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Minimum pair merge operations required to make Array non-increasing

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Given an array A[], the task is to find the minimum number of operations required in which two adjacent elements are removed from the array and replaced by their sum, such that the array is converted to a non-increasing array.

Note: An array with a single element is considered non-increasing.
 

Examples:

Input: A[] = {1, 5, 3, 9, 1} 
Output:
Explanation: 
Replacing {1, 5} by {6} modifies the array to {6, 3, 9, 1} 
Replacing {6, 3} by {9} modifies the array to {9, 9, 1}
Input: A[] = {0, 1, 2} 
Output: 2

Approach: The idea is to use Dynamic Programming. A memoization table is used to store the minimum count of operations required to make subarrays non-increasing from right to left of the given array. Follow the steps below to solve the problem: 
 

  • Initialize an array dp[] where dp[i] stores the minimum number of operations required to make the subarray {A[i], …, A[N]} non-increasing. Therefore, the target is to compute dp[0].
  • Find a minimal subarray {A[i] .. A[j]} such that sum({A[i] … A[j]}) > val[j+1], where, val[j + 1] is the merged sum obtained for the subarray {A[j + 1], … A[N]}.
  • Update dp[i] to j – i + dp[j+1] and vals[i] to sum({A[i] … A[j]}).

Below is the implementation of the above approach:

C++




// C++ program to implement
// the above approach
 
#include <bits/stdc++.h>
using namespace std;
 
// Function to find the minimum operations
// to make the array Non-increasing
int solve(vector<int>& a)
{
 
    // Size of the array
    int n = a.size();
 
    // Dp table initialization
    vector<int> dp(n + 1, 0), val(n + 1, 0);
 
    // dp[i]: Stores minimum number of
    // operations required to make
    // subarray {A[i], ..., A[N]} non-increasing
    for (int i = n - 1; i >= 0; i--) {
        long long sum = a[i];
        int j = i;
 
        while (j + 1 < n and sum < val[j + 1]) {
 
            // Increment the value of j
            j++;
 
            // Add current value to sum
            sum += a[j];
        }
 
        // Update the dp tables
        dp[i] = (j - i) + dp[j + 1];
        val[i] = sum;
    }
 
    // Return the answer
    return dp[0];
}
 
// Driver code
int main()
{
    vector<int> arr = { 1, 5, 3, 9, 1 };
    cout << solve(arr);
}


Java




// Java program to implement
// the above approach
import java.util.*;
class GFG{
 
// Function to find the minimum operations
// to make the array Non-increasing
static int solve(int []a)
{
 
    // Size of the array
    int n = a.length;
 
    // Dp table initialization
    int []dp = new int[n + 1];
    int []val = new int[n + 1];
 
    // dp[i]: Stores minimum number of
    // operations required to make
    // subarray {A[i], ..., A[N]} non-increasing
    for (int i = n - 1; i >= 0; i--)
    {
        int sum = a[i];
        int j = i;
 
        while (j + 1 < n && sum < val[j + 1])
        {
 
            // Increment the value of j
            j++;
 
            // Add current value to sum
            sum += a[j];
        }
 
        // Update the dp tables
        dp[i] = (j - i) + dp[j + 1];
        val[i] = sum;
    }
 
    // Return the answer
    return dp[0];
}
 
// Driver code
public static void main(String[] args)
{
    int []arr = { 1, 5, 3, 9, 1 };
    System.out.print(solve(arr));
}
}
 
// This code is contributed by PrinciRaj1992


Python3




# Python3 program to implement
# the above approach
 
# Function to find the minimum operations
# to make the array Non-increasing
def solve(a):
 
    # Size of the array
    n = len(a)
 
    # Dp table initialization
    dp = [0] * (n + 1)
    val = [0] * (n + 1)
 
    # dp[i]: Stores minimum number of
    # operations required to make
    # subarray {A[i], ..., A[N]} non-increasing
    for i in range(n - 1, -1, -1):
        sum = a[i]
        j = i
 
        while(j + 1 < n and sum < val[j + 1]):
 
            # Increment the value of j
            j += 1
 
            # Add current value to sum
            sum += a[j]
 
        # Update the dp tables
        dp[i] = (j - i) + dp[j + 1]
        val[i] = sum
 
    # Return the answer
    return dp[0]
 
# Driver Code
arr = [ 1, 5, 3, 9, 1 ]
 
# Function call
print(solve(arr))
 
# This code is contributed by Shivam Singh


C#




// C# program to implement
// the above approach
using System;
class GFG{
 
// Function to find the minimum operations
// to make the array Non-increasing
static int solve(int []a)
{
 
    // Size of the array
    int n = a.Length;
 
    // Dp table initialization
    int []dp = new int[n + 1];
    int []val = new int[n + 1];
 
    // dp[i]: Stores minimum number of
    // operations required to make
    // subarray {A[i], ..., A[N]} non-increasing
    for (int i = n - 1; i >= 0; i--)
    {
        int sum = a[i];
        int j = i;
 
        while (j + 1 < n && sum < val[j + 1])
        {
 
            // Increment the value of j
            j++;
 
            // Add current value to sum
            sum += a[j];
        }
 
        // Update the dp tables
        dp[i] = (j - i) + dp[j + 1];
        val[i] = sum;
    }
 
    // Return the answer
    return dp[0];
}
 
// Driver code
public static void Main(String[] args)
{
    int []arr = { 1, 5, 3, 9, 1 };
    Console.Write(solve(arr));
}
}
 
// This code is contributed by PrinciRaj1992


Javascript




<script>
 
// Javascript program to implement
// the above approach
 
// Function to find the minimum operations
// to make the array Non-increasing
function solve(a)
{
  
    // Size of the array
    let n = a.length;
  
    // Dp table initialization
    let dp = new Array(n+1).fill(0);
    let val = new Array(n+1).fill(0);
  
    // dp[i]: Stores minimum number of
    // operations required to make
    // subarray {A[i], ..., A[N]} non-increasing
    for (let i = n - 1; i >= 0; i--)
    {
        let sum = a[i];
        let j = i;
  
        while (j + 1 < n && sum < val[j + 1])
        {
  
            // Increment the value of j
            j++;
  
            // Add current value to sum
            sum += a[j];
        }
  
        // Update the dp tables
        dp[i] = (j - i) + dp[j + 1];
        val[i] = sum;
    }
  
    // Return the answer
    return dp[0];
}
 
// Driver Code
 
    let arr = [ 1, 5, 3, 9, 1 ];
    document.write(solve(arr));
     
</script>


Output: 

2

 

Time Complexity: O(N2
Auxiliary Space: O(N)
 



Last Updated : 07 May, 2021
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