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A Primer on Bézier Curves – an open source online book explaining Bézier curves and associated graphics algorithms, with interactive graphics; Cubic Bezier Curves – Under the Hood (video) – video showing how computers render a cubic Bézier curve, by Peter Nowell; From Bézier to Bernstein Feature Column from American Mathematical Society
In the mathematical field of numerical analysis, De Casteljau's algorithm is a recursive method to evaluate polynomials in Bernstein form or Bézier curves, named after its inventor Paul de Casteljau.
Pierre Étienne Bézier (1 September 1910 – 25 November 1999; [pjɛʁ etjɛn bezje]) was a French engineer and one of the founders of the fields of solid, geometric and physical modelling as well as in the field of representing curves, especially in computer-aided design and manufacturing systems. [1]
Using the above points, we say that since the Bézier curve B is the limit of these polygons as r goes to , it will have fewer intersections with a given plane than R i for all i, and in particular fewer intersections that the original control polygon R. This is the statement of the variation diminishing property.
Béziergon – The red béziergon passes through the blue vertices, the green points are control points that determine the shape of the connecting Bézier curves. In geometric modelling and in computer graphics, a composite Bézier curve or Bézier spline is a spline made out of Bézier curves that is at least continuous. In other words, a ...
The smooth portions of a curve are then approximated with a Bézier curve fitting procedure. Successive division may be used. Such a fitting procedure tries to fit the curve with a single cubic curve; if the fit is acceptable, then the procedure stops. Otherwise, it selects some advantageous point along the curve and breaks the curve into two ...
As with Bézier curves, a Bézier surface is defined by a set of control points. Similar to interpolation in many respects, a key difference is that the surface does not, in general, pass through the central control points; rather, it is "stretched" toward them as though each were an attractive force.
In numerical analysis, a blossom is a functional that can be applied to any polynomial, but is mostly used for Bézier and spline curves and surfaces. The blossom of a polynomial ƒ , often denoted B [ f ] , {\displaystyle {\mathcal {B}}[f],} is completely characterised by the three properties: