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Find the element that appears once

Given an array where every element occurs three times, except one element which occurs only once. Find the element that occurs once.

Expected time complexity is O(n) and O(1) extra space.

Examples:

Input: arr[] = {12, 1, 12, 3, 12, 1, 1, 2, 3, 3}

Output: 2

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6  
Hint: sum them... –  wildplasser Dec 31 '12 at 10:06

3 Answers 3

up vote 3 down vote accepted

If O(1) space constraint was not there, you could've gone for a hashmap with values being the count of occurrences.

int getUniqueElement(int[] arr)
{
    int ones = 0 ; //At any point of time, this variable holds XOR of all the elements which have appeared "only" once.
    int twos = 0 ; //At any point of time, this variable holds XOR of all the elements which have appeared "only" twice.
    int not_threes ;

    for( int x : arr )
    {
        twos |= ones & x ; //add it to twos if it exists in ones
        ones ^= x ; //if it exists in ones, remove it, otherwise, add it

        // Next 3 lines of code just converts the common 1's between "ones" and "twos" to zero.

        not_threes = ~(ones & twos) ;//if x is in ones and twos, dont add it to Threes.
        ones &= not_threes ;//remove x from ones
        twos &= not_threes ;//remove x from twos
    } 
    return ones;
}

Basically, it makes use of the fact that x^x = 0 and 0^x=x. So all paired elements get XOR'd and vanish leaving the lonely element.

In short :

If a bit is already in ones, add it to twos.

XOR will add this bit to ones if it's not there or remove this bit from ones if it's already there.

If a bit is in both ones and twos, remove it from ones and twos.

When finished, ones contains the bits that only appeared 3*n+1 times, which are the bits for the element that only appeared once.

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As described here, Median of elements of an array can be found in worst-case O(n) time and O(1) extra-space. So we can solve the problem with divide-and-conquer method:

Find the median in O(n) time and count number of elements which are less than or equal to median in O(n). If this number is 3k+1, it means that answer is less than or equal to median, so omit the elements which are greater than median in O(n). Else, omit ones which are less than or equal to median. Then recursively find answer in remaining elements in T(n/2). Note: number of remaining elements is n/2 because we have omitted half of elements.

So T(n) = T(n/2)+O(n) = O(n) and we need O(1) extra space.

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Wow! Great answer! –  zplesivcak Dec 31 '12 at 13:41
    
Could you show that it works using the above example? Thank you –  alzaimar Dec 31 '12 at 13:43

I propose a solution similar to the one proposed by mhsekhavat. Instead of determining the median, I propose using the partition algorithm of the Dutch national flag problem http://en.wikipedia.org/wiki/Dutch_national_flag_problem (yes, I am dutch and was educated in Dijkstra's style).

The result of applying the algorithm is an array partitioned in a red, white and blue part. The white part can be considered the pivot. Note that the white part consists of all elements equal to the pivot, so the white part will exist of 1 or 3 elements. The red part consists of elements smaller than the pivot and the blue part consists of elements larger than the pivot. (Note that the red and blue parts are not sorted!)

Next, count the number of elements of the red, white and blue parts. If any part consists of 1 element, then that is the number you are looking for. Otherwise, either the red or the blue part consists of 3k+1 elements, for a given number of k. Repeat the algorithm on the part that consists of 3k+1 elements. Eventually one of the parts will have size 1.

The algorithm runs in O(n) and needs O(1) variables.

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