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An interview question that I came across:

Given an array of numbers, divide the numbers into two sets such that difference between the sum of numbers in two sets is minimum.

This is the idea that I have, but I am not sure if this is a correct solution:

  1. sort the array
  2. Take the first 2 elements..consider them as 2 sets (each having 1 element)
  3. Take the next element from the array.
  4. Now decide into which set should this element go (by computing the sum..it should be minimum)
  5. repeat

Is this the correct solution? Can we do better?

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8 Answers 8

up vote 13 down vote accepted

The problem you are describing is the partition problem. Finding an optimal solution is NP-complete however there are a number of approximations that are almost perfect for most cases.

In fact, the algorithm you described is the way playground kids would pick teams. This greedy algorithm performs remarkably well if the numbers in the set are of similar orders of magnitude. Sure, it's not the best solution, but considering how the problem is NP-complete, it's pretty gosh darned good for it's simplicity.

This article in American Scientist gives an excellent analysis of the problem and you should go through and read it: The Easiest Hard Problem.

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umm, I don't think his solution will work. For example, consider the following set: 11 10 8 7 6 –  d34th4ck3r Aug 5 '13 at 2:46

No, that doesn't work. There is no polynomial time solution (unless P=NP). The best you can do is just look at all different subsets...


Consider the list [0,1,5,6].

You will claim {0,5} and {1,6} when the best answer is actually {0,1,5} and {6}

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That's not true. The greedy solution will put 6 into set A, 5 into set B, 1 into set B, 0 into set A. This is optimal. –  tskuzzy Jul 6 '11 at 14:05
Which greedy solution? I believe that the solution that the OP proposed would perform as I described. Regardless, it's rather moot as the problem is np-complete... –  sshannin Jul 6 '11 at 14:09
I was referring to the OP's solution. I think we made differing assumptions when reading his solution. During the sort phase, I assumed that he would sort in descending order as is natural for this particular problem. You assumed ascending which I agree would yield a rather terrible solution. –  tskuzzy Jul 6 '11 at 16:22

Combinations over combinations approach:

import itertools as it

def min_diff_sets(data):
        - `data`: input list.
        - min diff between sum of numbers in two sets

    if len(data) == 1:
        return data[0]
    s = sum(data)
    # `a` is list of all possible combinations of all possible lengths (from 1
    # to len(data) )
    a = []
    for i in range(1, len(data)):
        a.extend(list(it.combinations(data, i)))
    # `b` is list of all possible pairs (combinations) of all elements from `a`
    b = it.combinations(a, 2)
    # `c` is going to be final correct list of combinations.
    # Let's apply 2 filters:
    # 1. leave only pairs where: sum of all elements == sum(data)
    # 2. leave only pairs where: flat list from pairs == data
    c = filter(lambda x: sum(x[0])+sum(x[1])==s, b)
    c = filter(lambda x: sorted([i for sub in x for i in sub])==sorted(data), c)
    # `res` = [min_diff_between_sum_of_numbers_in_two_sets,
    #           ((set_1), (set_2))
    #         ]
    res = sorted([(abs(sum(i[0]) - sum(i[1])), i) for i in c],
            key=lambda x: x[0])
    return min([i[0] for i in res])

if __name__ == '__main__':
    assert min_diff_sets([10, 10]) == 0, "1st example"
    assert min_diff_sets([10]) == 10, "2nd example"
    assert min_diff_sets([5, 8, 13, 27, 14]) == 3, "3rd example"
    assert min_diff_sets([5, 5, 6, 5]) == 1, "4th example"
    assert min_diff_sets([12, 30, 30, 32, 42, 49]) == 9, "5th example"
    assert min_diff_sets([1, 1, 1, 3]) == 0, "6th example"
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Are you sorting your subset into decending order or ascending order?

Think about it like this, the array {1, 3, 5, 8, 9, 25}

if you were to divide, you would have {1,8,9} =18 {3,5,25} =33

If it were sorted into descending order it would work out a lot better

{25,1}=26 {9,8,5,3}=25

So your solution is basically correct, it just needs to make sure to take the largest values first.

EDIT: Read tskuzzy's post. Mine does not work

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thank you for your answer...what if there are negative numbers in the array? –  maxpayne Jul 6 '11 at 13:40
This doesn't work. Consider [4,14,15,16,17]. You will claim {17,14,4} and {16,15} when the best answer is {17,16} and{15,14,4} –  sshannin Jul 6 '11 at 13:41
Yeah you are correct. Now I have to think about this more. –  Collecter Jul 6 '11 at 13:50
That teaches me to consider only one case -.- –  Collecter Jul 6 '11 at 13:51

One small change: reverse the order - start with the largest number and work down. This will minimize the error.

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This doesn't work. Consider [4,14,15,16,17]. You will claim {17,14,4} and {16,15} when the best answer is {17,16} and{15,14,4} –  sshannin Jul 6 '11 at 13:38

Start adding numbers but each time compare the sum with next number, If sum is more or equal then move the number to other array.

Now for next numbers directly shift then to other array unless new sum < first sum , and then you can repeat the same process on remaining numbers. In this way we will end up solving your problem in one iteration only.

If array contains negative numbers above will not work.

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can you write some pseudo-code to help us understand better? –  maxpayne Jul 6 '11 at 13:45

After a lot of thought and combination I have come up with following solution.

1. Sort and add elements at the same time.(To reduce one more iteration on array.)
2. Do (Sum/2) and find out median of sorted array (array/2)(median can be used to optimize more)
3. Pick up highest and lowest one by one until its near or equal to (sum/2)

This solution will work for negative values also.

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int ModDiff(int a, int b)
    if(a < b)return b - a;
    return a-b;

int EqDiv(int *a, int l, int *SumI, int *SumE)
    static int tc = 0;
    int min = ModDiff(*SumI,*SumE);
    for(int i = 0; i < l; i++)
            int m1 = EqDiv(a, l-1, SumI,SumE);

            *SumI = *SumI + a[i];
            *SumE = *SumE - a[i];
            int m2 = EqDiv(a,l-1, SumI,SumE);
            *SumI = *SumI - a[i];
            *SumE = *SumE + a[i];

            min = min3(min,m1,m2);

    return min;


call the function with SumI =0 and SumE= sumof all the elements in a. This O(n!) solution does compute the way we can divide the given array into 2 parts such the difference is minimum. But definitely not practical due to the n! time complexity looking to improve this using DP.

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