Josephus Problem | Set 3 (using STL)
Given N persons are standing in a circle and an integer K. If initially starting from the first position, the Kth alive person clockwise from the current position is killed, and then the current position is shifted to the position of (K+1)th alive person and the same step is performed until only one person remains, the task is to print the position of the last alive person.
Examples:
Input: N = 5, K = 2
Output: 3
Explanation:
One way to perform the operations is:
- Step 1: Initially, the counting starts from position 1. Therefore, the Kth alive person at position 2 is killed, so the remaining alive persons are at positions {1, 3, 4, 5}.
- Step 2: Now, the counting starts from position 3. Therefore, the Kth alive person at position 4 is killed, so the remaining alive persons are at positions {1, 3, 5}.
- Step 3: Now, the counting starts from position 5. Therefore, the Kth alive person at position 1 is killed, so the remaining alive persons are at positions {3, 5}.
- Step 4: Now, the counting starts from position 3. Therefore, the Kth alive person at position 5 is killed, so the last alive person is at position 3.
Therefore, the last remaining person living is at position 3.
Input: N = 10, K = 4
Output: 5
Approach 1(Using Vector): The above-given problem is known as Josephus’s problem. The problem can be solved using recursion and vector data structure from the STL library. Follow the steps below to solve the problem:
- Initialize a vector say, arr[] to store the positions of all the persons.
- Iterate in the range [1, N] using the variable i and in each iteration append i to the vector arr[].
- Define a recursive function say RecursiveJosephus(vector<int>:: iterator it, vector<int>arr), where it points to the current alive person from where K elements are to be counted.
- If the size of the vector, arr is 1, then return the value in arr[0].
- Iterate in the range [1, K-1] and then, in each iteration, increment it by 1 and if it becomes equal, arr. end() then assign arr.begin() to it.
- Now if it is pointing to the last element of the vector arr, then pop the last element of the vector, arr, and then update it with the position of (K+1)th alive person, i.e., arr.begin().
- Otherwise, erase the position of the person pointed by it. After deletion, it now points to the position of the (K+1)th person.
- Finally, after completing the above steps, call the function RecursiveJosephus(arr.begin(), arr) and print the value returned by it as the position of the last alive person.
Below is the implementation of the above approach:
// C++ program for the above approach
#include <bits/stdc++.h>
using namespace std;
// Recursive auxiliary function to find
// the position of thevlast alive person
int RecursiveJosephus(vector<int>& arr, int K,
vector<int>::iterator it)
{
// If size of arr is 1
if (arr.size() == 1) {
return arr[0];
}
// Iterate over the range [1, K-1]
for (int i = 1; i < K; i++) {
// Increment it by 1
it++;
// If it is equal to arr.end()
if (it == arr.end()) {
// Assign arr.begin() to it
it = arr.begin();
}
}
// If it is equal to prev(arr.end())
if (it == prev(arr.end())) {
// Assign arr.begin() to it
it = arr.begin();
// Remove the last element
arr.pop_back();
}
else {
// Erase the element at it
arr.erase(it);
}
// Return the last alive person
return RecursiveJosephus(arr, K, it);
}
// Function to find the position of the
// last alive person
int Josephus(int N, int K)
{
// Stores positions of every person
vector<int> arr;
for (int i = 1; i <= N; i++)
arr.push_back(i);
// Function call to find the position
// of the last alive person
return RecursiveJosephus(arr, K, arr.begin());
}
// Driver Code
int main()
{
// Given Input
int N = 5;
int K = 2;
// Function Call
cout << Josephus(N, K);
}
import java.util.List;
import java.util.ArrayList;
public class Main {
// Recursive auxiliary function to find
// the position of the last alive person
public static int recursiveJosephus(List<Integer> arr, int K, int it) {
// If size of arr is 1
if (arr.size() == 1) {
return arr.get(0);
}
// Iterate over the range [1, K-1]
for (int i = 1; i < K; i++) {
// Increment it by 1
it++;
if (it == arr.size()) {
it = 0;
}
}
if (it == arr.size() - 1) {
// Remove the eliminated person from the list
it = 0;
