You are given a positive integer p. Consider an array nums (1-indexed) that consists of the integers in the inclusive range [1, 2p - 1] in their binary representations. You are allowed to do the following operation any number of times:
- Choose two elements
xandyfromnums. - Choose a bit in
xand swap it with its corresponding bit iny. Corresponding bit refers to the bit that is in the same position in the other integer.
For example, if x = 1101 and y = 0011, after swapping the 2nd bit from the right, we have x = 1111 and y = 0001.
Find the minimum non-zero product of nums after performing the above operation any number of times. Return this product modulo 109 + 7.
Note: The answer should be the minimum product before the modulo operation is done.
Example 1:
Input: p = 1 Output: 1 Explanation: nums = [1]. There is only one element, so the product equals that element.
Example 2:
Input: p = 2 Output: 6 Explanation: nums = [01, 10, 11]. Any swap would either make the product 0 or stay the same. Thus, the array product of 1 * 2 * 3 = 6 is already minimized.
Example 3:
Input: p = 3
Output: 1512
Explanation: nums = [001, 010, 011, 100, 101, 110, 111]
- In the first operation we can swap the leftmost bit of the second and fifth elements.
- The resulting array is [001, 110, 011, 100, 001, 110, 111].
- In the second operation we can swap the middle bit of the third and fourth elements.
- The resulting array is [001, 110, 001, 110, 001, 110, 111].
The array product is 1 * 6 * 1 * 6 * 1 * 6 * 7 = 1512, which is the minimum possible product.
Constraints:
1 <= p <= 60
We can find the pattern that, we can always turn the array into the following form
[1, a, 1, a, 1, a, ..., 1, a, max]
where max = MAX(A) = 2^p - 1, a = max - 1.
The answer is a^(max / 2) * max.
// OJ: https://leetcode.com/problems/minimum-non-zero-product-of-the-array-elements/
// Author: github.com/lzl124631x
// Time: O(logP)
// Space: O(1)
class Solution {
long long modpow(long long base, long long exp, long long mod) {
base %= mod;
long long ans = 1;
while (exp > 0) {
if (exp & 1) ans = ans * base % mod;
base = base * base % mod;
exp >>= 1;
}
return ans;
}
public:
int minNonZeroProduct(int p) {
long long mod = 1e9 + 7, mx = (1LL << p) - 1, next = mx - 1, ans = 1;
return modpow(next, mx / 2, mod) * (mx % mod) % mod;
}
};