Planar quartic \(\boldsymbol{G}^2\) Hermite interpolation for curve modeling
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Publication:6563909
DOI10.1016/j.cagd.2024.102303MaRDI QIDQ6563909
Li-Zheng Lu, Angyan Li, Kesheng Wang
Publication date: 28 June 2024
Published in: Computer Aided Geometric Design (Search for Journal in Brave)
Cites Work
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- Planar quintic \(G^2\) Hermite interpolation with minimum strain energy
- Curvature variation minimizing cubic Hermite interpolants
- \(G^{2}\) Hermite interpolation with circular precision
- Planar cubic \(G^{1}\) interpolatory splines with small strain energy
- The best \(G^{1}\) cubic and \(G^{2}\) quartic Bézier approximations of circular arcs
- A local fitting algorithm for converting planar curves to B-splines
- High accuracy geometric Hermite interpolation
- A parametric quartic spline interpolant to position, tangent and curvature
- Singular cases of planar and spatial \(C^1\) Hermite interpolation problems based on quintic Pythagorean-hodograph curves
- Geometric Hermite curves with minimum strain energy
- Curve design with more general planar Pythagorean-hodograph quintic spiral segments
- C-shaped \(G^2\) Hermite interpolation by rational cubic Bézier curve with conic precision
- Geometric Hermite interpolation -- in memoriam Josef Hoschek
- Planning Algorithms
- Geometric Hermite interpolation for space curves
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