BEAUGENDRE, Héloïse; ERN, Alexandre; HUBERSON, Serge

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BEAUGENDRE, Héloïse
Institut de Mathématiques de Bordeaux [IMB]
Modélisation, contrôle et calcul [MC2]

ERN, Alexandre
Centre d'Enseignement et de Recherche en Mathématiques, Informatique et Calcul Scientifique [CERMICS]
Centre d'Enseignement et de Recherche en Mathématiques et Calcul Scientifique [CERMICS]

HUBERSON, Serge
Laboratoire d'études aérodynamiques [UMR 6609] [LEA [Poitiers]]

Language

Communication dans un congrès

This item was published in

ICCFD5, 2008-07-07, Séoul. 2008

English Abstract

Combining finite element together with particle methods provide one of the best compromise for solving transport problem in porous media. Saturated or non-saturated flows are determined by boundary condition and the media permeability.\footnote{This work was partially supported by GDR MOMAS-CNRS} For real terrain, permeability can consist in various almost constant and imbricated zones with complex shapes. Thus, it is of some interest that the boundary between two adjacent zones coincides with a natural mesh interface and that each element is entirely contains in one such zone. Beside this, solving transport equation by means of particle methods offers two distinctive advantages. The method is unconditionally stable when applied to a pure convective equation, and it does not contain any numerical diffusion if the particle trajectories are correctly computed. Therefore the combination of finite elements and particle method appears to be a straightforward application of the principle : "the right method at the right place".Read less <

English Keywords

finite element

particles methods

transport-dispersion in porous media

Origin

Hal imported

Collections

Institut de Mathématiques de Bordeaux (IMB) - UMR 5251