Abstract
Refinable compactly supported bivariate C 2 quartic and quintic spline function vectors on the four-directional mesh are introduced in this paper to generate matrix-valued templates for approximation and Hermite interpolatory surface subdivision schemes, respectively, for both the √ 2 and 1-to-4 split quadrilateral topological rules. These splines have their full local polynomial preservation orders. In addition, we extend our study to parametric approach and use the symmetric properties of our refinable quintic spline components as a guideline to reduce the number of free parameters in constructing second order C 2 Hermite interpolatory quadrilateral subdivision schemes with precisely six components.
Original language | American English |
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Journal | Journal of Computational and Applied Mathematics |
Volume | 196 |
DOIs | |
State | Published - Nov 15 2006 |
Keywords
- 1-to-4 split topological rule
- Hermite interpolation
- Refinable C 2 -quartic splines
- matrix-valued templates
- parametric approach
- refinable C 2 -quintic splines
- vector subdivisions
- √ 2 topological rule
Disciplines
- Mathematics
- Applied Mathematics
- Analysis