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I'd like to find the centre of any set of points. By the centre, I mean the point P such that the maximum distance from P to any point in the set is minimized. So the centre of (0, 0), (4, 0), and (2, 1) would be (2, 0):

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Obviously I can't just average the coordinates, since such an algorithm would give (2, 1/3) for the above problem rather than (2, 0). What algorithm should I use instead?

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closed as off topic by Roku, Lukas Knuth, kapa, Juvanis, Tikhon Jelvis Apr 24 '13 at 23:43

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center of gravity? stackoverflow.com/questions/5271583/… –  cakil Apr 24 '13 at 17:19
I think the center of gravity minimizes the sum of distances from the center to all points of the distribution. –  luksch Apr 24 '13 at 17:30
You may find the answer here (for Euclidean distance) or here (for Manhattan distance). –  Evgeny Kluev Apr 24 '13 at 17:42
@EvgenyKluev Thanks, that's just what I was looking for! –  nullptr Apr 24 '13 at 17:54
In case you are interested in maximum Euclidean distance, here is a nice explanation of linear-time algorithm (in pdf format). –  Evgeny Kluev Apr 24 '13 at 18:38

1 Answer 1

You are essentially looking to find a point P that minimizes \sum_i ||P-Ai||^k where Ai are your points and k=infinity. If not infinity, you can set k to a very high even value and obtain the solution.

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I am not sure this is what he is looking for. He want to minimize maximum distance, and geometric median minimizes sum of distances, it is not the same –  Martinsos Apr 24 '13 at 17:46
@Martinsos Yes you are right. –  ElKamina Apr 24 '13 at 18:19

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