Interpolation of \(G^1\) Hermite data by \(C^1\) cubic-like sparse Pythagorean hodograph splines
From MaRDI portal
Publication:2180621
DOI10.1016/j.cagd.2020.101838zbMath1505.65041OpenAlexW3017216339WikidataQ114202319 ScholiaQ114202319MaRDI QIDQ2180621
Carolina Vittoria Beccari, Marie-Laurence Mazure, Rachid Ait-Haddou
Publication date: 14 May 2020
Published in: Computer Aided Geometric Design (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.cagd.2020.101838
Numerical computation using splines (65D07) Spline approximation (41A15) Computer-aided design (modeling of curves and surfaces) (65D17)
Related Items (1)
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Approximation by Müntz spaces on positive intervals
- The geometry of Tchebycheffian splines
- On a new criterion to decide whether a spline space can be used for design
- A control polygon scheme for design of planar \(C^2\) PH quintic spline curves
- Pythagorean-hodograph ovals of constant width
- Topological criterion for selection of quintic pythagorean-hodograph Hermite interpolants
- Pythagorean-hodograph cycloidal curves
- Pythagorean-hodograph curves. Algebra and geometry inseparable
- A recurrence relation for Chebyshevian B-splines
- Vandermonde type determinants and blossoming
- Blossoming: A geometrical approach
- Polynomial Chebyshev splines
- Chebyshev spaces with polynomial blossoms
- Design of rational cam profiles with Pythagorean-hodograph curves.
- Geometric Hermite interpolation with Tschirnhausen cubics
- Chebyshev splines and shape parameters
- Blossoms and optimal bases
- Geometric characteristics of planar quintic Pythagorean-hodograph curves
- Planar Pythagorean-hodograph B-spline curves
- Curve design with rational Pythagorean-hodograph curves
- Planar \(C^1\) Hermite interpolation with uniform and non-uniform TC-biarcs
- Gelfond-Bézier curves
- Chebyshev blossoming in Müntz spaces: toward shaping with Young diagrams
- Bernstein bases in Müntz spaces
- Existence of Pythagorean-hodograph quintic interpolants to spatial \(G^1\) Hermite data with prescribed arc lengths
- New developments in theory, algorithms, and applications for Pythagorean-hodograph curves
- Sparse Pythagorean hodograph curves
- Dimension elevation in Müntz spaces: a new emergence of the Müntz condition
- Hermite interpolation by Pythagorean hodograph curves of degree seven
- $C^2$ Hermite interpolation by Pythagorean Hodograph space curves
- On interpolation by Planar cubic $G^2$ pythagorean-hodograph spline curves
- Nested sequences of Chebyshev spaces and shape parameters
- Hermite Interpolation by Pythagorean Hodograph Quintics
- An Interpolation Curve Using a Spline in Tension
- Generalized Bernstein polynomials
- Chebyshev splines beyond total positivity
This page was built for publication: Interpolation of \(G^1\) Hermite data by \(C^1\) cubic-like sparse Pythagorean hodograph splines
