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带G’连续约束的Bezier曲线显式最佳降多阶
  • ISSN号:1003-9775
  • 期刊名称:《计算机辅助设计与图形学学报》
  • 时间:0
  • 分类:TP391[自动化与计算机技术—计算机应用技术;自动化与计算机技术—计算机科学与技术]
  • 作者机构:[1]浙江大学数学系计算机图象图形研究所,杭州310027, [2]浙江大学CAD&CG国家重点实验室,杭州310027
  • 相关基金:国家自然科学基金(60873111,60933007)
作者: 周联[1,2], 王国瑾[1,2]
关键词: BéZIER曲线, 降阶, 几何连续, 矩阵表示, Bezier curves, degree reduction, geometric continuity, matrix representation
中文摘要:

为了克服已有Bezier曲线降阶算法在保G。连续约束条件下仅给出数值解的缺陷,提出一种Bezier曲线在端点处保G’连续的最佳显式降阶算法.在求解以逼近误差为目标函数的最小化问题过程中,首先给出了Bernstein多项式在两端点保高阶几何连续条件下降阶的最佳显式解;其次给出了Bezier曲线在两端点处保G’连续条件下降阶的最佳显式解;最后给出了降阶曲线的控制顶点和逼近误差的2个显式矩阵表示.数值实例结果表明,文中算法比其他算法的精度高、效率高.

英文摘要:

The existing algorithms for multi degree reduction of Bezier curves with G1 constraints only provide numerical solutions. To overcome this flaw, an algorithm for optimal degree reduction of Bezier curves with G1 constraints at the endpoints is presented. By taking the approximation error as the objective function and minimizing this function, the optimal explicit solution to multi-degree reduction of Bernstein polynomials with high-order continuity at the two endpoints is given. And then the optimal explicit solution to multi-degree reduction of B4zier curves with G1 constraints is also given. The control points of the degree reduced curves and the approximation error are derived from two matrix representations respectively. Numerical examples show that the proposed method is more precise and efficient comparing to previous methods.

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期刊信息
  • 《计算机辅助设计与图形学学报》
  • 北大核心期刊(2011版)
  • 主管单位:中国科学技术协会
  • 主办单位:中国计算机学会
  • 主编:鲍虎军
  • 地址:北京2704信箱
  • 邮编:100190
  • 邮箱:jcad@ict.ac.cn
  • 电话:010-62562491
  • 国际标准刊号:ISSN:1003-9775
  • 国内统一刊号:ISSN:11-2925/TP
  • 邮发代号:82-456
  • 获奖情况:
  • 第三届国家期刊奖提名奖
  • 国内外数据库收录:
  • 俄罗斯文摘杂志,荷兰文摘与引文数据库,美国工程索引,英国科学文摘数据库,日本日本科学技术振兴机构数据库,中国中国科技核心期刊,中国北大核心期刊(2004版),中国北大核心期刊(2008版),中国北大核心期刊(2011版),中国北大核心期刊(2014版),中国北大核心期刊(2000版)
  • 被引量:24752