In a cubic box I have a large collection points in R^3. I\'d like to find the k nearest neighbors for each point. Normally I\'d think to use something like a k-d tree, but in th
(I'm posting this answer even though I'm not fully sure it works. Intuitively it seems right, but there might be an edge case I haven't considered)
If you're working with periodic boundary conditions, then you can think of space as being cut into a series of blocks of some fixed size that are all then superimposed on top of one another. Suppose that we're in R2. Then one option would be to replicate that block nine times and arrange them into a 3x3 grid of duplicates of the block. Given this, if we find the nearest neighbor of any single node in the central square, then either
In other words, we just replicate the elements enough times so that the Euclidean distance between points lets us find the corresponding distance in the modulo space.
In n dimensions, you would need to make 3n copies of all the points, which sounds like a lot, but for R3 is only a 27x increase over the original data size. This is certainly a huge increase, but if it's within acceptable limits you should be able to use this trick to harness a standard kd-tree (or other spacial tree).
Hope this helps! (And hope this is correct!)
Even in the Euclidean case, a point and its nearest neighbor may be on opposite sides of a hyperplane. The core of nearest-neighbor search in a k-d tree is a primitive that determines the distance between a point and a box; the only modification necessary for your case is to take the possibility of wraparound into account.
Alternatively, you could implement cover trees, which work on any metric.