Finding multiple solutions to bin packing

I have 3 boxes of variable size:

``````A: 5, B: 3, C: 6
``````

I have items of size `a: 1, b: 2, c: 2, d: 3, e: 5`

I could obviously fit them in the following pattern:

``````A: a, b, c
B: d
C: e
``````

but you could also do it like this:

``````A: e
B: a, b
C: c, d
``````

Is there a way I can get all possible packings like this?

This feels like a bin packing challenge but I'm not trying to find an "optimal" solution, just all (or at least multiple) possible solutions.

I imagine I could maybe run a naive bin packing algorithm over the items in a random order until a solution is hit but that seems really inefficient...

Any ideas?

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my guess is that there is not "the" efficient way. since you want all solutions you have to test for almost all permutations of "throwing the balls". –  sotix Sep 10 '13 at 9:39
Yeah, I know it's a hard problem, I guess I was just searching for something I had maybe overlooked :( –  Peter Hamilton Sep 10 '13 at 9:51

I just implemented what you asked for

``````boxSizes, itemSizes = [5, 3, 6], [1, 2, 2, 3, 5]

def recurse(boxes, itemIndex, solution, itemsUsed):
global itemSizes
if itemsUsed == len(itemSizes):
print solution
return
for i in range(len(boxes)):
for j in range(itemIndex, len(itemSizes)):
if boxes[i] - itemSizes[j] >= 0:
boxes[i] -= itemSizes[j]
solution[i].append(itemSizes[j])
recurse(boxes, j + 1, solution, itemsUsed + 1)
solution[i].pop()
boxes[i] += itemSizes[j]

recurse(boxSizes, 0, [[] for i in range(len(boxSizes))], 0)
``````

Output

``````[[1, 2, 2], [3], [5]]
[[2, 3], [1, 2], [5]]
[[2, 3], [1, 2], [5]]
[[5], [1, 2], [2, 3]]
[[5], [1, 2], [2, 3]]
[[2, 2], [3], [1, 5]]
[[2, 3], [2], [1, 5]]
[[2, 3], [2], [1, 5]]
[[5], [2], [1, 2, 3]]
[[5], [2], [1, 2, 3]]
[[5], [3], [1, 2, 2]]
``````

We see some solutions repeating, that is because there are two numbers in the inputs which are same.

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