The set [1,2,3,…,n] contains a total of n! unique permutations.
By listing and labeling all of the permutations in order,
We get the following sequence (ie, for n = 3):
"123""132""213""231""312""321"
Given n and k, return the kth permutation sequence.
Note: Given n will be between 1 and 9 inclusive.
public class Solution {
/**
* This is a trick problem. We need to use how a permutation is generated.<br>
* Let us consider, for example, the first digit of the permutation.<br>
* Number 1 on the first digit until (n - 1)! + 1-th permutation. and (n - 1)! is the last
* permutation starts with 1. For the same reason 2*(n-1)! is the last permutation starts with
* number 2 and so on. So, on the first digit of k-th permutation can be determined by
* ((--k) / (n - 1)!). Recursively, we can find the other digits of the permutation.<br>
*
* @param n --int, the number of digits in the permutation.
* @param k --int, the k-th permutation which is looking for.
* @return String --the permutation.
* @author Averill Zheng
* @version 2014-06-14
* @since JDK 1.7
*/
public String getPermutation(int n, int k) {
List<Integer> num = new ArrayList<Integer>();
int count = 1;
//add the number in the ArrayList and calculate the factorial
for(int i = 0; i < n; ++i){
num.add((i + 1));
count *= (i + 1);
}
//decrease k by 1
--k;
//find each digit of the permutation.
StringBuffer stb = new StringBuffer();
for(int i = 0; i < n; ++i){
count /= (n - i);
//select an item from the ArrayList and add to the permutation. After that remove
//the digit from the ArrayList since it has been added to the permutation.
int itemToBeAdded = num.remove(k / count);
stb.append(itemToBeAdded);
k %= count;
}
return stb.toString();
}
}