Conformal Equivalence of Triangle Meshes
Abstract
We present a new algorithm for conformal mesh parameterization. It is based on a precise notion of discrete conformal equivalence for triangle meshes which mimics the notion of conformal equivalence for smooth surfaces. The problem of finding a flat mesh that is discretely conformally equivalent to a given mesh can be solved efficiently by minimizing a convex energy function, whose Hessian turns out to be the well known cot-Laplace operator. This method can also be used to map a surface mesh to a parameter domain which is flat except for isolated cone singularities, and we show how these can be placed automatically in order to reduce the distortion of the parameterization. We present the salient features of the theory and elaborate the algorithms with a number of examples.
Additional Information
© 2008 ACM, Inc. Year of Publication: 2008 This work was supported in part by NSF (CCF-0528101 and CCF- 0635112), DOE (W-7405-ENG-48/B341492), the Caltech Center for Mathematics of Information, DFG Research Center Matheon, the Alexander von Humboldt Stiftung, and Autodesk. The authors are gratefully indebted to Alexander Bobenko for inspiring discussions. Special thanks to Cici Koenig, Andreas Fabri, Pierre Alliez, and Mathieu Desbrun.Additional details
- Eprint ID
- 19164
- DOI
- 10.1145/1360612.1360676
- Resolver ID
- CaltechAUTHORS:20100722-120116172
- NSF
- CCF-0528101
- NSF
- CCF-0635112
- DOE
- W-7405-ENG-48/B341492
- Caltech Center for Mathematics of Information
- DFG (Deutsche Forschungsgemeinschaft) Research Center Matheon
- Alexander von Humboldt Stiftung
- Autodesk
- Created
-
2010-07-30Created from EPrint's datestamp field
- Updated
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2023-10-20Created from EPrint's last_modified field
- Series Name
- Proceedings of ACM SIGGRAPH 2008
- Series Volume or Issue Number
- 3