You are given an even integer n. You initially have a permutation perm of size n where perm[i] == i (0-indexed).
In one operation, you will create a new array arr, and for each i:
- If
i % 2 == 0, thenarr[i] = perm[i / 2]. - If
i % 2 == 1, thenarr[i] = perm[n / 2 + (i - 1) / 2].
You will then assign arr to perm.
Return the minimum non-zero number of operations you need to perform on perm to return the permutation to its initial value.
Example 1:
Input: n = 2 Output: 1 Explanation: perm = [0,1] initially. After the 1st operation, perm = [0,1] So it takes only 1 operation.
Example 2:
Input: n = 4 Output: 2 Explanation: perm = [0,1,2,3] initially. After the 1st operation, perm = [0,2,1,3] After the 2nd operation, perm = [0,1,2,3] So it takes only 2 operations.
Example 3:
Input: n = 6 Output: 4
Constraints:
2 <= n <= 1000n is even.
// OJ: https://leetcode.com/contest/weekly-contest-234/problems/minimum-number-of-operations-to-reinitialize-a-permutation/
// Author: github.com/lzl124631x
// Time: O(logN)
// Space: O(1)
class Solution {
public:
int reinitializePermutation(int n) {
int i = 1, cnt = 0;
while (true) {
++cnt;
if (i < n / 2) {
i *= 2;
} else {
i = n - i - 1;
i *= 2;
i = n - i - 1;
}
if (i == 1) break;
}
return cnt;
}
};