Hermite interpolation by triangular cubic patches with small Willmore energy
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Publication:5416438
DOI10.1080/00207160.2013.765559zbMath1291.65040OpenAlexW2047743706MaRDI QIDQ5416438
Publication date: 20 May 2014
Published in: International Journal of Computer Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1080/00207160.2013.765559
Numerical computation using splines (65D07) Numerical interpolation (65D05) Computer-aided design (modeling of curves and surfaces) (65D17)
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Cites Work
- Curvature variation minimizing cubic Hermite interpolants
- Minimal energy spherical splines on Clough-Tocher triangulations for Hermite interpolation
- Planar cubic \(G^{1}\) interpolatory splines with small strain energy
- A third order partial differential equation for isotropic boundary based triangular Bézier surface generation
- Minimal energy surfaces using parametric splines
- Shape preserving interpolation by cubic \(G^{1}\) splines in \({\mathbb{R}^3}\)
- Triangular \(G^{1}\) interpolation by 4-splitting domain triangles
- Geometric Hermite curves with minimum strain energy
- Energy minimization method for scattered data Hermite interpolation
- Spline Functions on Triangulations
- Two Step Time Discretization of Willmore Flow
- Parametric Approximation of Willmore Flow and Related Geometric Evolution Equations
- Computation of open Willmore-type surfaces
- A practical guide to splines.
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