# How can I programmatically determine how to fit smaller boxes into a larger package?

Does anyone know of existing software or algorithms to calculate a package size for shipping multiple items?

I have a bunch of items in our inventory database with length, width and height dimesions defined. Given these dimensions I need to calculate how many of the purchased items will fit into predefined box sizes.

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Interesting question. At first I was thinking about ways to calculate the area of each item compared to the area available for the box, but that's doesn't really work when you have things that aren't, like, perfect cubes... You could have space left in the box without it being usable space. Hrm... –  Kevin Fairchild Sep 26 '08 at 16:07
Thanks BTW to Rich B for improving the title of this question. Especially adding the "programatically" a la a recent SO podcast. –  polara Sep 26 '08 at 16:19
@polara: No worries. –  GEOCHET Sep 26 '08 at 16:21

This is a Bin Packing problem, and it's NP-hard. For small number of objects and packages, you might be able to simply use the brute force method of trying every possibility. Beyond that, you'll need to use a heuristic of some sort. The Wikipedia article has some details, along with references to papers you probably want to check out.

The alternative, of course, is to start with a really simple algorithm (such as simply 'stacking' items) and calculate a reasonable upper-bound on shipping using that, then if your human packers can do better, you make a slight profit. Or discount your calculated prices slightly on the assumption that your packing is not ideal.

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Your definition is accurate, and I voted your answer up since it provided some useful reference info. Ideally I'd like to find a ready made solution. –  polara Sep 26 '08 at 16:15

The literature on "3D Bin packing" is far and wide. You can get a good overview by tracking the publications of Professor David Pisinger. He also published one of the few high quality implementations of bin packing with sourcecode: 3dbpp.c

My own logistics toolkit pyShipping comes with a 3D Bin Packing implementation for Warehousing applications. It is basically implementing 4D Bin Packing (3D size & weigth) and gets an acceptable solution for typical order sizes (a few dozens of packages) in under a second runtime. It is used in production (meaning a warehouse) for some months now to determine the upper bound of shipping crates to be used. The warehouse workers are often able to pack somewhat more efficiently but that's OK with me.

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Are you trying to see how many of a single type fits into a particular sized package, or are you trying to mix types as well?

Sounds like you're trying to solve the Knapsack Problem. You might be able to find some algorithms for that which could be adapted to your specific requirements. Just understand that it will be hard to find an efficient algorithm, as the problem is NP complete (though depending on your specific requirements you may be able to find an efficient approximation, or your inputs may be small enough that it doesn't matter).

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Your description and referenced link are accurate as well. As in the case with the Bin Packing problem that Arachnid referenced, there can be an extreme number of different possible solutions compounded by the ability to turn items sideways in the box. –  polara Sep 26 '08 at 16:17
The problem as posted by the OP is not an instance of Knapsack. –  Michael Nett Jan 17 '12 at 11:34

maybe this thing i hacked the last hours may help: http://github.com/yetzt/boxing

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Metaheuristics are good to deal with real world bin packing problems when there are many packages and/or many constraints. One open source Java implementation is Drools Planner.

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Maybe this will sound obvious, but it might be worthwhile to memoize the problem, then do some of them by hand. Finding a most effecient solution for arbitrary inputs and boxes in NP-hard, but by restricting the problem space, and accepting some inefficiency, that NP size might be something reasonable, and by memoizing, you might be able to bring the "common-case" time down substantially.

It might also help to think about things in terms of hierarchical packing.

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Thanks. Yes, heuristics were suggested by Arachnid as well. The application of this was to calculate shipping charges, and I could imagine a fully automated solution coming up with all sorts of impractical arrangements. –  polara Sep 27 '08 at 20:26