6533b857fe1ef96bd12b4bb3
RESEARCH PRODUCT
An Approximating-Interpolatory Subdivision Scheme.
Yacine BoumzaidSandrine LanquetinMarc NeveuFrançois Destellesubject
Polynomial generationComputer Science::GraphicsNumerical analysis Computer science[INFO.INFO-GR] Computer Science [cs]/Graphics [cs.GR]Mathematics::Analysis of PDEsSubdivision[ INFO.INFO-GR ] Computer Science [cs]/Graphics [cs.GR]Computer Science::Computational GeometryQuad/triangle SubdivisionQuasi-interpolants[INFO.INFO-GR]Computer Science [cs]/Graphics [cs.GR]description
International audience; In the last decade, study and construction of quad/triangle subdivision schemes have attracted attention. The quad/triangle subdivision starts with a control mesh consisting of both quads and triangles and produces ner and ner meshes with quads and triangles (Fig. 1). Design- ers often want to model certain regions with quad meshes and others with triangle meshes to get better visual qual- ity of subdivision surfaces. Smoothness analysis tools exist for regular quad/triangle vertices. Moreover C1 and C2 quad/triangle schemes (for regular vertices) have been con- structed. But to our knowledge, there are no quad/triangle schemes that uni es approximating and interpolatory sub- division schemes. In this paper we introduce a new subdivision operator that uni es triangular and quadrilateral subdivision schemes. Our new scheme is a generalization of the well known Catmull- Clark and Butterfly subdivision algorithms. We show that in the regular case along the quad/triangle boundary where vertices are shared by two adjacent quads and three adjacent triangles our scheme is C2 everywhere except for ordinary Butterfly where our scheme is C1.
| year | journal | country | edition | language |
|---|---|---|---|---|
| 2011-01-01 |