1526. Minimum Number of Increments on Subarrays to Form a Target Array 

Description

You are given an integer array target. You have an integer array initial of the same size as target with all elements initially zeros.

In one operation you can choose any subarray from initial and increment each value by one.

Return the minimum number of operations to form a target array from initial.

The test cases are generated so that the answer fits in a 32-bit integer.

Example 1:

Input: target = [1,2,3,2,1]
Output: 3
Explanation: We need at least 3 operations to form the target array from the initial array.
[0,0,0,0,0] increment 1 from index 0 to 4 (inclusive).
[1,1,1,1,1] increment 1 from index 1 to 3 (inclusive).
[1,2,2,2,1] increment 1 at index 2.
[1,2,3,2,1] target array is formed.

Example 2:

Input: target = [3,1,1,2]
Output: 4
Explanation: [0,0,0,0] -> [1,1,1,1] -> [1,1,1,2] -> [2,1,1,2] -> [3,1,1,2]

Example 3:

Input: target = [3,1,5,4,2]
Output: 7
Explanation: [0,0,0,0,0] -> [1,1,1,1,1] -> [2,1,1,1,1] -> [3,1,1,1,1] -> [3,1,2,2,2] -> [3,1,3,3,2] -> [3,1,4,4,2] -> [3,1,5,4,2].

Constraints:

1 <= target.length <= 10⁵
1 <= target[i] <= 10⁵

Solutions

Solution 1: Dynamic Programming

We define $f[i]$ as the minimum number of operations required to obtain $target[0,..i]$, initially setting $f[0] = target[0]$.

For $target[i]$, if $target[i] \leq target[i-1]$, then $f[i] = f[i-1]$; otherwise, $f[i] = f[i-1] + target[i] - target[i-1]$.

The final answer is $f[n-1]$.

We notice that $f[i]$ only depends on $f[i-1]$, so we can maintain the operation count using just one variable.

The time complexity is $O(n)$, where $n$ is the length of the array $target$. The space complexity is $O(1)$.

Python3

class Solution:
    def minNumberOperations(self, target: List[int]) -> int:
        return target[0] + sum(max(0, b - a) for a, b in pairwise(target))

Java

class Solution {
    public int minNumberOperations(int[] target) {
        int f = target[0];
        for (int i = 1; i < target.length; ++i) {
            if (target[i] > target[i - 1]) {
                f += target[i] - target[i - 1];
            }
        }
        return f;
    }
}

C++

class Solution {
public:
    int minNumberOperations(vector<int>& target) {
        int f = target[0];
        for (int i = 1; i < target.size(); ++i) {
            if (target[i] > target[i - 1]) {
                f += target[i] - target[i - 1];
            }
        }
        return f;
    }
};

Go

func minNumberOperations(target []int) int {
	f := target[0]
	for i, x := range target[1:] {
		if x > target[i] {
			f += x - target[i]
		}
	}
	return f
}

TypeScript

function minNumberOperations(target: number[]): number {
    let f = target[0];
    for (let i = 1; i < target.length; ++i) {
        if (target[i] > target[i - 1]) {
            f += target[i] - target[i - 1];
        }
    }
    return f;
}