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Given n points randomly distributed in [0,1] × [0,1], I try to allot to each point the area of the points which are closest to that point.

More formally as follows:

Given n points (x1, x2, ... xn) in [0,1] × [0,1], assign to each xj a value equal to the measure of the set of points { z | d(z, xj) ≤ d(z, xi) } for all i in (1, 2, .. n).

I can't come up with anything remotely efficient. Any help?

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It may be better to ask this on math.stackexchange.com... –  Simon MᶜKenzie Aug 19 '12 at 0:37
The phrase "measure of the set" isn't clear to me. Indeed, I think the entire third paragraph is a bit dense. You might want to give a concrete example of an input and the intended output to help people along. –  jwrush Aug 19 '12 at 0:42
Looks like you want a vornoi diagram of the points, and use the area of the vornoi cells. –  Vaughn Cato Aug 19 '12 at 0:51
Measure of any finite point set is zero, unless you are talking about some non-standard notion of measure, so you ought to define it first. –  n.m. Aug 19 '12 at 1:26

2 Answers 2

up vote 8 down vote accepted

Sounds like you're looking for Fortune's algorithm for generating Voronoi diagrams.

Fortune's algorithm

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You may want to try using a KD tree.

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fair enough. I've added a link to a KD Tree. –  robert king Aug 19 '12 at 11:20
thx, cancelled! –  quetzalcoatl Aug 19 '12 at 13:44

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