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 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.
- Given k will be between 1 and n! inclusive.
Example 1:
Input: n = 3, k = 3
Output: "213"
Example 2:
Input: n = 4, k = 9
Output: "2314"
By observing the sequence for n = 3, we can see the permutation sequence is 1 + [2, 3] permutation, 2 + [1, 3] permutation, 3 + [1, 2] permutation. The sequence with first element = 1 has value k = 1, 2, with first element = 2 has value 3, 4, with first elemnt = 3 has value 5, 6, it's not hard to see that the index of the first element is (k-1)/2!
Next, we want to find the first element for n = 2, since there is only 2! permutation, the new k would be in the range [1, 2!], if you observe the original k and the permutation:
[2, 3] k = 0 -> new k = 0
[3, 2] k = 1 -> new k = 1
[1, 3] k = 2 -> new k = 0
[3, 1] k = 3 -> new k = 1
[1, 2] k = 4 -> new k = 0
[2, 1] k = 5 -> new k = 1
new k = old k / 2!, it's just the same problem, with smaller n and k, hence we can use either recursive or iterative to solve it.
Key taken: --k, which makes the caculation easier also rules easier to observe, if k == 0, it's the first sequence in the permutation, no further work needed.
Time complexity: O(n*2)
Iterative:
public class PermutationSequenceLT60 {
private int calculateFactorial(int n) {
int factorial = 1;
for(int i = 2; i <= n; ++i) {
factorial *= i;
}
return factorial;
}
public String permutation(int n, int k) {
StringBuilder result = new StringBuilder();
List<Integer> nums = new LinkedList<>();
for(int i = 1; i <= n; ++i) {
nums.add(i);
}
int factorial = calculateFactorial(n);
--k;
for(int i = n; k > 0 && i >= 1; --i) {
factorial = factorial/i;
int pos = k/factorial;
result.append(nums.remove(pos));
k = k%factorial;
}
for(int num: nums) {
result.append(num);
}
return result.toString();
}
public static void main(String[] args) {
PermutationSequenceLT60 p = new PermutationSequenceLT60();
System.out.println(p.permutation(4, 9));
for(int i = 1; i <= 6; ++i) {
System.out.println(p.permutation(3, i));
}
for(int i = 1; i<= 24; ++i) {
System.out.println(p.permutation(4, i));
}
}
}
Recursive:
public class PermutationSequenceLT60 {
private int calculateFactorial(int n) {
int factorial = 1;
for(int i = 2; i <= n; ++i) {
factorial *= i;
}
return factorial;
}
private void permutationHelper(int k, List<Integer> nums, StringBuilder result, int factorial) {
if(k == 0) {
for(int num: nums) {
result.append(num);
}
return;
}
int pos = k/factorial;
result.append(nums.remove(pos));
permutationHelper(k%factorial, nums, result, factorial/nums.size());
}
public String permutation(int n, int k) {
StringBuilder result = new StringBuilder();
List<Integer> nums = new LinkedList<>();
for(int i = 1; i <= n; ++i) {
nums.add(i);
}
int factorial = calculateFactorial(n-1);
permutationHelper(k-1, nums, result, factorial);
return result.toString();
}
public static void main(String[] args) {
PermutationSequenceLT60 p = new PermutationSequenceLT60();
System.out.println(p.permutation(4, 9));
for(int i = 1; i <= 6; ++i) {
System.out.println(p.permutation(3, i));
}
for(int i = 1; i<= 24; ++i) {
System.out.println(p.permutation(4, i));
}
}
}