# Remove duplicates from array in linear time and without extra arrays

We have an array and it is unsorted. We know the range is [0,n].

We want to remove duplicates but we cannot use extra arrays and it must run in linear time.

Any ideas? Just to clarify, this is not for homework!

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language?....... – Srinivas Reddy Thatiparthy Mar 24 '11 at 4:44
I'm not entirely sure you can do this to be honest. I mean there is counting sort, but that requires additional space. – zellio Mar 24 '11 at 4:46
I'm with Mimisbrunnr -- I'm not sure this can be done. Googling suggests that using a hashmap (which probably isn't allowed, here) is the fastest, easiest way to do it; If there were a clever, linear-time algorithm that didn't require extra memory it would be easy to find. – Haldean Brown Mar 24 '11 at 4:53
Yes, it is an array of ints. You can reorder the array as long as you finish with O(n) running time. – Geoff C. Mar 24 '11 at 4:55
We know that all integers in the array are between 0 and n. – Geoff C. Mar 24 '11 at 5:03

If the integers are limited 0 to n, you can move through the array, placing numbers by their indices. Every time you replace a number, take the value that used to be there and move it to where it should be. For instance, let's say we have an array of size 8:

``````-----------------
|3|6|3|4|5|1|7|7|
-----------------
S
``````

Where S is our starting point, and we'll use C to keep track of our "current" index below. We start with index 0, and move 3 to the 3 index spot, where 4 is. Save 4 in a temp var.

``````-----------------
|X|6|3|3|5|1|7|7|   Saved 4
-----------------
S     C
``````

We then put 4 in the index 4, saving what used to be there, 5.

``````-----------------
|X|6|3|3|4|1|7|7|   Saved 5
-----------------
S       C
``````

Keep going

``````-----------------
|X|6|3|3|4|5|7|7|   Saved 1
-----------------
S         C

-----------------
|X|1|3|3|4|5|7|7|   Saved 6
-----------------
S C

-----------------
|X|1|3|3|4|5|6|7|   Saved 7
-----------------
S           C
``````

When we try to replace 7, we see a conflict, so we simply don't place it. We then continue from the starting index S, increment it by 1:

``````-----------------
|X|1|3|3|4|5|6|7|
-----------------
S
``````

1 is fine here, 3 needs to move

``````-----------------
|X|1|X|3|4|5|6|7|
-----------------
S
``````

But 3 is a duplicate, so we throw it away and keep iterating through the rest of the array.

So basically, we move each entry at most 1 time, and iterate through the entire array. That's O(2n) = O(n)

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This requires additional space in some cases. What if you have { 0, 1, 20 } as your array? then you need an array of size 20. – zellio Mar 24 '11 at 5:28
You probably also need to do compression of the array at the end by removing items that are marked with X above (i.e. -1 could be used to mark missing items). To remove items just go through all elements once and copy to last free space O(n) again. – Alexei Levenkov Mar 24 '11 at 5:31
@Mimisbrunnr Integers are limited from 0..n, where n is the size of the array – Jeff Mar 24 '11 at 5:32
hrmm, I suppose so, my bad. – zellio Mar 24 '11 at 5:35
Or did I misread? I agree this won't work if n > the size of the array. – Jeff Mar 24 '11 at 5:38
``````    void printRepeating(int arr[], int size)
{
int i;
printf("The repeating elements are: \n");
for(i = 0; i < size; i++)
{
if(arr[abs(arr[i])] >= 0)
arr[abs(arr[i])] = -arr[abs(arr[i])];
else
printf(" %d ", abs(arr[i]));
}
}
``````
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Assume `int a[n]` is an array of integers in the range [0,n-1]. Note that this differs slightly from the stated problem, but I make this assumption to make clear how the algorithm works. The algorithm can be patched up to work for integers in the range [0,n].

``````for (int i=0; i<n; i++)
{
if (a[i] != i)
{
j = a[i];
k = a[j];
a[j] = j;  // Swap a[j] and a[i]
a[i] = k;
}
}

for (int i=0; i<n; i++)
{
if (a[i] == i)
{
printf("%d\n", i);
}
}
``````
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+1 for codifying it :) – Jeff Mar 24 '11 at 5:48
in the second if it's an assignment operator instead of comparison – Eugene Zhenya Gordin May 22 '13 at 22:08

Can you sort? Sort with Radix Sort - http://en.wikipedia.org/wiki/Radix_sort with complexity O(arraySize) for given case and then remove duplicates from sorted array O(arraySize).

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Walk through the array assign array[array[i]] = -array[array[i]]; if not negative; if its already negative then its duplicate, this will work since all values are within 0 and n.

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