J4 ›› 2009, Vol. 47 ›› Issue (4): 656-660.

• 数学 • 上一篇    下一篇

多尺度NURBS曲面间的G1连续算法

车翔玖1, 高占恒1, 李 强2   

  1. 1. 吉林大学 计算机科学与技术学院, 长春 130012|2. 吉林大学 数学研究所, 长春 130012
  • 收稿日期:2008-08-18 出版日期:2009-07-26 发布日期:2009-08-24
  • 通讯作者: 车翔玖 E-mail:chexj@jlu.edu.cn

G1 Continuity Algorithm for Multilevel NURBS Surfaces

CHE Xiangjiu1, GAO Zhanheng1, LI Qiang2   

  1. 1. College of Computer Science and Technology, Jilin University, Changchun 130012, China;2. Institute of Mathematics, Jilin University, Changchun 130012, China
  • Received:2008-08-18 Online:2009-07-26 Published:2009-08-24
  • Contact: CHE Xiangjiu E-mail:chexj@jlu.edu.cn

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摘要:

利用准均匀B样条基函数和二维B样条小波的多分辨分析理论, 简述了准均匀B样条基函数作为尺度函数而构造的B样条小波及其分解算法, 并给出了NURBS曲面的分解算法. 基于NURBS曲面(B样条曲面)的G1连续条件及其多尺度表示, 给出了两个多尺度NURBS曲面间保持G1连续的算法与实现过程.

关键词: B样条小波, 多尺度NURBS曲面, G1连续

Abstract:

Based on quasiuniform Bspline basis functions and multiresolution theory of Bspline wavelets of two dimension,  the Bspline wavelets constructed by taking quasiuniform Bspline basis functions as scaling function as well as its decomposition algorithm are described. Further,  the decomposition algorithm for NURBS surface is studied. By making use of  G1 conditions for two NURBS surfaces(Bspline surfaces in this paper) and their multiresolution representations, this paper presents the algorithm for maintaining the G1 continuity of two multilevel NURBS surfaces and its implementation.

Key words: Bspline wavelet, multilevel NURBS surfaces, G1 continuity

中图分类号: 

  • O241.5
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