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CAGD
2006

Discrete one-forms on meshes and applications to 3D mesh parameterization

13 years 11 months ago
Discrete one-forms on meshes and applications to 3D mesh parameterization
We describe how some simple properties of discrete one-forms directly relate to some old and new results concerning the parameterization of 3D mesh data. Our first result is an easy proof of Tutte's celebrated "spring-embedding" theorem for planar graphs, which is widely used for parameterizing meshes with the topology of a disk as a planar embedding with a convex boundary. Our second result generalizes the first, dealing with the case where the mesh contains multiple boundaries, which are free to be non-convex in the embedding. We characterize when it is still possible to achieve an embedding, despite these boundaries being non-convex. The third result is an analogous embedding theorem for meshes with genus 1 (topologically equivalent to the torus). Applications of these results to the parameterization of meshes with disk and toroidal topologies are demonstrated. Extensions to higher genus meshes are discussed. Keywords Computer graphics, parameterization, embedding, o...
Steven J. Gortler, Craig Gotsman, Dylan Thurston
Added 11 Dec 2010
Updated 11 Dec 2010
Type Journal
Year 2006
Where CAGD
Authors Steven J. Gortler, Craig Gotsman, Dylan Thurston
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