# Delaunay triangulating the 2d polygon with holes

I want to triangulate the complex (but not self-intersecting) polygon with holes, so that resulting triangles all lay inside the polygon, cover that polygon completely, and obey the Delaunay triangle rules.

Obviously, I could just build the Delaunay triangulation for all points, but I fear that some edges of the polygon will not be included into resulting triangulation.

So, is such triangulation possible? And if yes, how can I do it?

Just in case - I need it to construct the approximation of polygon medial axis (I hope it can be done via connecting all circumference points of resulting triangles).

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But the set of vertices (and thus its Delaunay triangulation) doesn't determine whether or not the polygon has a hole. Isn't this important to you? –  TonyK Apr 13 '11 at 9:23
@TonyK - I have several sets of sequential verticles - one for outer polygon, and several sets for inner polygons. –  Rogach Apr 13 '11 at 9:30
But if you 'build the Delaunay triangulation for all points', you will triangulate inside the holes. How are you going to avoid this? –  TonyK Apr 13 '11 at 11:37
@TonyK - I hoped to triangulate all dots, and then exclude all triangles that are either outside of polygon, or inside it's holes. –  Rogach Apr 13 '11 at 18:51

It sounds like you want constrained Delaunay triangulation. The "holes" can be implemented by constraining input edges to remain unbroken in the triangulation.

See the Triangle and poly2tri projects for implementations.

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Looks very good! I'll check it out. –  Rogach Apr 27 '11 at 8:27
Yes, exactly what I needed. Thanks! –  Rogach Apr 27 '11 at 8:37