Blossom (functional)

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 $\mathcal{B}[f],$ is completely characterised by the three properties:

It is a symmetric function of its arguments:

\mathcal{B}[f](u_1,\dots,u_d) = \mathcal{B}[f]\big(\pi(u_1,\dots,u_d)\big),\,

(where π is any permutation of its arguments).

It is affine in each of its arguments:

\mathcal{B}[f](\alpha u + \beta v,\dots) = \alpha\mathcal{B}[f](u,\dots) + \beta\mathcal{B}[f](v,\dots),\text{ when }\alpha + \beta = 1.\,

It satisfies the diagonal property:

\mathcal{B}[f](u,\dots,u) = f(u).\,

References

Ramshaw, Lyle (1987). "Blossoming: A Connect-the-Dots Approach to Splines". Digital Systems Research Center. Retrieved 2006-06-28.

Casteljau, Paul de Faget de (1992). Larry L. Schumaker; Tom Lyche, eds. "Mathematical methods in computer aided geometric design II". Academic Press Professional, Inc. ISBN 978-0-1-2460510-7. |chapter= ignored (help)

Farin, Gerald (2001). Curves and Surfaces for CAGD: A Practical Guide (fifth ed.). Morgan Kaufmann. ISBN 1-55860-737-4.