Array Subsets is a problem that appeared in a programming assessment for a large tech company administered via HackerRank. The HackerRank interface graded the problem incorrectly and would accept answers that failed to meet the problem's defined restrictions.

Array Subsets

Given an integer array, divide the array into 2 subsets A and B while respecting the following conditions:

• The intersection of A and B is null.
• The union A and B is equal to the original array.
• The number of elements in subset A is minimal.
• The sum of A's elements is greater than the sum of B's elements.

Return the subset A in increasing order where the sum of A's elements is greater than the sum of B's elements. If more than one subset exists, return the one with the maximal sum.

Example

n = 5

arr = [3, 7, 5, 6, 2]

The 2 subsets in arr that satisfy the conditions for A are [5, 7] and [6, 7]:

• A is minimal (size 2)
• Sum(A) = (5 + 7) = 12 > Sum(B) = (2 + 3 + 6) = 11
• Sum(A) = (6 + 7) = 13 > Sum(B) = (2 + 3 + 5) = 10
• The intersection of A and B is null and their union is equal to arr.
• The subset A where the sum of its elements is maximal is [6, 7].

Function Description

Complete the subsetA function in the editor below.

subsetA has the following parameter(s):

• int arr[]: an integer array Returns:
• int[] : an integer array with the values of subset A.

Constraints

• 1 ≤ n ≤ 10⁵
• 1 ≤ arr[i] ≤ 10⁵ (where 0 ≤ i < n)

Input Format For Custom Testing

The first line contains an integer, n, denoting the number of elements in the array. Each line i of the n subsequent lines contains an integer, which is an element of arr.

Sample Case 0

Sample Input For Custom Testing

Sample Output

Explanation

n = 6

arr = [5, 3, 2, 4, 1, 2]

The subset of A that satisfies the conditions is [4, 5] :

• A is minimal (size 2)
• Sum(A) = (4 + 5)= 9 > Sum(B) = (1 + 2 + 2 + 3) = 8
• The intersection of A and B is null and their union is equal to arr.
• The subset A with the maximal sum is [4, 5].

Sample Case 1

Sample Input For Custom Testing

Sample Output

Explanation

n = 5

arr = [4, 2, 5, 1, 6]

The subset of A that satisfies the conditions is [5, 6]:

• A is minimal (size 2)
• Sum(A) = (5 + 6) = 11 > Sum(B) = (1 + 2 + 4) = 7
• Sum(A) = (4 + 6) = 10 > Sum(B) = (1 + 2 + 5) = 8
• The intersection of A and B is null and their union is equal to arr.
• The subset A with the maximal sum is [5, 6].

An initial approach for the problem might be:

• Treat input arr as B
• Sort B
• Let A = []
• While the sum of A is less than the sum of B, move the greatest element from B to A
• Reverse A to return in increasing order

By using this greedy algorithm that always moves the highest number, we make the sumA > sumB with the fewest number of elements. We use int64_t for sumA and sumB to prevent overflow because the worst case sum of n occurances of the max value of arr[i] is (10⁵)*(10⁵).

std::vector<int> subsetA(std::vector<int> arr) {
    std::vector<int> a;
    sort(arr.begin(), arr.end()); // Sort input array as B.

    int64_t sumA = 0;
    int64_t sumB = std::accumulate(arr.begin(), arr.end(), (int64_t)0);

    // While sumA > sumB, pop back B (max value) and push back to A.
    while(sumA <= sumB) {
        int popped = arr.back();
        arr.pop_back();
        sumA += popped;
        sumB -= popped;
        a.push_back(popped);
    }
    
    // A is in decreasing order. Reverse to return in increasing order.
    reverse(a.begin(), a.end());
    return a;
}

This erroneous solution is accepted by HackerRank, despite not fulfilling the condition "The intersection of A and B is null." With this solution, an example input of [1, 1, 2, 3, 3, 8] would result in A=[3, 8] and B=[1, 1, 2, 3], so the intersection of A and B is [3]. The correct solution should be A=[2, 8] and B=[1, 1, 3, 3].

This condition requires moving numbers that appear multiple times to be an all or nothing operation in order to prevent the same number from appearing in both A and B. However, the above example also illustrates that always moving all occurances of the next greatest number doesn't result in the smallest number of elements in A; The first operation would move [8] from B to A, and then the next operation would move [3, 3] from B to A, resulting in an array A of size 3, failing the problem's third condition ("The number of elements in subset A is minimal").

With this restriction in mind, the next step might be to augment this approach with a "look ahead" feature; if the next greatest element in B occurs n times, determine if the sum of the next n-1 elements is big enough to cause sumA > sumB if moved. While this works better for some cases, this strategy isn't perfect- certain solutions don't involve taking the largest value at all. This look ahead implementaiton for [5, 5, 5, 10, 10, 10, 11] would return A=[10, 10, 10, 11] instead of A=[10, 10, 10].

One method is to treat this like a 0-1 knapsack problem. Identical numbers are bundled up into a single element of cost/weight (number of occurances) and value (sum of each number's value). Creating these bundles allows us to evaluate each group of numbers with an all or nothing approach, which also fulfils the null intersection requirement. The max capacity of our knapsack is the number of elements in A. We don't know what this is, only that it must be minimized, so we have to run a knapsack algorithm starting with a capacity of 1 and increasing the capcity until a solution is found. Each knapsack algorithm will give us the elements that give the maximum sum of A per given size of A. These elements will be checked against the conditions and the size will increase until a solution is found.

Build executable and tests:

mkdir build
cd build
cmake ..
make

Output:

.
├── build
│   ├── arraysubsets.o
│   └── tests
│       └── tests.o

Inputs 003 and 005 are from the original HackerRank problem. All others are custom. Input 004 has 100,000 items and computation can be extremely memory intensive.