arr.remove(arr.size() - 1);
} else {
arr.remove(it);
}
// Recursively call the function with the new list of people
return recursiveJosephus(arr, K, it);
}
// Function to find the position of the last alive person
public static int josephus(int N, int K) {
// Create a list of people
List<Integer> arr = new ArrayList<Integer>();
for (int i = 1; i <= N; i++) {
arr.add(i);
}
// Call the recursive function to find the position of the last alive person
return recursiveJosephus(arr, K, 0);
}
// Driver code
public static void main(String[] args) {
int N = 5;
int K = 2;
System.out.println(josephus(N, K));
}
}
using System;
using System.Collections.Generic;
public class MainClass
{
// Recursive auxiliary function to find
// the position of the last alive person
public static int RecursiveJosephus(List<int> arr, int K, int it)
{
// If size of arr is 1
if (arr.Count == 1)
{
return arr[0];
}
// Iterate over the range [1, K-1]
for (int i = 1; i < K; i++)
{
// Increment it by 1
it++;
if (it == arr.Count)
{
it = 0;
}
}
if (it == arr.Count - 1)
{
// Remove the eliminated person from the list
it = 0;
arr.RemoveAt(arr.Count - 1);
}
else
{
arr.RemoveAt(it);
}
// Recursively call the function with the new list of people
return RecursiveJosephus(arr, K, it);
}
// Function to find the position of the last alive person
public static int Josephus(int N, int K)
{
// Create a list of people
List<int> arr = new List<int>();
for (int i = 1; i <= N; i++)
{
arr.Add(i);
}
// Call the recursive function to find the position of the last alive person
return RecursiveJosephus(arr, K, 0);
}
// Driver code
public static void Main()
{
int N = 5;
int K = 2;
Console.WriteLine(Josephus(N, K));
}
}
// JavaScript code
//Recursive auxiliary function to find
// the position of thevlast alive person
function recursiveJosephus(arr, K, it) {
//If size of arr is 1
if (arr.length === 1) {
return arr[0];
}
//Iterate over the range [1, K-1]
for (let i = 1; i < K; i++) {
// Increment it by 1
it += 1;
if (it == arr.length) {
it = 0;
}
}
if (it == arr.length - 1) { // Remove the eliminated person from the list
it = 0;
arr.pop();
} else {
arr.splice(it, 1);
// Recursively call the function with the new list of people
}
return recursiveJosephus(arr, K, it);
}
//Function to find the position of the last alive person
function josephus(N, K) {
// Create a list of people
let arr = [];
for (let i = 1; i <= N; i++) {
arr.push(i);
}
// Call the recursive function to find the position of the last alive person
return recursiveJosephus(arr, K, 0);
}
//Driver code
const N = 5;
const K = 2;
console.log(josephus(N, K));
# Python program for the above approach
from typing import List
# Recursive auxiliary function to find
# the position of thevlast alive person
def RecursiveJosephus(arr: List[int], K: int, it: int):
#If size of arr is 1
if len(arr) == 1:
return arr[0]
#Iterate over the range [1, K-1]
for i in range(1, K):
# Increment it by 1
it += 1
if it == len(arr):
it = 0
if it == len(arr) - 1: # Remove the eliminated person from the list
it = 0
arr.pop()
else:
arr.pop(it)
# Recursively call the function with the new list of people
return RecursiveJosephus(arr, K, it)
#Function to find the position of the last alive person
def Josephus(N: int, K: int):
# Create a list of people
arr = list(range(1, N+1))
# Call the recursive function to find the position of the last alive person
return RecursiveJosephus(arr, K, 0)
#Driver code
if __name__ == '__main__':
N = 5
K = 2
print(Josephus(N, K))
Output
3
Time Complexity: O(N2)
Auxiliary Space: O(N)
Approach 2(Using SET): The problem can be solved using recursion and a set data structure from the STL library. Follow the steps below to solve the problem:
- Initialize a set say, arr to store the positions of all the persons.
- Iterate in the range [1, N] using the variable i, and in each iteration insert i in the set arr.
- Define a recursive function say RecursiveJosephus(set<int>:: iterator it, set<int>arr), where it points to the position of the current alive person from where K elements are to be counted.
- If the size of the set arr is 1, then return the value pointed by the iterator, it.
- Iterate in the range [1, K-1] and then, in each iteration, increment it by 1 and if it becomes equal to arr. end(), then assign arr.begin() to it.
