Dyadic T-mesh subdivision
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Publication:2802375
DOI10.1145/2766972zbMath1334.68281OpenAlexW1984393693MaRDI QIDQ2802375
J. Bisceglio, Denis Zorin, Denis Kovacs
Publication date: 25 April 2016
Published in: ACM Transactions on Graphics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1145/2766972
Numerical computation using splines (65D07) Computing methodologies for image processing (68U10) Numerical aspects of computer graphics, image analysis, and computational geometry (65D18)
Related Items (3)
A fast T-spline fitting method based on efficient region segmentation ⋮ Hybrid non-uniform recursive subdivision with improved convergence rates ⋮ Low degree splines for locally quad-dominant meshes
Cites Work
- Converting an unstructured quadrilateral mesh to a standard T-spline surface
- On linear independence of T-spline blending functions
- Local refinement of analysis-suitable T-splines
- A symmetric, non-uniform, refine and smooth subdivision algorithm for general degree B-splines
- Isogeometric analysis using T-splines
- Linear independence of the T-spline blending functions associated with some particular T-meshes
- Analyzing midpoint subdivision
- Dimensions of spline spaces over T-meshes
- Introduction to the Mathematics of Subdivision Surfaces
- Isogeometric Analysis
- On subdivision schemes generalizing uniform B-spline surfaces of arbitrary degree
- A unified framework for primal/dual quadrilateral subdivision schemes
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