- Difficulty: Hard
- Tags: LeetCode, Hard, Bit Manipulation, Array, Two Pointers, Binary Search, Dynamic Programming, Bitmask, Ordered Set, leetcode-2035, O(n * 2^n), O(2^n), Meet in the Middle
Problem
You are given an integer array nums
of 2 * n
integers. You need to partition nums
into two arrays of length n
to minimize the absolute difference of the sums of the arrays. To partition nums
, put each element of nums
into one of the two arrays.
Return the minimum possible absolute difference.
Example 1:
Input: nums = [3,9,7,3] Output: 2 Explanation: One optimal partition is: [3,9] and [7,3]. The absolute difference between the sums of the arrays is abs((3 + 9) - (7 + 3)) = 2.
Example 2:
Input: nums = [-36,36] Output: 72 Explanation: One optimal partition is: [-36] and [36]. The absolute difference between the sums of the arrays is abs((-36) - (36)) = 72.
Example 3:
Input: nums = [2,-1,0,4,-2,-9] Output: 0 Explanation: One optimal partition is: [2,4,-9] and [-1,0,-2]. The absolute difference between the sums of the arrays is abs((2 + 4 + -9) - (-1 + 0 + -2)) = 0.
Constraints:
1 <= n <= 15
nums.length == 2 * n
-107 <= nums[i] <= 107