- Now if it is pointing to the position of the last element of the set, arr, then delete the last element of the set, arr, and then update it with the position of the (K+1)th, person i.e arr.begin().
- Otherwise, store the value of the next iterator of it in a variable, say val then erase the position pointed by it.
- After deletion, it becomes invalid. Therefore, now find the value of val in the set, arr, and then assign it to it. Now it points to the position of the (K+1)th living person.
- Finally, after completing the above steps, call the function RecursiveJosephus(arr.begin(), arr) and print the value returned by it as the position of the last living person.
Below is the implementation of the above approach:
// C++ program for the above approach
#include <bits/stdc++.h>
using namespace std;
// Recursive auxiliary function to find
// the position of the last alive person
int RecursiveJosephus(set<int>& arr, int K,
set<int>::iterator it)
{
// If size of arr is 1
if (arr.size() == 1) {
return *it;
}
// Iterate over the range [1, K-1]
for (int i = 1; i < K; i++) {
// Increment it by 1
it++;
// If it is equal to arr.end()
if (it == arr.end()) {
// Assign arr.begin() to it
it = arr.begin();
}
}
// If it is equal to prev(arr.end())
if (it == prev(arr.end())) {
// Assign arr.begin() to it
it = arr.begin();
// Remove the last element
arr.erase(prev(arr.end()));
}
else {
// Stores the value pointed
// by next iterator of it
int val = (*next(it));
// Erase the element at it
arr.erase(it);
// Update it
it = arr.find(val);
}
// Return the position of
// the last alive person
return RecursiveJosephus(arr, K, it);
}
// Function to find the position
// of the last alive person
int Josephus(int N, int K)
{
// Stores all the persons
set<int> arr;
for (int i = 1; i <= N; i++)
arr.insert(i);
// Function call to find the position
// of the last alive person
return RecursiveJosephus(arr, K, arr.begin());
}
// Driver Code
int main()
{
// Given Input
int N = 5;
int K = 2;
// Function Call
cout << Josephus(N, K);
}
import java.util.*;
// Java program for the above approach
public class Main {
// Function to find the position
// of the last alive person
public static int josephus(int N, int K) {
// Stores all the persons
List<Integer> arr = new ArrayList<>();
for (int i = 1; i <= N; i++)
arr.add(i);
int killIdx = 0;
while (arr.size() > 1) {
killIdx = (killIdx + K - 1) % arr.size(); // -1 because index starts from 0
arr.remove(killIdx);
}
// Return the position of
// the last alive person
return arr.get(0);
}
// Driver Code
public static void main(String[] args) {
// Given Input
int N = 5;
int K = 2;
// Function Call
System.out.println(josephus(N, K));
}
}
// Recursive auxiliary function to find
// the position of the last alive person
function recursiveJosephus(arr, K, it) {
// If size of arr is 1
if (arr.length === 1) {
return arr[0];
}
// Calculate the next index after removal
let nextIndex = (it + K) % arr.length;
// Remove the element at nextIndex
arr.splice(nextIndex, 1);
// Adjust the iterator if necessary
if (nextIndex === arr.length) {
nextIndex = 0;
}
// Return the result of the recursive call
return recursiveJosephus(arr, K, nextIndex);
}
// Function to find the position
// of the last alive person
function josephus(N, K) {
// Stores all the persons
let arr = [];
for (let i = 1; i <= N; i++)
arr.push(i);
// Function call to find the position
// of the last alive person
return recursiveJosephus(arr, K - 1, 0);
}
// Driver Code
function main() {
// Given Input
let N = 5;
let K = 2;
// Function Call
console.log(josephus(N, K));
}
// Call the main function
main();
def recursive_josephus(arr, K, it):
if len(arr) == 1:
return arr[0]
next_it = (it + K - 1) % len(arr)
arr.pop(next_it)
return recursive_josephus(arr, K, next_it % len(arr))
def josephus(N, K):
arr = list(range(1, N + 1))
return recursive_josephus(arr, K, 0)
# Driver Code
if __name__ == "__main__":
N = 5
K = 2
print(josephus(N, K))
Output
3
Time Complexity: O(N*K+N*log(N))
Auxiliary Space: O(N)