Skip to main content

Quick Sort

Definition:ā€‹

Quick sort is a divide-and-conquer sorting algorithm that works by selecting a 'pivot' element from the array and partitioning the other elements into two subarrays, according to whether they are less than or greater than the pivot. The subarrays are then recursively sorted. This process of partitioning and sorting leads to a highly efficient sorting algorithm.

Characteristics:ā€‹

  • Divide and Conquer:

    • Quick sort partitions the array into smaller subarrays and sorts them independently before merging the results back together.
  • In-Place Sorting:

    • It sorts the array in place and typically requires little additional memory, only for recursive calls.
  • Unstable:

    • Quick sort is an unstable algorithm, meaning it does not guarantee that the relative order of equal elements will be maintained.
  • Efficient for Large Datasets:

    • Quick sort is one of the fastest sorting algorithms in practice, especially for large datasets, and has excellent cache performance.

Time Complexity:ā€‹

  • Best Case: O(n log n)
    In the best case, the pivot divides the array into two nearly equal subarrays, leading to a logarithmic number of comparisons across each recursive call.

  • Average Case: O(n log n)
    On average, quick sort partitions the array into balanced subarrays, leading to an O(n log n) time complexity.

  • Worst Case: O(nĀ²)
    The worst-case scenario occurs when the pivot chosen is consistently the smallest or largest element, leading to unbalanced partitions and quadratic time complexity. This can be mitigated by using strategies like randomized pivots or choosing the median of three elements as the pivot.

Space Complexity:ā€‹

  • Space Complexity: O(log n)
    Quick sort requires O(log n) space for recursive calls when the partitioning is balanced. In the worst case (highly unbalanced partitioning), it requires O(n) space for recursion.

C++ Implementation:ā€‹

Iterative Approach

#include <iostream>
#include <stack>
using namespace std;

// Partition function to place the pivot element in the correct position
int partition(int arr[], int low, int high) {
int pivot = arr[high]; // Pivot is taken as the last element
int i = (low - 1); // Index of the smaller element

for (int j = low; j < high; j++) {
if (arr[j] <= pivot) {
i++; // Increment index of smaller element
swap(arr[i], arr[j]); // Swap current element with the smaller element
}
}
swap(arr[i + 1], arr[high]); // Place the pivot element in the correct position
return (i + 1);
}

// Iterative quick sort function
void quickSortIterative(int arr[], int low, int high) {
stack<int> s;
s.push(low);
s.push(high);

// Keep popping elements until stack is empty
while (!s.empty()) {
high = s.top();
s.pop();
low = s.top();
s.pop();

int p = partition(arr, low, high);

// If there are elements on the left of the pivot, push them onto the stack
if (p - 1 > low) {
s.push(low);
s.push(p - 1);
}

// If there are elements on the right of the pivot, push them onto the stack
if (p + 1 < high) {
s.push(p + 1);
s.push(high);
}
}
}

int main() {
int arr[] = {10, 7, 8, 9, 1, 5};
int size = sizeof(arr) / sizeof(arr[0]);

quickSortIterative(arr, 0, size - 1);

cout << "Sorted array: \n";
for (int i = 0; i < size; i++) {
cout << arr[i] << " ";
}
cout << endl;

return 0;
}

Recursive Approach

#include <iostream>
using namespace std;

// Partition function to place the pivot element in the correct position
int partition(int arr[], int low, int high) {
int pivot = arr[high]; // Pivot is taken as the last element
int i = (low - 1); // Index of the smaller element

for (int j = low; j < high; j++) {
if (arr[j] <= pivot) {
i++; // Increment index of smaller element
swap(arr[i], arr[j]); // Swap current element with the smaller element
}
}
swap(arr[i + 1], arr[high]); // Place the pivot element in the correct position
return (i + 1);
}

// Recursive quick sort function
void quickSortRecursive(int arr[], int low, int high) {
if (low < high) {
int pi = partition(arr, low, high);

// Recursively sort elements before and after partition
quickSortRecursive(arr, low, pi - 1);
quickSortRecursive(arr, pi + 1, high);
}
}

int main() {
int arr[] = {10, 7, 8, 9, 1, 5};
int size = sizeof(arr) / sizeof(arr[0]);

quickSortRecursive(arr, 0, size - 1);

cout << "Sorted array: \n";
for (int i = 0; i < size; i++) {
cout << arr[i] << " ";
}
cout << endl;

return 0;
}

Summary:ā€‹

Quick sort is a highly efficient and widely used sorting algorithm that works well for large datasets. It employs the divide-and-conquer approach, partitioning the array around a pivot and sorting the subarrays recursively. Although its worst-case time complexity is O(nĀ²), this can often be avoided by choosing an appropriate pivot (like the median of three). In practice, quick sort is often faster than other O(n log n) algorithms like merge sort due to its in-place sorting nature and better cache performance.