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I'm trying to classify the following problem:

I have N empty boxes (ni is the volume of the i-th box, 1 <= i <= N) and M divisible items (mj is the volume of j-th item j, 1 <= j <= M). The total volume of all boxes is exactly equal to the total volume of all items. I need to find a distribution of items among boxes which minimizes the number of item divisions.

I suppose this problem is NP-complete, and is some kind of set coverage problem, but I can't find appropriate variation of it.

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closed as off-topic by Wooble, larsmans, Daniel Daranas, Mark, Uwe Plonus Jul 11 '13 at 14:48

This question appears to be off-topic. The users who voted to close gave this specific reason:

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+1 for figuring out you need to leetspell problem. That said, you should include in your question what you have attempted, and where you got stuck. –  Marcin Jul 11 '13 at 13:51
-1 figuring out you need to leetspell problem instead of typing a better title. –  Wooble Jul 11 '13 at 13:52
Maybe I'm wrong, but doesn't this belong in cstheory.stackexchange.com ? –  Ricky Mutschlechner Jul 11 '13 at 13:54
Well, the "problem" word has several meanings... I suppose that "problem" as "trouble" is prohibited in titles, but I used it in different, scientific meaning. Anyway, I just want to know is there a well-known algorithmic problem with isomorphic description or it's just a nameless one. –  roman-kashitsyn Jul 11 '13 at 14:05
This question appears to be off-topic because it is about computimg theory and so should be on cs.stackexchange.com –  Mark Jul 11 '13 at 14:21

1 Answer 1

The special case N=2 and n_1 = n_2 is exactly the Subset Sum problem


since the optimum value of the problem formulated above is 0 if and only if the instance (viewed as an instance of Subset Sum) has a solution. Hence, the presented problem is indeed NP-hard.

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