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I have a list of two dimensional points and I have been able to find the Voronoi diagram using the Fortune algorithm implementation here, I have also been able to compute the dual delaunnay triangulation for the same set of points..

In the figure you can see the input points in black, and the voronoi cells in red. enter image description here

The vornoi diagram is represented as a list of vertices, and a list of edges..

I need to find the list of vertices that form the Voronoi cell of any given input point ?

For example, given the point near to the end of the brown arrow in the figure above,, I need to identify the Voronoi vertices which are marked by the blue circles..

I know that the Voronoi vertices forming the cell enclosing a certain point can be identified by checking what Vornoi vertices have equal distance between this point and any other points... bu is there any more efficient solution ?

Is there a way to identify those vertices from the Voronoi diagram or the Delaunay triangulation ?

Or is there another implementation of Voronoi diagram that can give me those vertices given the input point ?

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Look quite similar to this question. –  Ante May 18 '13 at 20:42
FYI, I have solved it by a bruteforce solution.. This is how it works: for every vertex (v), sort the list of input points P according to their distance to that particular vertex (v). If there is a subset of points (P') points all having equal distance to that vertex v, then V is a vertex in the Vornoi cells enclosing those points. –  Moustafa Alzantot May 20 '13 at 13:55
You mean edge not vertex?! –  Phpdna Jul 16 '14 at 11:53
how about you study the algorithm and pull out the relevant info on the fly. –  agentp Jul 16 '14 at 16:18
@george:If my answer is helpful please consider to vote for it!!! –  Phpdna Jul 18 '14 at 13:28

1 Answer 1

Use the sites and the midpoint of the line. Loop over each line and compute the distance to each site. For inner polygons pick the 2 shortest in the list. For outer polygon only the first in the list.

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