A Class of Rational Quartic Splines and their Local Tensor Product Extensions
Published 2023 View Full Article
- Home
- Publications
- Publication Search
- Publication Details
Title
A Class of Rational Quartic Splines and their Local Tensor Product Extensions
Authors
Keywords
-
Journal
COMPUTER-AIDED DESIGN
Volume 164, Issue -, Pages 103603
Publisher
Elsevier BV
Online
2023-08-01
DOI
10.1016/j.cad.2023.103603
References
Ask authors/readers for more resources
Related references
Note: Only part of the references are listed.- $$C^2$$ Rational Interpolation Splines with Region Control and Image Interpolation Application
- (2021) Zhuo Liu et al. JOURNAL OF MATHEMATICAL IMAGING AND VISION
- A class of blending functions with $C^{\infty }$ smoothness
- (2021) Yuanpeng Zhu NUMERICAL ALGORITHMS
- A class of C1 rational interpolation splines in one and two dimensions with region control
- (2020) Yuanpeng Zhu et al. computational and applied mathematics
- A General Class of C1 Smooth Rational Splines: Application to Construction of Exact Ellipses and Ellipsoids
- (2020) Hendrik Speleers et al. COMPUTER-AIDED DESIGN
- P-Bézier and P-Bspline curves – new representations with proximity control
- (2018) István Kovács et al. COMPUTER AIDED GEOMETRIC DESIGN
- Survey on geometric iterative methods and their applications
- (2018) Hongwei Lin et al. COMPUTER-AIDED DESIGN
- C2 Rational Quartic/Cubic Spline Interpolant with Shape Constraints
- (2018) Yuanpeng Zhu Results in Mathematics
- C2 rational quartic interpolation spline with local shape preserving property
- (2015) Yuanpeng Zhu et al. APPLIED MATHEMATICS LETTERS
- New cubic rational basis with tension shape parameters
- (2015) Yuan-peng Zhu et al. Applied Mathematics-A Journal of Chinese Universities Series B
- Shape preserving $$HC^2$$ H C 2 interpolatory subdivision
- (2015) Davide Lettieri et al. BIT NUMERICAL MATHEMATICS
- Curve construction based on four αβ-Bernstein-like basis functions
- (2015) Yuanpeng Zhu et al. JOURNAL OF COMPUTATIONAL AND APPLIED MATHEMATICS
- Shape preservingC2rational quartic interpolation spline with two parameters
- (2014) Yuanpeng Zhu et al. INTERNATIONAL JOURNAL OF COMPUTER MATHEMATICS
- Rational splines for Hermite interpolation with shape constraints
- (2013) Jean-Louis Merrien et al. COMPUTER AIDED GEOMETRIC DESIGN
- Curve construction based on five trigonometric blending functions
- (2012) Xuli Han et al. BIT NUMERICAL MATHEMATICS
- Curvature-sensitive splines and design with basic curves
- (2012) Kȩstutis Karčiauskas et al. COMPUTER-AIDED DESIGN
- A class of general quartic spline curves with shape parameters
- (2011) Xuli Han COMPUTER AIDED GEOMETRIC DESIGN
- Rational bi-cubic G2 splines for design with basic shapes
- (2011) Kȩstutis Karčiauskas et al. COMPUTER GRAPHICS FORUM
- Modeling with rational biquadratic splines
- (2011) Kȩstutis Karčiauskas et al. COMPUTER-AIDED DESIGN
- Partial shape-preserving splines
- (2011) Qingde Li et al. COMPUTER-AIDED DESIGN
- Rational G2 splines
- (2011) Ke¸stutis Karčiauskas et al. GRAPHICAL MODELS
- Polynomial cubic splines with tension properties
- (2010) P. Costantini et al. COMPUTER AIDED GEOMETRIC DESIGN
- A geometric approach for Hermite subdivision
- (2010) Paolo Costantini et al. NUMERISCHE MATHEMATIK
- Local control of interpolating rational cubic spline curves
- (2009) Qi Duan et al. COMPUTER-AIDED DESIGN
- Curve and surface construction using Hermite subdivision schemes
- (2009) Paolo Costantini et al. JOURNAL OF COMPUTATIONAL AND APPLIED MATHEMATICS
- Convexity-Preserving Piecewise Rational Quartic Interpolation
- (2008) Xuli Han SIAM JOURNAL ON NUMERICAL ANALYSIS
Become a Peeref-certified reviewer
The Peeref Institute provides free reviewer training that teaches the core competencies of the academic peer review process.
Get StartedAsk a Question. Answer a Question.
Quickly pose questions to the entire community. Debate answers and get clarity on the most important issues facing researchers.
Get Started