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| |Definition=1. A Voronoi diagram is a subdivision of space. | | |Definition=1. A Voronoi diagram is a subdivision of space. |
| 2. The partitioning of a plane with n points into convex polygons such that each polygon contains exactly one generating point and every point in a given polygon is closer to its generating point than to any other.(mathematics) | | 2. The partitioning of a plane with n points into convex polygons such that each polygon contains exactly one generating point and every point in a given polygon is closer to its generating point than to any other.(mathematics) |
− | |Sources=https://en.wikipedia.org/wiki/Voronoi_diagram; http://mathworld.wolfram.com/VoronoiDiagram.html | + | |Sources=https://en.wikipedia.org/wiki/Voronoi_diagram (1.); http://mathworld.wolfram.com/VoronoiDiagram.html (2.) |
| }} | | }} |
| [http://stackoverflow.com/questions/tagged/voronoi http://stackoverflow.com/questions/tagged/voronoi] | | [http://stackoverflow.com/questions/tagged/voronoi http://stackoverflow.com/questions/tagged/voronoi] |
Revision as of 07:29, 16 November 2017
Definition
1. A Voronoi diagram is a subdivision of space.
2. The partitioning of a plane with n points into convex polygons such that each polygon contains exactly one generating point and every point in a given polygon is closer to its generating point than to any other.(mathematics)
Abbreviation
Synonyms
Dirichlet tessellation
Superterms
Subterms
Sources
https://en.wikipedia.org/wiki/Voronoi_diagram (1.); http://mathworld.wolfram.com/VoronoiDiagram.html (2.)
http://stackoverflow.com/questions/tagged/voronoi