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In my C#-Silverlight 3 program, I have a set of points. Those points can be of a different color, green, red or blue. Then I create a convex hull for the different points: A hull for green, a hull for red and a hull for blue. Now it can happen, that within the hull of each color are points from another color, like red points within the green hull.

Are there any algorithms to modify the hull, so that those other-colored points would be excluded from the hull (which wouldn't be convex anymore at this point)?

Thanks in advance, Frank

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What do you mean by excluding? You mean removing these points? But when removing some points, you might "break" an existing convex hull. And what would happen when all points of the green convex hull are inside the red convex hull? More details are needed to answer this question. A concrete expample would also help. –  Bart Kiers Nov 8 '09 at 20:48
By "breaking" a convex hull, I meant removing say 3 of the 5 points of the convex hull because these 3 points were inside another hull. Then you end up with 2 remaining points which cannot be a convex hull. –  Bart Kiers Nov 8 '09 at 20:49

1 Answer 1

Translate to classic travelling salesman problem.

Use points that generates this hull and add the other points that you want them to exclude. Now find shotrest path over this points and you have this new hull


We need to find one noncrossing path over points.

  1. Find one point in middle (artithmetic center for instance)
  2. Calculate angle to each point (use function atan2)
  3. Sort this points by angle.

Complexity is now N*log(N)

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Cryptically answered, but the correct conclusion: it's an NP-hard problem. –  Clint Tseng Nov 30 '12 at 2:51
@Clint Tseng I am now thinking, that is not necessary that once you look for path over this excluded points to be shothest. It just to be hull. Finding noncrossing path over points is at worst N*log(N). –  Luka Rahne Nov 30 '12 at 17:36
I since found… which may be of interest to you. :) –  Clint Tseng Jan 9 '13 at 3:07

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