A generalization of rational Bernstein–Bézier curves

This article presents a flexible curve and surface by using an arbitrary choice of polynomial as the basis for blending functions. The curve and surface is a generalization of most well known curves and surfaces. The conditions for various continuities of the curve segments and surface patches at th

In this article we present a computationally efficient subdivision algorithm for the evaluation of generalized Bernstein-Bézier curves. As particular cases we have subdivision algorithms for classical as well as trigonometric Bernstein-Bézier curves.

We prove that if an nth degree rational Bézier curve has a singular point, then it belongs to the two (n -1)th degree rational Bézier curves defined in the (n -1)th step of the de Casteljau algorithm. Moreover, both curves are tangent at the singular point. A procedure to construct Bézier curves wit