I'm lost here. Here's the problem and I think it's NP-hard. A center is staffed with a finite number of workers with the following conditions:
- There are 3 shifts per day with 2 people in each shift
- Each employee works for 5 days straight and then 2 days off with only one shift per day
So the problem is: how many workers do we need if the center remains active every day and a feasible schedule?
Thanks for all the great answers. The closest I've come to (with a randomized brute-force algorithm) is the following:
X 3 0 1 0 3 2 3 1 2 1 3 0 1 2 0 2 1 3 0 2
I've simplified the problem into batches of 2 people (0-3 represent 4 batches) in the hopes of getting a feasible solution.
X refers to a shift which has not been assigned (which was not the initial goal but it looks like there may not be an alternative).