# Clustering problem

I've been tasked to find N clusters containing the most points for a certain data set given that the clusters are bounded by a certain size. Currently, I am attempting to do this by plugging in my data into a kd-tree, iterating over the data and finding its nearest neighbor, and then merging the points if the cluster they make does not exceed a limit. I'm not sure this approach will give me a global solution so I'm looking for ways to tweak it. If you can tell me what type of problem this would go under, that'd be great too.

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Check out scipy.clustering for a start. Key word searches can then give a lot of info on the different algorithms that are used there. Clustering is a big field, with a lot of research and practical applications, and a number of simple approaches that have been found to work fairly well, so you may not want to start by rolling your own.

This said, clustering algorithms are generally fairly easy to program, and if you do want to program your own, k-means and agglomerative clustering are some of the favorites that are quick to do.

Finally, I'm not sure that your idea of exactly N clusters that are bounded by a certain size is self-consistent, but it depends on exactly what you mean by "size" and "cluster" (are single points a cluster?).

Update:

Following the OP's comments below, I think that the standard clustering methods won't give an optimal solution to this problem because there's not a continuous metric for the "distance" between points that can be optimized. Although they may give a good solution or approximation in some cases. For a clustering approach I'd try k-means since the premise of this method is having a fixed N.

But instead of clustering, this seems more like a covering problem (i.e., you have N rectangles of fixed size and you're trying to cover all of the points with them), but I don't know much about these, so I'll leave it to someone else.

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I should have been more specific. The attributes of a certain data point are cartesian coordinates. The ' physical size' of the cluster is determined by the attributes of a data point which would allow me to calculate an area. –  jlv Oct 8 '10 at 15:21
it's still not clear... e.g. you calculate the size of a cluster (of many data points, I assume), but the attributes of a single data point? Usually by size people mean either 1) the number of data points, or 2) the area in, say, Cartesian space. You mean something else? Also, is there are reason why none standard clustering methods will work for you? –  tom10 Oct 8 '10 at 15:43
I'm not familiar enough with the realm of clustering methods to know what will work for me. As for the data, each point is an (x,y) coordinate, and I use those points to define a rectangle for a cluster. So the min x, min y for in the data points for a cluster would represent the bottom-left point of a rectangle. the max x and max y in the data point would present the top - right point of a rectangle. I hope that makes sense –  jlv Oct 8 '10 at 15:59
@jlv : can you give a simple example with the input and wanted output ? In cartesian coordinates it's not very common to use rectangles. –  Loïc Février Oct 8 '10 at 16:25
Sure, that all sounds reasonable. What I don't understand then, is what if your points span a bigger area than N times the maximum bounding area? In this case, for example, there won't be a way fulfill the criteria. –  tom10 Oct 8 '10 at 16:28

If your number of clusters is fixed and you only want to maximize the number of points that are in these clusters then I think a greedy solution would be good :

• find the rectangle that can contains the maximum number of points,
• remove these points,
• find the next rectangle
• ...

So how to find the rectangle of maximum area A (in fact each rectangle will have this area) that contains the maximum number of points ?

A rectangle is not really common for euclidean distance, before trying to solve this, could you precise if you really need rectangle or just some king of limit on the cluster size ? Would a circle/ellipse work ?

EDIT : greedy will not work (see comment below) and it really need to be rectangles...

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Unfortunately, it seems like I do have to use rectangles. Part of the spec. Do you have any advice how to find simply one rectangle with the maximum number of points? –  jlv Oct 8 '10 at 18:58
I don't think a greedy solution will work. Consider, for example, a square of 4 pts, length 1, centered within a square of 4 pts, length 2, and 4 bounding regions with length 1. The first greedy boundary will take the 4 pts of the smaller square, leaving 3 boundaries for the remaining larger outer square's 4 pts. The correct solution here, is, of course, one boundary for the two points in of each square's corners. –  tom10 Oct 8 '10 at 19:02
(And I apologize for being a critic when I'm not really offering a solution of my own.) –  tom10 Oct 8 '10 at 19:03
Don't apologize, glad to be proven wrong. Greedy seemed to good to be true bu not counter-example came to my mind. Thanks ! –  Loïc Février Oct 8 '10 at 19:12
@jlv : can you give some more infos ? Max coordinates of points, typical value for N, max number of points ? –  Loïc Février Oct 8 '10 at 19:15