Analysis of Several Familiar Subdivision Schemes
暂无分享,去创建一个
[1] N. Dyn,et al. A butterfly subdivision scheme for surface interpolation with tension control , 1990, TOGS.
[2] Malcolm A. Sabin,et al. Non-uniform recursive subdivision surfaces , 1998, SIGGRAPH.
[3] Hong Qin,et al. Dynamic Catmull-Clark Subdivision Surfaces , 1998, IEEE Trans. Vis. Comput. Graph..
[4] Lexing Ying,et al. Nonmanifold subdivision , 2001, Proceedings Visualization, 2001. VIS '01..
[5] J. Clark,et al. Recursively generated B-spline surfaces on arbitrary topological meshes , 1978 .
[6] Neil A. Dodgson,et al. Advances in Multiresolution for Geometric Modelling , 2005 .
[7] Tony DeRose,et al. Efficient, fair interpolation using Catmull-Clark surfaces , 1993, SIGGRAPH.
[8] A. A. Ball,et al. Conditions for tangent plane continuity over recursively generated B-spline surfaces , 1988, TOGS.
[9] Leif Kobbelt,et al. Interpolatory Subdivision on Open Quadrilateral Nets with Arbitrary Topology , 1996, Comput. Graph. Forum.
[10] Zhang Hong-xin. Semi-Stationary Push-Back Subdivision Schemes , 2002 .
[11] YE Zheng-lin. Reconstructing Surfaces Using Imitated Uniformity Subdivision Method , 2004 .
[12] H. Ehlers. LECTURERS , 1948, Statistics for Astrophysics.
[13] Jörg Peters,et al. Combining 4- and 3-direction subdivision , 2004, ACM Trans. Graph..
[14] Hartmut Prautzsch,et al. A G2-Subdivision Algorithm , 1996, Geometric Modelling.
[15] G. Umlauf. Analyzing the Characteristic Map of Triangular Subdivision Schemes , 2000 .
[16] George Merrill Chaikin,et al. An algorithm for high-speed curve generation , 1974, Comput. Graph. Image Process..