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# How can I reduce this kind of BinPack algorithm? (It might be called sth like MinBreak-BinFill.)

I use a special variant of BinPack problem. I use a naïve algorithm, atm, so I like to know how it might be called to do some initial research. Or does anyone know how to reduce this problem to something known?

The problem: There are items I and bins B in specific quantity and size.

``````|I| ∈ ℕ, |B| ∈ ℕ
s : (I ∪ B) → ℕ
``````

The sum of all item-sizes is at least the size of the sum of all bins.

``````∑ _{i∈I} s(i) ≥ ∑ _{b∈B} s(b)
``````

Each bin has to be filled with items or parts of items so that it is filled completely. `s(b,i)` is the size of that part of i that is in b, or 0 iff not.

``````∀ b ∈ B, i ∈ I: s(b,i) ∈ ℕ ∪ {0}
∀ i ∈ I: ∑ _{b∈B} s(b,i) ≤ s(i)
∀ b ∈ B: ∑ _{i∈I} s(b,i) ≥ s(b)
``````

The goal is to minimize the number of item-parts needed to fill all bins.

``````numparts = |{ (b,i) ∈ B×I | s(b,i)>0 }|
find min(numparts)
``````
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