# How do I get the set of rectangles from a k-d tree?

If you look at the Wikipedia entry for k-d trees, you will see this illustration of points and planes that divides the 2D space into rectangles.

My question is how do I get the resultant set of rectangles? I thought that each 'path' to a leaf node might give me the bounds. Is there a general way to do this for N points at arbitrary depths?

Notice that what I am not asking for is a k-d tree of hyperrectangle structures, where the given input is a set of rectangles that can then be queried for range search, etc. My input is a set of random points, and I want to output the set of rectangles that 'tesselate' or subdivide the Cartesian space completely.

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There seem to be two questions here. Are you looking for an algorithm that constructs a k-d tree from a random set of points, or an algorithm that, given a k-d tree, enumerates the set of partitioning rectangles? Or both? – eh9 Nov 20 '12 at 14:12
k-d trees do not generally store rectangles, they store split axes. You could trivially implement this by writing a small bit of rectangle splitting code that basically passes in a 2D rectangle that each node cuts along the split axis, sending the 2 new rects to the children. – Jerdak Nov 20 '12 at 20:31