On control polygons of Pythagorean hodograph septic curves
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Publication:898946
DOI10.1016/j.cam.2015.09.006zbMath1330.65039OpenAlexW1816142066WikidataQ114202137 ScholiaQ114202137MaRDI QIDQ898946
Ping Yang, Guo-zhao Wang, Zhi-Hao Zheng
Publication date: 21 December 2015
Published in: Journal of Computational and Applied Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.cam.2015.09.006
Related Items (7)
A note on Pythagorean hodograph quartic spiral ⋮ Classification of polynomial minimal surfaces ⋮ Algebraic and geometric characterizations of a class of algebraic-hyperbolic Pythagorean-hodograph curves ⋮ Algebraic and geometric characterizations of a class of planar quartic curves with rational offsets ⋮ Interactive design of cubic IPH spline curves ⋮ Unnamed Item ⋮ Identification of two classes of planar septic Pythagorean hodograph curves
Cites Work
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- \(G^2\) curve design with a pair of pythagorean hodograph quintic spiral segments
- G\(^{2}\) curves composed of planar cubic and Pythagorean hodograph quintic spirals
- The conformal map \(z\to z^ 2\) of the hodograph plane
- Geometric Hermite interpolation with Tschirnhausen cubics
- Planar \(G^2\) curve design with spiral segments.
- Construction of \(C^ 2\) Pythagorean-hodograph interpolating splines by the homotopy method
- Pythagorean-hodograph space curves
- Identification and ``reverse engineering of Pythagorean-hodograph curves
- Constructing acceleration continuous tool paths using Pythagorean hodograph curves
- Hermite interpolation by Pythagorean hodograph curves of degree seven
- Construction and shape analysis of PH quintic Hermite interpolants
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