# Algorithm for seating groups of people?

I'm interested in writing an application that can determine how to seat groups of 2-10 people at tables that can hold 10 people. There will probably be about 15 tables and 140 people total. I don't want to break up any of the groups of people.

It seems like it might be a common problem and I was wondering if anyone had any suggestions on where I should start to look for a solution to this. Any links or suggestions appreciated.

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Best: the operation takes O(0) to solve. No calculation performed! –  mcandre Jul 7 '10 at 14:30
No groups are broken up. Every group is seated. –  Abe Miessler Jul 7 '10 at 14:31

This is the bin packing problem.

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@Abe Miessler, check out this link and read about the First-fit algorithm. The general problem is hard, but your size limits make it easy to do with the naive, greedy approach. –  grossvogel Jul 7 '10 at 14:38
The size limit makes it easy if it is underspecified -- meaning there are many solutions. However, in the other extreme case where it is impossible to seat all groups at ten tables (but just barely), you have to exhaust every possibility to determine that it is impossible. –  Donald Miner Jul 7 '10 at 14:43
AFAIK, the first-fit approach is what most filesystems and memory managers use when allocating space, and it works quite well. –  rmeador Jul 7 '10 at 16:08

This is just a variation on the standard "Knapsack problem"

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No it is not! Knapsack has pseudo-polynomial solutions while bin-packing does not. –  Aryabhatta Jul 7 '10 at 14:53

Let the groups decide where to sit. Is it okay if the groups decide on their own to break up, merge with other groups, or move tables together?

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Not if this is a wedding, where the bride & groom are paying for each table, and people have requested in advance what meal they want. –  James Curran Jul 7 '10 at 14:28
No it's too big for that, if I let them decide groups usually get broken up. –  Abe Miessler Jul 7 '10 at 14:30
Distribute the biggest groups first, then add smaller groups wherever you can. –  mcandre Jul 7 '10 at 14:31

When we had this problem in school we solved it with as a TSP problem.

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That means that the problem is NP-hard. So Abe will probably not find an optimal algorithm... –  YuppieNetworking Jul 7 '10 at 14:33
@Yuppie: No, that means it's NP, which doesn't really tell us anything (though the fact that you modeled the problem as TSP in class rather than using a polynomial-time algorithm hints that the instructor knew the problem is NP-complete :) –  BlueRaja - Danny Pflughoeft Jul 7 '10 at 16:13