Recursive Bubble Sort
D
/**
* @file
* @author [Aditya Prakash](https://adityaprakash.tech)
* @brief This is an implementation of a recursive version of the [Bubble sort
algorithm](https://www.geeksforgeeks.org/recursive-bubble-sort/)
*
* @details
* The working principle of the Bubble sort algorithm.
* Bubble sort is a simple sorting algorithm used to rearrange a set of
ascending or descending order elements.
* Bubble sort gets its name from the fact that data "bubbles" to the top of the
dataset.
* ### Algorithm
* What is Swap?
* Swapping two numbers means that we interchange their values.
* Often, an additional variable is required for this operation.
* This is further illustrated in the following:
* void swap(int x, int y){
* int z = x;
* x = y;
* y = z;
* }
* The above process is a typical displacement process.
* When we assign a value to x, the old value of x is lost.
* That's why we create a temporary variable z to store the initial value of x.
* z is further used to assign the initial value of x to y, to complete
swapping.
* Recursion
* While the recursive method does not necessarily have advantages over
iterative
* versions, but it is useful to enhance the understanding of the algorithm and
* recursion itself. In Recursive Bubble sort algorithm, we firstly call the
* function on the entire array, and for every subsequent function call, we
exclude
* the last element. This fixes the last element for that sub-array.Formally,
for
* `ith` iteration, we consider elements up to n-i, where n is the number of
* elements in the array. Exit condition: n==1; i.e. the sub-array contains only
* one element.
* Complexity
* Time complexity: O(n) best case; O(n²) average case; O(n²) worst case
* Space complexity: O(n)
* We need to traverse the array `n * (n-1)` times. However, if the entire array
is
* already sorted, then we need to traverse it only once. Hence, O(n) is the
best case
* complexity
*/
#include <algorithm> /// for std::is_sorted
#include <array> /// for std::array
#include <cassert> /// for assert
#include <cstdint>
#include <iostream> /// for IO operations
#include <vector> /// for std::vector
/**
* @namespace sorting
* @brief Sorting algorithms
*/
namespace sorting {
/**
* @brief This is an implementation of the recursive_bubble_sort. A vector is
* passed to the function which is then dereferenced, so that the changes are
* reflected in the original vector. It also accepts a second parameter of
* type `int` and name `n`, which is the size of the array.
*
* @tparam T type of data variables in the array
* @param nums our array of elements.
* @param n size of the array
*/
template <typename T>
void recursive_bubble_sort(std::vector<T> *nums, uint64_t n) {
if (n == 1) { //!< base case; when size of the array is 1
return;
}
for (uint64_t i = 0; i < n - 1; i++) { //!< iterating over the entire array
//!< if a larger number appears before the smaller one, swap them.
if ((*nums)[i] > (*nums)[i + 1]) {
std::swap((*nums)[i], (*nums)[i + 1]);
}
}
//!< calling the function after we have fixed the last element
recursive_bubble_sort(nums, n - 1);
}
} // namespace sorting
/**
* @brief Self-test implementations
* @returns void
*/
static void test() {
// 1st example. Creating an array of type `int`.
std::cout << "1st test using `int`\n";
const uint64_t size = 6;
std::vector<int64_t> arr;
// populating the array
arr.push_back(22);
arr.push_back(46);
arr.push_back(94);
arr.push_back(12);
arr.push_back(37);
arr.push_back(63);
// array populating ends
sorting::recursive_bubble_sort(&arr, size);
assert(std::is_sorted(std::begin(arr), std::end(arr)));
std::cout << " 1st test passed!\n";
// printing the array
for (uint64_t i = 0; i < size; i++) {
std::cout << arr[i] << ", ";
}
std::cout << std::endl;
// 2nd example. Creating an array of type `double`.
std::cout << "2nd test using doubles\n";
std::vector<double> double_arr;
// populating the array
double_arr.push_back(20.4);
double_arr.push_back(62.7);
double_arr.push_back(12.2);
double_arr.push_back(43.6);
double_arr.push_back(74.1);
double_arr.push_back(57.9);
// array populating ends
sorting::recursive_bubble_sort(&double_arr, size);
assert(std::is_sorted(std::begin(double_arr), std::end(double_arr)));
std::cout << " 2nd test passed!\n";
// printing the array
for (uint64_t i = 0; i < size; i++) {
std::cout << double_arr[i] << ", ";
}
std::cout << std::endl;
}
/**
* @brief Main function
* @returns 0 on exit
*/
int main() {
test(); // run self-test implementations
return 0;
}
이 알고리즘에 대해
Bubble Sort is one of the simplest sorting algorithms that compares two elements at a time and swaps them if they are in the wrong order. This process is repeated until the entire sequence is in order.
- Time Complexity:
O(n ^ 2)for average case;O(n)for best case. - Space Complexity:
O(n); note that iterative bubble sort has space complexity asO(1).
Steps
Base case: If the size of the array is 1, return.
- We need to fix the last element of the current sub-array. For this, iterate over the entire array using normal Bubble Sort, and perform swapping.
- Next, call the function on the entire array excluding the last element(which was fixed by the iteration in the above step)
- Repeat until Base Case is reached.
Example
Let the given array be: {5, 3, 2, 1, 4}
First Iteration:
- {
5,3, 2, 1, 4} -> {3,5, 2, 1, 4} Swap since5 > 3 - {3,
5,2, 1, 4} -> {3,2,5, 1, 4} Swap since5 > 2 - {3, 2,
5,1, 4} -> {3, 2,1,5, 4} Swap since5 > 1 - {3, 2, 1,
5,4} -> {3, 2, 1,4,5} Swap since5 > 4
This iteration has fixed the position of 5. Now, we will consider the array up to index 3.
Second Iteration:
- {
3,2, 1, 4, 5} -> {2,3, 1, 4, 5} Swap since3 > 2 - {2,
3,1, 4, 5} -> {2,1,3, 4, 5} Swap since3 > 1 - {2, 1,
3,4, 5}; As3 < 4, do not swap
Note: As we check one less element with every iteration, we do not need elements at index 3 and 4 i.e., 4 and 5, as 5 is already in order. Formally, for an array with n integers, we consider elements only up to index n - i, where i is the iteration number.
Third Iteration:
- {
2,1, 3, 4, 5} -> {1,2, 3, 4, 5} Swap since1 > 2 - {1,
2,3, 4, 5}; As2 < 3, do not swap
Fourth Iteration:
- {
1,2, 3, 4, 5}; As1 < 2, do not swap
Fifth Iteration:
- {
1, 2, 3, 4, 5}; As the size of the array is 1, return.
Note: This is the base case.
Pseudo Code
void bubbleSort(arr[], n)
if(n==1)
return;
for(i = 0; i<n-1; i++)
if(arr[i] > arr[i+1])
swap(arr[i], arr[i+1])
bubbleSort(arr, n-1)
Video Explanation
A video explaining iterative as well as recursive bubble sort
