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

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 … Show more

“…In many applications, good shape design should remove unnecessary cusps and inflection points; convexity is also an indispensable element in shape design. The determination conditions of the shape features are very important for the shape control and adjustment of the curve with parameters [22][23][24][25][26][27]. For example, these geometric properties directly affect the dynamic performance of the shape design, the complexity of the algorithm, and the operability of the processing.…”

The Shape Analysis of DTB-like and DT B-spline-like Curves

“…In many applications, good shape design should remove unnecessary cusps and inflection points; convexity is also an indispensable element in shape design. The determination conditions of the shape features are very important for the shape control and adjustment of the curve with parameters [22][23][24][25][26][27]. For example, these geometric properties directly affect the dynamic performance of the shape design, the complexity of the algorithm, and the operability of the processing.…”

The Shape Analysis of DTB-like and DT B-spline-like Curves