Maximun-Nesting-Depth-of-Two-Valid-Parentheses-Strings

Problem Statement

A string is a valid parentheses string (VPS) if and only if it consists of ( and ) characters only, and:

It is the empty string, or
It can be written as AB (A concatenated with B), where A and B are VPS's, or
It can be written as (A), where A is a VPS.

We can similarly define the nesting depth depth(S) of any VPS S as follows:

depth("") = 0
depth(A + B) = max(depth(A), depth(B)), where A and B are VPS's
depth("(" + A + ")") = 1 + depth(A), where A is a VPS.

For example, "", "()()", and "()(()())" are VPS's (with nesting depths 0, 1, and 2), and ")(" and "(()" are not VPS's.

Given a VPS seq, split it into two disjoint subsequences A and B, such that A and B are VPS's (and A.length + B.length = seq.length).

Now choose any such A and B such that max(depth(A), depth(B)) is the minimum possible value.

Return an answer array (of length seq.length) that encodes such a choice of A and B: answer[i] = 0 if seq[i] is part of A, else answer[i] = 1. Note that even though multiple answers may exist, you may return any of them.

Examples

Example 1

Input: seq = "(()())"
Output: [0, 1, 1, 1, 1, 0]

Example 2

Input: seq = "()(())()"
Output: [0, 0, 0, 1, 1, 0, 1, 1]

Constraints

$1 <= seq.size <= 10000$

Algorithm

Initialize an empty stack to keep track of the depth.
Initialize the answer array with all zeros.
Iterate through each character in the seq string:
- If the character is (, check the current depth (based on the size of the stack):
  - Assign the character to one of the subsequences (either 0 or 1) in an alternating fashion to balance the depth between A and B.
  - Push the current depth level onto the stack.
- If the character is ), pop from the stack and assign the closing parenthesis to the same subsequence as its matching opening parenthesis.
Return the answer array.

C++ Code

class Solution {
public:
    vector<int> maxDepthAfterSplit(string seq) {
        int n = seq.size();
        vector<int> answer(n, 0);
        int depth = 0;

        for (int i = 0; i < n; ++i) {
            if (seq[i] == '(') {
                answer[i] = depth % 2;
                depth++;
            } else {
                depth--;
                answer[i] = depth % 2;
            }
        }

        return answer;
    }
};

Python Code

class Solution:
    def maxDepthAfterSplit(self, seq: str) -> List[int]:
        depth = 0
        answer = []

        for char in seq:
            if char == '(':
                answer.append(depth % 2)
                depth += 1
            else:
                depth -= 1
                answer.append(depth % 2)

        return answer

Java Code

class Solution {
    public int[] maxDepthAfterSplit(String seq) {
        int n = seq.length();
        int[] answer = new int[n];
        int depth = 0;

        for (int i = 0; i < n; i++) {
            if (seq.charAt(i) == '(') {
                answer[i] = depth % 2;
                depth++;
            } else {
                depth--;
                answer[i] = depth % 2;
            }
        }

        return answer;
    }
}

JavaScript Code

/**
 * @param {string} seq
 * @return {number[]}
 */
var maxDepthAfterSplit = function (seq) {
  const answer = [];
  let depth = 0;

  for (let char of seq) {
    if (char === "(") {
      answer.push(depth % 2);
      depth++;
    } else {
      depth--;
      answer.push(depth % 2);
    }
  }

  return answer;
};

Problem Statement​

Examples​

Example 1​

Example 2​

Constraints​

Algorithm​

C++ Code​

Python Code​

Java Code​

JavaScript Code​