CHINESTA, Francisco; AMMAR, Amine; CUETO, Elías

doi:10.1002/nme.2794

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CHINESTA, Francisco
Institut de Recherche en Génie Civil et Mécanique [GeM]

AMMAR, Amine
Laboratoire Angevin de Mécanique, Procédés et InnovAtion [LAMPA]

CUETO, Elías
Aragón Institute of Engineering Research [Zaragoza] [I3A]

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International Journal for Numerical Methods in Engineering. 2010, vol. 83, n° 8-9, p. 1114-1132

Wiley

Résumé en anglais

In this paper the coupling of a parabolic model with a system of local kinetic equations is analyzed. A space time separated representation is proposed for the global model (this is simply the radial approximation proposed by Pierre Ladeveze in the LATIN framework (Non-linear Computational Structural Mechanics. Springer: New York, 1999)). The originality of the present work concerns the treatment of the local problem, that is first globalized (in space and time) and then fully globalized by introducing a new coordinate related to the different species involved in the kinetic model. Thanks to the non-incremental nature of both discrete descriptions (the local and the global one) the coupling is quite simple and no special difficulties are encountered by using heterogeneous time integrations.< Réduire

Mots clés en anglais

Proper Generalized Decompositions

Separated representations

Finite sums decomposition

Multidimensional models

Model reduction

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Proper Generalized Decomposition of Multiscale Models

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