Sum of all differences between Maximum and Minimum of increasing Subarrays
Given an array arr[] consisting of N integers, the task is to find the sum of the differences between maximum and minimum element of all strictly increasing subarrays from the given array. All subarrays need to be in their longest possible form, i.e. if a subarray [i, j] form a strictly increasing subarray, then it should be considered as a whole and not [i, k] and [k+1, j] for some i <= k <= j.
A subarray is said to be strictly increasing if for every ith index in the subarray, except the last index, arr[i+1] > arr[i]
Examples:
Input: arr[ ] = {7, 1, 5, 3, 6, 4}
Output: 7
Explanation:
All possible increasing subarrays are {7}, {1, 5}, {3, 6} and {4}
Therefore, sum = (7 – 7) + (5 – 1) + (6 – 3) + (4 – 4) = 7Input: arr[ ] = {1, 2, 3, 4, 5, 2}
Output: 4
Explanation:
All possible increasing subarrays are {1, 2, 3, 4, 5} and {2}
Therefore, sum = (5 – 1) + (2 – 2) = 4
Approach:
Follow the steps below to solve the problem:
- Traverse the array and for each iteration, find the rightmost element up to which the current subarray is strictly increasing.
- Let i be the starting element of the current subarray, and j index up to which the current subarray is strictly increasing. The maximum and minimum values of this subarray will be arr[j] and arr[i] respectively. So, add (arr[j] – arr[i]) to the sum.
- Continue iterating for the next subarray from (j+1)th index.
- After complete traversal of the array, print the final value of sum.
Below is the implementation of the above approach:
C++
// C++ Program to find the sum of // differences of maximum and minimum // of strictly increasing subarrays #include <bits/stdc++.h> using namespace std; // Function to calculate and return the // sum of differences of maximum and // minimum of strictly increasing subarrays int sum_of_differences( int arr[], int N) { // Stores the sum int sum = 0; int i, j, flag; // Traverse the array for (i = 0; i < N - 1; i++) { if (arr[i] < arr[i + 1]) { flag = 0; for (j = i + 1; j < N - 1; j++) { // If last element of the // increasing sub-array is found if (arr[j] >= arr[j + 1]) { // Update sum sum += (arr[j] - arr[i]); i = j; flag = 1; break ; } } // If the last element of the array // is reached if (flag == 0 && arr[i] < arr[N - 1]) { // Update sum sum += (arr[N - 1] - arr[i]); break ; } } } // Return the sum return sum; } // Driver Code int main() { int arr[] = { 6, 1, 2, 5, 3, 4 }; int N = sizeof (arr) / sizeof (arr[0]); cout << sum_of_differences(arr, N); return 0; } |
Java
// Java program to find the sum of // differences of maximum and minimum // of strictly increasing subarrays class GFG{ // Function to calculate and return the // sum of differences of maximum and // minimum of strictly increasing subarrays static int sum_of_differences( int arr[], int N) { // Stores the sum int sum = 0 ; int i, j, flag; // Traverse the array for (i = 0 ; i < N - 1 ; i++) { if (arr[i] < arr[i + 1 ]) { flag = 0 ; for (j = i + 1 ; j < N - 1 ; j++) { // If last element of the // increasing sub-array is found if (arr[j] >= arr[j + 1 ]) { // Update sum sum += (arr[j] - arr[i]); i = j; flag = 1 ; break ; } } // If the last element of the array // is reached if (flag == 0 && arr[i] < arr[N - 1 ]) { // Update sum sum += (arr[N - 1 ] - arr[i]); break ; } } } // Return the sum return sum; } // Driver Code public static void main (String []args) { int arr[] = { 6 , 1 , 2 , 5 , 3 , 4 }; int N = arr.length; System.out.print(sum_of_differences(arr, N)); } } // This code is contributed by chitranayal |
Python3
