- Difficulty: Hard
- Tags: LeetCode, Hard, Greedy, Queue, Array, Binary Search, Sorting, Monotonic Queue, leetcode-2071, O(n * (logn)^2), O(n), Sorted List
Problem
You have n
tasks and m
workers. Each task has a strength requirement stored in a 0-indexed integer array tasks
, with the ith
task requiring tasks[i]
strength to complete. The strength of each worker is stored in a 0-indexed integer array workers
, with the jth
worker having workers[j]
strength. Each worker can only be assigned to a single task and must have a strength greater than or equal to the task's strength requirement (i.e., workers[j] >= tasks[i]
).
Additionally, you have pills
magical pills that will increase a worker's strength by strength
. You can decide which workers receive the magical pills, however, you may only give each worker at most one magical pill.
Given the 0-indexed integer arrays tasks
and workers
and the integers pills
and strength
, return the maximum number of tasks that can be completed.
Example 1:
Input: tasks = [3,2,1], workers = [0,3,3], pills = 1, strength = 1 Output: 3 Explanation: We can assign the magical pill and tasks as follows: - Give the magical pill to worker 0. - Assign worker 0 to task 2 (0 + 1 >= 1) - Assign worker 1 to task 1 (3 >= 2) - Assign worker 2 to task 0 (3 >= 3)
Example 2:
Input: tasks = [5,4], workers = [0,0,0], pills = 1, strength = 5 Output: 1 Explanation: We can assign the magical pill and tasks as follows: - Give the magical pill to worker 0. - Assign worker 0 to task 0 (0 + 5 >= 5)
Example 3:
Input: tasks = [10,15,30], workers = [0,10,10,10,10], pills = 3, strength = 10 Output: 2 Explanation: We can assign the magical pills and tasks as follows: - Give the magical pill to worker 0 and worker 1. - Assign worker 0 to task 0 (0 + 10 >= 10) - Assign worker 1 to task 1 (10 + 10 >= 15) The last pill is not given because it will not make any worker strong enough for the last task.
Constraints:
n == tasks.length
m == workers.length
1 <= n, m <= 5 * 104
0 <= pills <= m
0 <= tasks[i], workers[j], strength <= 109