✦ LIBER ✦

On subdivision schemes generalizing uniform B-spline surfaces of arbitrary degree

✍ Scribed by Jos Stam

Publisher: Elsevier Science
Year: 2001
Tongue: English
Weight: 556 KB
Volume: 18
Category: Article
ISSN: 0167-8396
DOI: 10.1016/s0167-8396(01)00038-3

No coin nor oath required. For personal study only.

✦ Synopsis

We introduce a new class of subdivision surfaces which generalize uniform tensor product Bspline surfaces of any bi-degree to meshes of arbitrary topology. Surprisingly, this can be done using subdivision rules that involve direct neighbors only. Consequently, our schemes are very easy to implement, regardless of degree. The famous Catmull-Clark scheme is a special case. Similarly we show that triangular box splines of total degree 3m + 1 can be generalized to arbitrary triangulations. Loop subdivision surfaces are a special case when m = 1. Our new schemes should be of interest to the high-end design market where surfaces of bi-degree up to 7 are common.

📜 SIMILAR VOLUMES

A non-stationary subdivision scheme for

A non-stationary subdivision scheme for generalizing trigonometric spline surfaces to arbitrary meshes

✍ M.K. Jena; P. Shunmugaraj; P.C. Das 📂 Article 📅 2003 🏛 Elsevier Science 🌐 English ⚖ 416 KB

We present a non-stationary subdivision scheme for generating surfaces from meshes of arbitrary topology. Surfaces generated by this scheme are tensor product bi-quadratic trigonometric spline surfaces except at the extraordinary points. The scheme can be considered as a adaptation of the Doo-Sabin