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Assume that we have 1 billion points in 3 dimensional space (or 2d, it doesn't matter at the moment), we want to find k closest points (a subset of points with size k that are closer to each other than any other such subset), how can we do that ?

I know that there's a data structure called cover tree but I guess it might not be useful here as it tries to find nodes which are closest to one point.

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Spatial indexes may come in handy. –  dasblinkenlight Jun 24 '13 at 3:28
    
Actually there is a long list of them, I know R-tree and specially Kd-tree , but I guess these work same as cover tree here, we can use these structures to find the the closest nodes to a single node. –  Arian Hosseinzadeh Jun 24 '13 at 3:56
    
Actually I think we can use for example the kd-tree data structure to store the nodes and then by doing a kind of in-order traversal of the nodes and keeping a queue of fixed length (k) we can find the points which are closest together , this will take O(nlogn) for creating the kd-tree and O(n) to traverse all of the nodes, so the total time would be O(nlogn) , any idea ? –  Arian Hosseinzadeh Jun 24 '13 at 4:02
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There are k(k-1)/2 distances in a set of k points. What should be minimized? Sum? Maximum? Something else? –  n.m. Jun 24 '13 at 6:08
    
@n.m. Sum of the distances between each two node has to be minimized And you are right there are k(k-1)/2 distances , but we can do that in O(n), because we add a new point to the queue we have distances between other nodes , so this can be done in O(k) –  Arian Hosseinzadeh Jun 24 '13 at 16:10

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That seems like an ideal problem for the K-Means Algorithm, your results should look like this

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