# Python3 program to find the sum of # differences of maximum and minimum # of strictly increasing subarrays # Function to calculate and return the # sum of differences of maximum and # minimum of strictly increasing subarrays def sum_of_differences(arr, N): # Stores the sum sum = 0 # Traverse the array i = 0 while (i < N - 1 ): if arr[i] < arr[i + 1 ]: flag = 0 for j in range (i + 1 , N - 1 ): # If last element of the # increasing sub-array is found if arr[j] > = arr[j + 1 ]: # Update sum sum + = (arr[j] - arr[i]) i = j flag = 1 break # If the last element of the array # is reached if flag = = 0 and arr[i] < arr[N - 1 ]: # Update sum sum + = (arr[N - 1 ] - arr[i]) break i + = 1 # Return the sum return sum # Driver Code arr = [ 6 , 1 , 2 , 5 , 3 , 4 ] N = len (arr) print (sum_of_differences(arr, N)) # This code is contributed by yatinagg |
C#
// C# program to find the sum of // differences of maximum and minimum // of strictly increasing subarrays using System; class GFG{ // Function to calculate and return the // sum of differences of maximum and // minimum of strictly increasing subarrays static int sum_of_differences( int []arr, int N) { // Stores the sum int sum = 0; int i, j, flag; // Traverse the array for (i = 0; i < N - 1; i++) { if (arr[i] < arr[i + 1]) { flag = 0; for (j = i + 1; j < N - 1; j++) { // If last element of the // increasing sub-array is found if (arr[j] >= arr[j + 1]) { // Update sum sum += (arr[j] - arr[i]); i = j; flag = 1; break ; } } // If the last element of the array // is reached if (flag == 0 && arr[i] < arr[N - 1]) { // Update sum sum += (arr[N - 1] - arr[i]); break ; } } } // Return the sum return sum; } // Driver Code public static void Main ( string []args) { int []arr = { 6, 1, 2, 5, 3, 4 }; int N = arr.Length; Console.Write(sum_of_differences(arr, N)); } } // This code is contributed by rock_cool |
Javascript
<script> // Javascript program to find the sum of // differences of maximum and minimum // of strictly increasing subarrays // Function to calculate and return the // sum of differences of maximum and // minimum of strictly increasing subarrays function sum_of_differences(arr, N) { // Stores the sum let sum = 0; let i, j, flag; // Traverse the array for (i = 0; i < N - 1; i++) { if (arr[i] < arr[i + 1]) { flag = 0; for (j = i + 1; j < N - 1; j++) { // If last element of the // increasing sub-array is found if (arr[j] >= arr[j + 1]) { // Update sum sum += (arr[j] - arr[i]); i = j; flag = 1; break ; } } // If the last element of the array // is reached if (flag == 0 && arr[i] < arr[N - 1]) { // Update sum sum += (arr[N - 1] - arr[i]); break ; } } } // Return the sum return sum; } // Driver code let arr = [ 6, 1, 2, 5, 3, 4 ]; let N = arr.length; document.write(sum_of_differences(arr, N)); // This code is contributed by divyesh072019 </script> |
5
Time Complexity: O(N)
Auxiliary Space: O(1)
Two pointers approach:
Approach:
We can use two pointers to optimize the dynamic programming approach further. We can maintain two pointers i and j such that i points to the start of the increasing subarray and j points to the end of the increasing subarray. We can initialize both pointers to 0 and then move j to the right until we find a non-increasing element. Then we can update the difference and move i to the right until we find a non-decreasing element
- Initialize i and j to 0 and diff to 0.
- While j is less than n, do the following:
- While j is less than n-1 and the current element arr[j] is less than the next element arr[j+1], increment j.
- Calculate the difference between the maximum and minimum values in the current increasing subarray (arr[j] – arr[i]) and add it to diff.
- Set i and j to j+1.
- Return diff.
