# highly optimized algo to sort an array consisting of only 0s n 1s

I need to find a highly optimized algo to sort an array consisting of only 0s n 1s.

My version of the solution is to count the no. of zeroes(say x) and ones(say y). Once you do that, place x zeroes in the array followed by y 1s. This makes it O(n).

Any algo that runs better than this??? I was asked this question in interview.

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You do have to scan the complete array once. That makes it O(n). I dont think any other algorithm can better O(n). –  Vikas May 17 '12 at 14:41

Since you have to examine each of `n` input elements, you can't improve on `O(n)`.

Also, since your algorithm requires `O(1)` memory, you can't improve on that either (there's nothing asymptotically better than `O(1)`).

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we can't do better than O(n), but looks like we can do in one pass

``````low = 0;
high = arr.length - 1;

while (low < high) {
while (arr[low] == 0) {
low ++;
}
while (arr[high] == 1) {
high --;
}
if (low < high) {
//swap arr[low], arr[high]
}
}
``````
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If you sum the array, you could have the number of 1's, slightly more efficient, but still O(n).

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You can't be more efficient than O(N) because each item needs to be inspected.

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What kind of an "array" are we talking about? If we were to count the bits in a 16-bit unsigned integer then several O(1) time algorithms have been developed: see Fast Bit Count Routines.

This is one of the algorithms presented there; the one they call the Nifty Parallel Count:

``````#define MASK_01010101 (((unsigned int)(-1))/3)
int bitcount (unsigned int n) {