De Casteljau algorithm and degree elevation of Bézier and NURBS curves/surfaces are two important techniques in computer aided geometric design. This paper presents the de Casteljau algorithm and degree elevation...De Casteljau algorithm and degree elevation of Bézier and NURBS curves/surfaces are two important techniques in computer aided geometric design. This paper presents the de Casteljau algorithm and degree elevation of toric surface patches, which include tensor product and triangular rational Bézier surfaces as special cases. Some representative examples of toric surface patches with common shapes are illustrated to verify these two algorithms. Moreover, the authors also apply the degree elevation of toric surface patches to isogeometric analysis. And two more examples show the effectiveness of proposed method.展开更多
de Casteljau算法可以递推地定义一条具有限个控制顶点的Bzier曲线,在此基础上文中提出了基于de Casteljau算法的Poisson细分曲线逼近算法,Poisson曲线完全具备了Bzier曲线的重要性质,并且比Bzier曲线有更广泛的应用范围。最后还...de Casteljau算法可以递推地定义一条具有限个控制顶点的Bzier曲线,在此基础上文中提出了基于de Casteljau算法的Poisson细分曲线逼近算法,Poisson曲线完全具备了Bzier曲线的重要性质,并且比Bzier曲线有更广泛的应用范围。最后还给出了n阶Poisson曲线的细分。展开更多
基金supported by the National Natural Science Foundation of China under Grant Nos.11671068 and 11801053。
文摘De Casteljau algorithm and degree elevation of Bézier and NURBS curves/surfaces are two important techniques in computer aided geometric design. This paper presents the de Casteljau algorithm and degree elevation of toric surface patches, which include tensor product and triangular rational Bézier surfaces as special cases. Some representative examples of toric surface patches with common shapes are illustrated to verify these two algorithms. Moreover, the authors also apply the degree elevation of toric surface patches to isogeometric analysis. And two more examples show the effectiveness of proposed method.
基金Supported by the National Natural Science Foundation of China under Grant No.60473130(国家自然科学基金)the National Basic Research Program of China under Grant No.2004CB318000(国家重点基础研究发展计划(973))