# In less-than-linear time, find the duplicate in a sorted array

Today, an interviewer asked me this question. My immediate response was that we could simply do a linear search, comparing the current element with the previous element in the array. He then asked me how the problem could be solved in less-than-linear time.

Assumptions

• The array is sorted
• There is only one duplicate
• The array is only populated with numbers `[0, n]`, where `n` is the length of the array.

Example array: [0,1,2,3,4,5,6,7,8,8,9]

I attempted to come up with a divide-and-conquer algorithm to solve this, but I'm not confident that it was the right answer. Does anyone have any ideas?

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your example includes only numbers `[0,n-2]` (there are no `10`, `11`) Is it just an example or a general rule? –  J.F. Sebastian Mar 17 '12 at 18:33

Can be done in O(log N) with a modified binary search:

Start in the middle of the array: If array[idx] < idx the duplicate is to the left, otherwise to the right. Rinse and repeat.

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It should be `array[idx]-array[0]` for generic version. –  user Jul 10 '13 at 15:50

I attempted to come up with a divide-and-conquer algorithm to solve this, but I'm not confident that it was the right answer.

Sure, you could do a binary search.

If `arr[i/2] >= i/2` then the duplicate is located in the upper half of the array, otherwise it is located in the lower half.

``````while (lower != upper)
mid = (lower + upper) / 2
if (arr[mid] >= mid)
lower = mid
else
upper = mid-1
``````

Since the array between `lower` and `upper` is halved in each iteration, the algorithm runs in O(log n).

ideone.com demo in Java

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in Python –  J.F. Sebastian Mar 17 '12 at 12:13

If no number is missing from the array, as in the example, it's doable in O(log n) with a binary search. If `a[i] < i`, the duplicate is before `i`, otherwise it's after `i`.

If there is one number absent and one duplicate, we still know that if `a[i] < i` the duplicate must be before `i` and if `a[i] > i`, the absent number must be before `i` and the duplicate after. However, if `a[i] == i`, we don't know if missing number and duplicate are both before `i` or both after `i`. I don't see a way for a sublinear algorithm in that case.

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The example array is a little bit different from your question. Since n is the length of array and there are one and only duplicate in array, the value of each element in array should be in [0,n-1].

If that is true, then this question is the same one with How to find a duplicate element in an array of shuffled consecutive integers?

The following code should find the duplicate in O(n) time and O(1) space.

``````public static int findOnlyDuplicateFromArray(int[] a, boolean startWithZero){
int xor = 0;
int offset = 1;
for(int i=0; i < a.length; i++){
if(startWithZero)
xor = xor ^ (a[i] + offset) ^ i;
else
xor = xor ^ a[i] ^ i;
}
if(startWithZero)
xor = xor - offset;
return xor;
}
``````
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Sorry, this is not a less linear time. Should use binary search to achieve the goal. –  user1106083 Mar 17 '12 at 6:54

How about that? (recursion style)

``````public static int DuplicateBinaryFind(int[] arr, int left, int right)
{
int dup =0;

if(left==right)
{
dup = left;
}
else
{
int middle = (left+right)\2;
if(arr[middle]<middle)
{
dup = DuplicateBinaryFind(arr,left, middle-1);

}
else
{
dup = DuplicateBinaryFind(arr, middle+1, right);
}
}

return dup;

}
``````
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