Bézier Curves and Surfaces with three Parameters and Extensions in the Triangular Domain

IF 0.3 Q4 MATHEMATICS, APPLIED
Wang Lu, Zhang Guicang
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引用次数: 1

Abstract

To define a new basis function to obtain a basis that can inherit the excellent properties of the traditional B-spline method and Bézier method, global and locality of shape adjustment, and can accurately represent the elliptical arc and circle. Firstly, an optimal standard full positive base, the cut angle algorithm, the 1 C and 2 C continuous proof of the base under the quasi-extended Chebyshev space in this paper. Secondly, the base on the rectangular field to the triangular field to obtain the quasi-cubic triangular Bernstein-Bézier base on the triangular field. Thirdly, this base can accurately represent the elliptic arc and circle, and then gives the base cutting algorithm on the triangular domain, and reverse introduce two conditions under which the quasi-cubic triangular Bernstein-Bézier surfaces are 1 G continuous in surface splicing. After a lot of analysis and examples, the new basis function has excellent properties of traditional methods, and can also flexibly adjust the shape parameters to obtain the required curve surface, which meets the actual industrial design requirements.
三参数bsamizier曲线曲面及其在三角域上的扩展
定义一种新的基函数,得到一种既能继承传统b样条法和bsamzier法的优良性质,又能进行形状调整的全局性和局域性,并能准确表示椭圆圆弧和圆的基函数。本文首先给出了最优标准满正基、切角算法、拟扩展Chebyshev空间下该基的1c和2c连续证明。其次,将矩形场上的基移到三角形场上,得到拟三次三角形的bernstein - bsamzier基在三角形场上。第三,该基基能准确表示椭圆弧和圆,然后给出了三角形域上的基基切割算法,并反向引入了拟三次三角形bernstein - bsamzier曲面在曲面拼接中为1g连续的两个条件。经过大量的分析和算例,新的基函数具有传统方法的优良性能,还可以灵活地调整形状参数以获得所需的曲面,满足实际工业设计要求。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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20 weeks
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