@inproceedings{76340209d1a243388a340a48d79fa3b2,
title = "Manifold T-spline",
abstract = "This paper develops the manifold T-splines, which naturally extend the concept and the currently available algorithms/techniques of the popular planar tensor-product NURBS and T-splines to arbitrary manifold domain of any topological type. The key idea is the global conformal parameterization that intuitively induces a tensor-product structure with a finite number of zero points, and hence offering a natural mechanism for generalizing the tensor-product splines throughout the entire manifold. In our shape modeling framework, the manifold T-splines are globally well-defined except at a finite number of extraordinary points, without the need of any tedious trimming and patching work. We present an efficient algorithm to convert triangular meshes to manifold T-splines. Because of the natural, built-in hierarchy of T-splines, we can easily reconstruct a manifold T-spline surface of high-quality with LOD control and hierarchical structure.",
author = "Ying He and Kexiang Wang and Hongyu Wang and Xianfeng Gu and Hong Qin",
year = "2006",
doi = "10.1007/11802914\_29",
language = "English",
isbn = "9783540367116",
series = "Lecture Notes in Computer Science (including subseries Lecture Notes in Artificial Intelligence and Lecture Notes in Bioinformatics)",
publisher = "Springer Verlag",
pages = "409--422",
booktitle = "Geometric Modeling and Processing, GMP 2006 - 4th International Conference, Proceedings",
note = "4th International Conference on Geometric Modeling and Processing, GMP 2006 ; Conference date: 26-07-2006 Through 28-07-2006",
}