i)[2:].zfill(size)
    b, m = balanced(binstr), bool(pat.match(binstr))
    if b != m:
        print "balanced('%s') = %d, pat.match('%s') = %d" % (binstr, b, binstr, m)
    elif i != 0 and i % (num / 10) == 0:
        # Python 2's `/` operator performs integer division
        print "%d percent done..." % (100 * i / num + 1)
share|improve this answer

If you try to solve within the same sentence (starting with ^ and ending with $), you are in deep trouble. :-)

You can make sure that you have an even number of 0s (with ^(1*01*01*)*$, as stated by @david-z) OR you can make sure that you have an even number of 1s:


It works for strings with small lengths as well, such as "00" or "101", both valid strings.

share|improve this answer

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

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