1749. Maximum Absolute Sum of Any Subarray ¶

Problem

You are given an integer array nums. The absolute sum of a subarray [nums_l, nums_l+1, ..., nums_r-1, nums_r] is abs(nums_l + nums_l+1 + ... + nums_r-1 + nums_r).

Return the maximum absolute sum of any (possibly empty) subarray of nums.

Note that abs(x) is defined as follows:

If x is a negative integer, then abs(x) = -x.
If x is a non-negative integer, then abs(x) = x.

Example 1:

Input: nums = [1,-3,2,3,-4]
Output: 5
Explanation: The subarray [2,3] has absolute sum = abs(2+3) = abs(5) = 5.

Example 2:

Input: nums = [2,-5,1,-4,3,-2]
Output: 8
Explanation: The subarray [-5,1,-4] has absolute sum = abs(-5+1-4) = abs(-8) = 8.

Constraints:

1 <= nums.length <= 10⁵
-10⁴ <= nums[i] <= 10⁴