# Place N Point to Minimize Distance to a List of Points

Given a list of points on a 2D plane how could one place N points on the plane in such a way that that the total sum of all distances from the list of points to the closest placed point were as small as possible? The environment is discreet and the list will contain unique points within a range of [(0,0) ; (~200:~100)]

Preferably the algorithm's worst case performance should be polynomial (and thus with the small ranges computational in real time). Any approximations are welcome as well.

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Are you saying that for each point from the original set, only calculate the distance to the one point from the new set that is its nearest neighbor? –  mbeckish Jul 29 '11 at 18:52
I am confused by "Closest placed point", But I assume you are given a point and asked to place them as close as possible to the said point. Is that what you mean? In which case, you would put all the points in the circle around the point. –  djhaskin987 Jul 29 '11 at 18:53
@mbeckish that is correct. –  Kasper Holdum Jul 29 '11 at 19:18

This sound really like what K-Means clustering algorithm do. In your case, the list of points are the input, and the number of points N is the number of clusters.

Sadly, what it does is NP-hard. But there are many researches going on, and a lot ways to try to make it better (just scroll down the wiki page you'll find some).

Also, I doubt there will be a better algorithm, since k-means is really heavily used by academics. I guess if there is a better algorithm they'd run for that one:)

And again, I present you the best tutorial in Data Mining for me: Andrew Moore's slides. Although I don't know your purpose, this should be very close to what you need.

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This sound like exactly what I need. I will look into it a bit. –  Kasper Holdum Jul 29 '11 at 19:21

You could get the Center of mass of the list of nodes (with weights = 1).
Or a variance of it with x^2 for distances.

You've reduced the problem to where to place the N nodes in the area of center of mass where the distance to the rest is minimal.

In a perfect world you'd just put one point in the center of mass. But because I assume you can't place 2 points in the same place, you need to choose the vicinity of the center of mass.

So that reduces the problem to just choosing the best of 8 points near the center of mass, then recalculate center of mass, and do it again.

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