A formulation for Bézier-type curves

Sections of parametric surfaces defined by equally spaced parameter values can be very unevenly spaced physically. This can cause practical problems when the surface is to be drawn or machined automatically. This paper describes a method for imposing a good parametrization on a curve constructed by

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.

Using the Walsh coincidence theorem, we show in this paper that the shape of the control polygon of a Bézier curve is closely related to the location of the complex roots of the corresponding polynomial. This explains why a convex polynomial over an interval does not necessarily produce a convex con