Hermite interpolation by rational \(G^K\) motions of low degree

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Publication:1931475

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DOI10.1016/j.cam.2012.08.021zbMath1255.65033OpenAlexW1977352091MaRDI QIDQ1931475

Vito Vitrih, Marjeta Krajnc, Bert Jüttler, Emil Žagar, Gašper Jaklič

Publication date: 14 January 2013

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.2012.08.021

zbMATH Keywords

geometric continuity geometric interpolation motion design rational spline motion

Mathematics Subject Classification ID

Numerical interpolation (65D05)

Related Items (11)

\( C^1\) and \(G^1\) continuous rational motions using a conformal geometric algebra ⋮ Bézier motions with end-constraints on speed ⋮ \(C^1\) interpolation by rational biarcs with rational rotation minimizing directed frames ⋮ Hermite \(G^1\) rational spline motion of degree six ⋮ Fitting a planar quadratic slerp motion ⋮ On \(\mathcal{C}^2\) rational motions of degree six ⋮ Construction of \(G^{3}\) rational motion of degree eight ⋮ \(C^{1}\) and \(C^{2}\) interpolation of orientation data along spatial Pythagorean-hodograph curves using rational adapted spline frames ⋮ \(G^{1}\) motion interpolation using cubic PH biarcs with prescribed length ⋮ Geometric interpolation of ER frames with \(G^2\) Pythagorean-hodograph curves of degree 7 ⋮ Unnamed Item

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