# Programmatically arrange rectangular UI objects in an abstract way, without gaps

Given a collection of say, 50, images with various widths and heights, how would one go about programmatically arranging them in an interesting* abstract way? (see image below)

• By interesting I mean, no large gaps, and no easily distinguishable rows or columns (negative space forms a lot of T-like intersections).

For my specific case, all images have a set max dimension of 150px, which could mean the height OR width is a max of 150px (could be 150px by 450px, or 378px by 150px).

This seems like it could be a classic programming challenge but I'm finding the topic hard to Google...

EDIT: Changed image to show that there is no restriction on how the overall arrangement must be (doesn't have to fit inside a set area)

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I suggest you Google around on the topic of 'packing problem'. –  High Performance Mark Feb 15 '12 at 16:59

This thread shows that even with one type of nXm rectangles, it is NP-Hard to find if there is a solution , so your more generalized problem is of course NP-Hard as well [The only one type of rectangle is a private case of this problem]

You could try a backtracking solution if you are after optimized solution, or a heuristic approach such as genetic algorithms or hill climbing, which will be faster - but will usually find a non optimal result.

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This is not NP-Hard. It's a random treemap right? –  Triptych Feb 15 '12 at 17:52
@Triptych: I did not understand you, what is "random treemap?" [what do you mean by "it's"? what is it?] And why do you claim it is not NP-Hard? it is a variation of the 2d-bin packing –  amit Feb 15 '12 at 17:57
It's only NP-hard if you have the rectangle sizes beforehand. If you can pick sizes to suit you as you go, you can just recurse by randomly subdividing the original rectangle. –  Triptych Feb 15 '12 at 17:59
My mistake - just noticed that the sizes are given. You're right. –  Triptych Feb 15 '12 at 18:02
@Triptych: If you want best `"no large gaps"` [as the OP asks], you need to find the minimal rectangle that your given 50 images can fit in. If you could find it in polynomial time, you could also find in polynomial time the answer if you have the sizes beforehand. –  amit Feb 15 '12 at 18:04