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| Reference : ALE Methods for Determining Stationary Solutions Metal Forming Processes |
| Scientific congresses and symposiums : Paper published in a book | |||
| Engineering, computing & technology : Mechanical engineering | |||
| http://hdl.handle.net/2268/33193 | |||
| ALE Methods for Determining Stationary Solutions Metal Forming Processes | |
| English | |
Boman, Romain  [Université de Liège - ULg > Département d'aérospatiale et mécanique > LTAS-Mécanique numérique non linéaire >] | |
| Ponthot, Jean-Philippe [Université de Liège - ULg > Département d'aérospatiale et mécanique > LTAS-Mécanique numérique non linéaire >] | |
| Sep-2000 | |
| Proceedings of ECCOMAS 2000/COMPLAS VI, European Congress on Computational Methods in Applied Sciences and Engineering | |
| Oñate, E. | |
| Bugeda, G. | |
| Suárez, B. | |
| Yes | |
| International | |
| ECCOMAS 2000/COMPLAS VI, European Congress on Computational Methods in Applied Sciences and Engineering | |
| 11-14 September 2000 | |
| Barcelona | |
| Spain | |
| [en] ALE methods ; stationary solutions ; metal forming processes | |
| [en] In this paper, two efficient convection algorithms are briefly presented in order
to update the values stored at the Gauss point during the Eulerian step of an Arbitrary Lagrangian Eulerian computation in solid mechanics. They are based on the finite volume method and on the Streamline Upwind Petrov Galerkin method. Two applications are presented : a cold rolling simulation and a drawbead simulation. | |
| Researchers ; Professionals ; Students | |
| http://hdl.handle.net/2268/33193 |
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