Algorithm for arranging patients; simpler version of bin packing

I am currently working on a scheduling tool where I have multiple locations (bins) each with differing seating capacities where I need to place patients. The patients are either positive or negative. I cannot mix positive and negative patients in the same location.

As each requirement to seat a patient comes in I need to be able to state whether we can seat them based on the patient being positive or negative.

There is no requirement to assign a patient to a location so the arrangement of patients can be fluid, I just need to maximize capacity.

At the point of making the calculation I will know:

1. How many locations there are.
2. The number of seats in each location.
3. Number of positive patients already granted a seat.
4. Number of negative patients already granted a seat.

I am sure someone will have a clear solution to this but at the minute I can't see the wood for the trees.

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For the already-seated patients, do you also know at which location they are seated? From here, do you receive a stream of patients, rather than knowing them all ahead of time? Can any seat be occupied by any patient? If so, I don't really see the problem - bin packing is hard because items have different sizes. If they all have the same size, it doesn't really matter where you put them. You just need to decide which location should be negative and which positive - you probably just want to assign the locations from the largest one. –  Dukeling Oct 18 '13 at 15:12
Each patient is the same "size", correct? So I don't see why you need to do anything more than direct each positive patient to any of the locations with other positive patients and at capacity >= 1, and each negative patient to any of the locations with other negative patients and capacity >= 1. If you get a X-ive (where X is "positive" or "negative") patient and there are no X-ive locations with free capacity, pick the smallest-capacity empty location, which then becomes X-ive. –  j_random_hacker Oct 18 '13 at 15:43
I agree the patients are the same size. Let me give an example of the problem I was trying to anticipate. Lets say we have 3 locations; Location A has a capacity of 3, Location B has a capacity of 4 and Location C has a capacity of 4. If I have 3 +ive patients in Location A, 4 -ive in Location B and 3 -ive in Location C then if the next patient is +ive I can't accommodate that. However I should be able to if I switch Locations A and C. –  Copers Oct 18 '13 at 16:25
Right, but am I correct in thinking that you don't know the final numbers of +ve and -ve patients? If you do know that, then yes, you will be able to use a smarter (non-greedy) approach to find a better way of allocating patients in cases like your example, but if you don't know that, then I believe the optimal strategy will be to always allocate the smallest available free room when there are no non-full X-ive rooms left -- because this minimises the number of seats wasted in the worst case (which would be when no other X-ive patient comes in afterwards). –  j_random_hacker Oct 19 '13 at 18:00
@j_random_hacker It is true that I don't know the final number of patients. However I am free to move patients around therefore I was thinking as each patient requirement comes through I can treat that as if that was the final list and re-evaluate each time. –  Copers Oct 20 '13 at 10:49