There are a few similar questions on stackoverflow, but none of them seem to provide a tangible answer that someone without a solid understanding of NP-hard problems and algorithms can understand.

How does one perform 2D bin packing of rectangular objects? In my case, I'm trying to assemble several images into a single image, for use as a spritesheet, using the smallest amount of space. Each image possibly has wildly different bounds, but there is no set bounds to the container.

I was hoping someone with an understanding of bin packing algorithms could explain how this can be achieved programmatically, rather than providing a general overview of the bin packing method.

  • 1 – user97370 Jan 6 '12 at 21:49
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    I actually read that article quite thoroughly, and while it did improve my understanding of bin packing, its example implementation relies heavily on constructs only available in C#. Even after reading through the source code provided, I have no idea how he accomplishes some of the necessary steps. – FrozenFire Jan 6 '12 at 21:52
up vote 21 down vote accepted

I Googled "bin packing code" and this was my first hit:

Here's a summary: build a binary tree. Each branch in the tree contains a sprite. Each leaf node represents available space. Initially the tree has just the root node, which represents all available space. To add a sprite to the tree, search the tree for an unoccupied (leaf) node big enough to hold the sprite. Turn that node from a leaf into a branch by setting the sprite as the node's occupant and giving the node two children. One child represents the remaining space to the right of the sprite; the other represents the remaining space below the sprite and the first child.

The article I linked above explains this much more fully, with diagrams and JavaScript code. It also explains how to dynamically grow the sprite sheet rather than choosing a fixed size in advance.

All you need is here:

There is a paper and a decent C++ implementation.

If you need an even simpler pseudo-code, take a look at this site:

The "guillotine pack" is called a tree-based packing there.

  • does this algorithm rotate the boxes by 90°? – BendEg Jun 12 at 14:39
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    Optionally this algorithm may rotate box by 90, but this is only for optimal packing. If orientation must be preserved, then a little tweak to 'Fits()' function (in RectangleBinPack/GuillotineBinPack.cpp) should be enough - just do not test (w == height && h == width) while trying to fit. – Viktor Latypov Jun 12 at 20:50

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