C++
#include <iostream> #include <vector> using namespace std; // Function to find the maximum difference between increasing subarrays int max_min_diff(vector< int > arr) { int n = arr.size(); int i = 0, j = 0; int diff = 0; while (j < n) { // Find the end of an increasing subarray while (j < n - 1 && arr[j] < arr[j + 1]) { j++; } // Add the difference between the start and end of the subarray to the result diff += arr[j] - arr[i]; // Move the start and end pointers to the next subarray i = j = j + 1; } return diff; } // Driver code int main() { vector< int > arr1 = {7, 1, 5, 3, 6, 4}; vector< int > arr2 = {1, 2, 3, 4, 5, 2}; cout << max_min_diff(arr1) << endl; // Output: 7 cout << max_min_diff(arr2) << endl; // Output: 4 return 0; } |
Java
import java.util.ArrayList; import java.util.List; public class Main { // Function to find the maximum difference between increasing subarrays static int maxMinDiff(List<Integer> arr) { int n = arr.size(); int i = 0 , j = 0 ; int diff = 0 ; while (j < n) { // Find the end of an increasing subarray while (j < n - 1 && arr.get(j) < arr.get(j + 1 )) { j++; } // Add the difference between the start and end of the subarray to the result diff += arr.get(j) - arr.get(i); // Move the start and end pointers to the next subarray i = j = j + 1 ; } return diff; } // Driver code public static void main(String[] args) { List<Integer> arr1 = new ArrayList<>(List.of( 7 , 1 , 5 , 3 , 6 , 4 )); List<Integer> arr2 = new ArrayList<>(List.of( 1 , 2 , 3 , 4 , 5 , 2 )); System.out.println(maxMinDiff(arr1)); // Output: 7 System.out.println(maxMinDiff(arr2)); // Output: 4 } } // This code is contributed by akshitaguprzj3 |
Python3
def max_min_diff(arr): n = len (arr) i, j = 0 , 0 diff = 0 while j < n: while j < n - 1 and arr[j] < arr[j + 1 ]: j + = 1 diff + = arr[j] - arr[i] i = j = j + 1 return diff # Test the function with the given inputs arr1 = [ 7 , 1 , 5 , 3 , 6 , 4 ] arr2 = [ 1 , 2 , 3 , 4 , 5 , 2 ] print (max_min_diff(arr1)) # Output: 7 print (max_min_diff(arr2)) # Output: 4 |
C#
using System; using System.Collections.Generic; class MaxMinDiffProgram { // Function to find the maximum difference between // increasing subarrays static int MaxMinDiff(List< int > arr) { int n = arr.Count; int i = 0, j = 0; int diff = 0; while (j < n) { // Find the end of an increasing subarray while (j < n - 1 && arr[j] < arr[j + 1]) { j++; } // Add the difference between the start and end // of the subarray to the result diff += arr[j] - arr[i]; // Move the start and end pointers to the next // subarray i = j = j + 1; } return diff; } // Driver code static void Main() { List< int > arr1 = new List< int >{ 7, 1, 5, 3, 6, 4 }; List< int > arr2 = new List< int >{ 1, 2, 3, 4, 5, 2 }; Console.WriteLine(MaxMinDiff(arr1)); // Output: 7 Console.WriteLine(MaxMinDiff(arr2)); // Output: 4 } } |
Javascript
function maxMinDiff(arr) { let n = arr.length; let i = 0, j = 0; let diff = 0; while (j < n) { // Find the end of an increasing subarray while (j < n - 1 && arr[j] < arr[j + 1]) { j++; } // Add the difference between the start and end of the subarray to the result diff += arr[j] - arr[i]; // Move the start and end pointers to the next subarray i = j = j + 1; } return diff; } // Example usage: const arr1 = [7, 1, 5, 3, 6, 4]; const arr2 = [1, 2, 3, 4, 5, 2]; console.log(maxMinDiff(arr1)); // Output: 7 console.log(maxMinDiff(arr2)); // Output: 4 |
7 4
The time complexity of this approach is O(n)
the space complexity is O(1) as we are not using any extra space.
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