| Constructing Differentiable Homeomorphisms between Isomorphic (2007) | |||||||||||||||
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| this paper will not be differentiable at these points. Similar finite subsets of points with reduced continuity, such as the vertices in a Delauney triangulation, arise in surface interpolation [1, 4, 6, 8, 10]. Given two planar point sets, two simple polygons, or two polygons with holes, each defined on m points, however, producing isomorphic triangulations of the input sets may require the addition of as many as \Theta(n ) vertices [2, 3, 9] | |||||||||||||||
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