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Motion design with Euler–Rodrigues frames of quintic Pythagorean-hodograph curves

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  • Krajnc, Marjeta
  • Vitrih, Vito

Abstract

The paper presents an interpolation scheme for G1 Hermite motion data, i.e., interpolation of data points and rotations at the points, with spatial quintic Pythagorean-hodograph curves so that the Euler–Rodrigues frame of the curve coincides with the rotations at the points. The interpolant is expressed in a closed form with three free parameters, which are computed based on minimizing the rotations of the normal plane vectors around the tangent and on controlling the length of the curve. The proposed choice of parameters is supported with the asymptotic analysis. The approximation error is of order four and the Euler–Rodrigues frame differs from the ideal rotation minimizing frame with the order three. The scheme is used for rigid body motions and swept surface construction.

Suggested Citation

  • Krajnc, Marjeta & Vitrih, Vito, 2012. "Motion design with Euler–Rodrigues frames of quintic Pythagorean-hodograph curves," Mathematics and Computers in Simulation (MATCOM), Elsevier, vol. 82(9), pages 1696-1711.
    • Handle: RePEc:eee:matcom:v:82:y:2012:i:9:p:1696-1711
    DOI: 10.1016/j.matcom.2012.04.003
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    Cited by:

    1. Farouki, Rida T., 2016. "Rational rotation-minimizing frames—Recent advances and open problems," Applied Mathematics and Computation, Elsevier, vol. 272(P1), pages 80-91.

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