Selective knot insertion for symmetric, non-uniform refine and smooth B-spline subdivision
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Publication:625202
DOI10.1016/j.cagd.2008.11.002zbMath1205.65046OpenAlexW1976430230WikidataQ59751207 ScholiaQ59751207MaRDI QIDQ625202
Neil A. Dodgson, Thomas J. Cashman, Malcolm A. Sabin
Publication date: 15 February 2011
Published in: Computer Aided Geometric Design (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.cagd.2008.11.002
Related Items (3)
Conversion of trimmed NURBS surfaces to Catmull-Clark subdivision surfaces ⋮ L-system specification of knot-insertion rules for non-uniform B-spline subdivision ⋮ Polynomial-based non-uniform interpolatory subdivision with features control
Cites Work
- Non-uniform subdivision for B-splines of arbitrary degree
- A symmetric, non-uniform, refine and smooth subdivision algorithm for general degree B-splines
- Nonuniform corner cutting
- Blossoming and knot insertion algorithms for B-spline curves
- Blossoms are polar forms
- On the efficiency of knot insertion algorithms
- Smoothness of subdivision surfaces at extraordinary points
- A Theoretical Development for the Computer Generation and Display of Piecewise Polynomial Surfaces
- Non-uniform B-Spline Subdivision Using Refine and Smooth
- On subdivision schemes generalizing uniform B-spline surfaces of arbitrary degree
- A unified framework for primal/dual quadrilateral subdivision schemes
- A subdivision scheme for surfaces of revolution
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