论文信息 - Parallel manipulators and Borel-Bricard problem

Parallel manipulators and Borel-Bricard problem

In this paper we shall discuss connections between some old problems of elementary geometry from the beginning of the 20-th century and geometry of parallel manipulators. Beside of this we would like to demonstrate how dual quaternions give a natural tool for solution of problems connected with spatial motions. In order to give this demonstration a short excursion to the theory of kinematic spaces is necessary. As an application we show, how one problem of such kind can be solved by using computer algebra. At the end we explain how methods of approximate parameterization yield a natural tool for the visualization of trajectories of self-motions of parallel manipulators.

Adolf Karger

[1] Martin Aigner,et al. Evolution-based least-squares fitting using Pythagorean hodograph spline curves , 2007, Comput. Aided Geom. Des..

[2] Adolf Karger,et al. New Self-Motions of Parallel Manipulators , 2008 .

[3] Manfred Husty. E. Borel’s and R. Bricard’s Papers on Displacements with Spherical Paths and their Relevance to Self-motions of Parallel Manipulators , 2000 .

[4] Otto Röschel,et al. Characterisation of Architecturally Shaky Platforms , 1998 .

[5] M. Husty. An algorithm for solving the direct kinematics of general Stewart-Gough platforms , 1996 .

[6] R. Bricard. Leçons de cinématique , 1926 .

[7] Adolf Karger. Architecture singular planar parallel manipulators , 2003 .

[8] Jadran Lenarčič,et al. Advances in Robot Kinematics , 2000 .

[9] Bert Jüttler,et al. A predictor–corrector-type technique for the approximate parameterization of intersection curves , 2007, Applicable Algebra in Engineering, Communication and Computing.

[10] Marco Ceccarelli,et al. International Symposium on History of Machines and Mechanisms : proceedings HMM2000 , 2000 .

[11] Manfred Husty,et al. Kinematik und Robotik , 1997 .