A generalization of the Bernstein-Bézier method

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 paper, subdivision methods for rectangular Be ´zier A rectangular Be ´zier surface of degree n ϫ m can be surfaces are generalized to subdivide a rectangular Be ´zier surface patch of degree n ؋ m into two rectangular Be ´zier sur-represented by face patches of degree n ؋ (m ؉ n), while

We give an interesting generalization of the Bernstein polynomials. We find sufficient and necessary conditions for uniform convergence by the new polynomials, and we generalize the Bernstein theorem.

Generati ng the Bezier poi nts of B-spline curves and surfaces ## Wolfgang B6hm The well-known algorithm by de Boor for calculating a point of a B-spline curve can also be used to produce the B&ier points of a B-spline curve or surface.

The umbral calculus is used to generalize Bernstein polynomials and Bézier curves. This adds great geometric flexibility to these fundamental objects of computer aided geometric design while retaining their basic properties.