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I've successfully implemented a way to generate Voronoi diagrams in 2 dimensions using Fortune's method. But now I'm trying to use it for nearest neighbor queries for a point (which is not one of the original points used to generate the diagram). I keep seeing people saying that it can be done in O(lg n) time (and I believe them), but I can't find a description of how it's actually done.

I'm familiar with binary searches, but I can't figure out a good criteria to guarantee that upper bound. I also figured maybe it could have to do with inserting the point into the diagram and updating surrounding cells, but can't think (or find) of a good way to do that.

Can anyone clue me in, or point to a place with a more thorough description?

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up vote 6 down vote accepted

I think that some kind of search structure has to be made from plane subdivision (Voronoi diagram), like Kirkpatrick's point location data structure.

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1  
That makes sense. I think I'm familiar with that method. I'd upvote you, but I can't yet. – Chad Mourning Aug 19 '11 at 16:22
1  
@Chad: I haven't been familiar with Kirkpatrick structure until I searched because of your question:-) I worked with Voronoi diagrams before, but I never used them for point location. This method looks quite nice. – Ante Aug 19 '11 at 22:13

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