scientific article; zbMATH DE number 822252
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Publication:4856393
zbMath0835.65016MaRDI QIDQ4856393
Publication date: 20 December 1995
Title: zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Hermite interpolationoffset curvegeometric algorithmrational Pythagorean hodograph curvesTschirnhausen quartics
Related Items (13)
Sparse Pythagorean hodograph curves ⋮ A Laguerre geometric approach to rational offsets ⋮ Interpolation of \(G^1\) Hermite data by \(C^1\) cubic-like sparse Pythagorean hodograph splines ⋮ An involute spiral that matches \(G^{2}\) Hermite data in the plane ⋮ Matching admissible \(G^2\) Hermite data by a biarc-based subdivision scheme ⋮ Pythagorean hodograph spline spirals that match \(G^3\) Hermite data from circles ⋮ Real-time CNC interpolators for Pythagorean-hodograph curves ⋮ Pipe surfaces with rational spine curve are rational ⋮ A two-point \(G^1\) Hermite interpolating family of spirals ⋮ Construction and shape analysis of PH quintic Hermite interpolants ⋮ Transition between concentric or tangent circles with a single segment of \(G^2\) PH quintic curve ⋮ Pythagorean-hodograph ovals of constant width ⋮ Topological criterion for selection of quintic pythagorean-hodograph Hermite interpolants
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