# Sorting Array in O(n) complexity

I was asked an interesting question at my interview at Atrenta. It was to sort an array with an complexity of O(n) which I said is not possible but he insisted it is, even after the interview.

It is like this.

You have an array, lets say : [1,0,1,0,1,1,0] and this needs to be sorted. What ever has to be done within the array (in the sense no other data structure involved.

I haven't and I don't think it is possible to do any sort with an complexity of O(n). The best I could think of is O(n * log n) and my knowledge comes from Wikipedia.

Please give me your ideas and well a way to do it if you know.

-
Read the rest of the Wikipedia article on sorting. `O(n log n)` only need apply to comparison based sorts, not e.g. radix sort. – A. Webb Nov 15 '12 at 17:09
Hint: count zeros! – mishadoff Nov 15 '12 at 17:10
This has been asked and answered numerous times on SO, e.g. stackoverflow.com/questions/7655659/…. – A. Webb Nov 15 '12 at 17:10
any constraint on the data set can result in a simplification of the algorithm. Here, if data are 0 and 1, a bucket sort is O(n+k), which is O(n+2), which is O(n) – njzk2 Nov 15 '12 at 17:17
a counting sort would work too. – njzk2 Nov 15 '12 at 17:19

In your example there are only two different values in the array, so you could use counting sort:

``````zero_count = 0
for value in array:
if value == 0:
zero_count += 1
for i in 0 ... zero_count:
array[i] = 0
for i in zero_count ... array.size:
array[i] = 1
``````

Radix sorts are a family of more generally applicable O(n) sorts.

It is comparison sorts that require Omega(n * log n) comparisons on average and hence cannot run in worst-case or average-case linear time.

-
Woups... :D I would have looked stupid! ha ha ha! – Ziyan Junaideen Nov 15 '12 at 17:19
that looks like python, so for beauty of short code, array.count(0) does it. (however, for big O measure, a for loop is more explicit, of course) – njzk2 Nov 15 '12 at 17:21
@njzk2: yeah, it's a Python-influenced pseudo-code. In actual Python, `zeros = array.count(0); return [0] * zeros + [1] * (len(array) - zeros)` would do it but like you say that doesn't make the complexity very explicit. – Steve Jessop Nov 15 '12 at 17:37

Traverse the array from both ends and Swap 1's and 0's when needed.Runs in O(n) but has all the if conditions(bruteforce like approach.probably not the expected answer) ;)

``````int i = 0 ;
int j = array.size -1 ;
for ( i = 0 ; i < j ; ) {

if( array[i] == 1) {
if( array[j] == 0 ) {
array[j] = 1 ; array[i] = 0 ; //Swap
i++; j--;
continue;
}
//else
j--;
continue;

}
//else
if( array[j] == 0 ) {
i++;
continue;
}

//else
i++ ;
j--;
}
``````
-
I think Steve's answer using counting sort was the expected answer there – DinushanM Dec 5 '12 at 6:33
Both works! this is kind of sort, that is called counting I guess! – Ziyan Junaideen Dec 6 '12 at 5:22