Projection Continuation for Minimal Coordinate Set Dynamics of Constrained Systems
| Zhou, Ping | ||
| Zanoni, Andrea | ||
| Masarati, Pierangelo | ||
| 2022-02-11T11:27:48Z | ||
| 2022-02-11T11:27:48Z | ||
| 2021 | ||
AbstractThe formulation of constrained system dynamics using coordinate projection onto a subspace locally tangent to the constraint manifold is revisited using the QR factorization of the constraint Jacobian matrix to extract a suitable subspace, and integrating the evolution of the QR factorization along with that of the constraint Jacobian matrix, as the solution evolves. A true continuation algorithm is thus proposed for the subspace of independent coordinates, which does not visibly affect the quality of the solution, but avoids the artificial algorithmic discontinuities in the generalized velocities that would result from arbitrary reparameterization of the coordinate set. This property is exemplified by solving simple multi-degree-of-freedom problems with and without the proposed continuation | ||
| http://hdl.handle.net/10890/16819 | ||
| en | ||
| Projection Continuation for Minimal Coordinate Set Dynamics of Constrained Systems | ||
| Konferenciacikk | ||
| Open access | ||
| Budapest University of Technology and Economics | ||
| 2021.12.12-2021.12.15 | ||
| Online | ||
| ECCOMAS Thematic Conference on Multibody Dynamics | ||
| 2021 | ||
| 978-963-421-870-25 | ||
| Budapest University of Technology and Economics | ||
| Budapest, HU | ||
| Proceedings of the 10th ECCOMAS Thematic Conference on MULTIBODY DYNAMICS | ||
| Műszaki Mechanikai Tanszék | ||
| 184 | ||
| 10.3311/ECCOMASMBD2021-166 | ||
| 196 | ||
| Minimal Coordinate Set | ||
| Coordinate Projection | ||
| Automatic Coordinate Reduction | ||
| QR Factorization | ||
| Konferencia kiadvány | ||
| Budapesti Műszaki és Gazdaságtudományi Egyetem |
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