2576. Find the Maximum Number of Marked Indices
Description
You are given a 0-indexed integer array nums.
Initially, all of the indices are unmarked. You are allowed to make this operation any number of times:
- Pick two different unmarked indices
iandjsuch that2 * nums[i] <= nums[j], then markiandj.
Return the maximum possible number of marked indices in nums using the above operation any number of times.
Example 1:
Input: nums = [3,5,2,4] Output: 2 Explanation: In the first operation: pick i = 2 and j = 1, the operation is allowed because 2 * nums[2] <= nums[1]. Then mark index 2 and 1. It can be shown that there's no other valid operation so the answer is 2.
Example 2:
Input: nums = [9,2,5,4] Output: 4 Explanation: In the first operation: pick i = 3 and j = 0, the operation is allowed because 2 * nums[3] <= nums[0]. Then mark index 3 and 0. In the second operation: pick i = 1 and j = 2, the operation is allowed because 2 * nums[1] <= nums[2]. Then mark index 1 and 2. Since there is no other operation, the answer is 4.
Example 3:
Input: nums = [7,6,8] Output: 0 Explanation: There is no valid operation to do, so the answer is 0.
Constraints:
1 <= nums.length <= 1051 <= nums[i] <= 109
Solutions
Solution 1: Greedy + Two Pointers
In order to mark as many indices as possible, we can sort the array nums, and then traverse the array from left to right. For each index $i$, we find the first index $j$ in the right half of the array that satisfies $2 \times nums[i] \leq nums[j]$, and then mark indices $i$ and $j$. Continue to traverse the next index $i$. When we have traversed the right half of the array, it means that the marking is complete, and the number of marked indices is the answer.
The time complexity is $O(n \times \log n)$, and the space complexity is $O(\log n)$. Where $n$ is the length of the array nums.
| |
| |
| |
| |
| |