You are given an integer array gifts denoting the number of gifts in various piles. Every second, you do the following:
- Choose the pile with the maximum number of gifts.
- If there is more than one pile with the maximum number of gifts, choose any.
- Leave behind the floor of the square root of the number of gifts in the pile. Take the rest of the gifts.
Return the number of gifts remaining after k seconds.
Example 1:
Input: gifts = [25,64,9,4,100], k = 4 Output: 29 Explanation: The gifts are taken in the following way: - In the first second, the last pile is chosen and 10 gifts are left behind. - Then the second pile is chosen and 8 gifts are left behind. - After that the first pile is chosen and 5 gifts are left behind. - Finally, the last pile is chosen again and 3 gifts are left behind. The final remaining gifts are [5,8,9,4,3], so the total number of gifts remaining is 29.
Example 2:
Input: gifts = [1,1,1,1], k = 4 Output: 4 Explanation: In this case, regardless which pile you choose, you have to leave behind 1 gift in each pile. That is, you can't take any pile with you. So, the total gifts remaining are 4.
Constraints:
1 <= gifts.length <= 1031 <= gifts[i] <= 1091 <= k <= 103
Companies: DE Shaw
Related Topics:
Array, Heap (Priority Queue), Simulation
Similar Questions:
// OJ: https://leetcode.com/problems/take-gifts-from-the-richest-pile
// Author: github.com/lzl124631x
// Time: O(KlogN)
// Space: O(N)
class Solution {
public:
long long pickGifts(vector<int>& A, int k) {
priority_queue<int> pq(begin(A), end(A));
while (k-- && pq.size() && pq.top() > 1) {
int n = pq.top(), s = sqrt(n);
pq.pop();
pq.push(s);
}
long long ans = 0;
while (pq.size()) {
ans += pq.top();
pq.pop();
}
return ans;
}
};