1. Anisotropic voronoi diagrams and guaranteed-quality anisotropic mesh generation
- Author
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Jonathan Richard Shewchuk and François Labelle
- Subjects
Triangle mesh ,Triangulation (social science) ,Power diagram ,Computer Science::Computational Geometry ,Voronoi deformation density ,Centroidal Voronoi tessellation ,Lloyd's algorithm ,Topology ,Voronoi diagram ,Weighted Voronoi diagram ,Mathematics - Abstract
We introduce anisotropic Voronoi diagrams, a generalization of multiplicatively weighted Voronoi diagrams suitable for generating guaranteed-quality meshes of domains in which long, skinny triangles are required, and where the desired anisotropy varies over the domain. We discuss properties of anisotropic Voronoi diagrams of arbitrary dimensionality---most notably circumstances in which a site can see its entire Voronoi cell. In two dimensions, the anisotropic Voronoi diagram dualizes to a triangulation under these same circumstances. We use these properties to develop an algorithm for anisotropic triangular mesh generation in which no triangle has an angle smaller than 20A, as measured from the skewed perspective of any point in the triangle.
- Published
- 2003
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