论文信息 - Multiscale method based on discontinuous Galerkin methods for homogenization problems

Multiscale method based on discontinuous Galerkin methods for homogenization problems

Abstract We propose a multiscale method for elliptic problems with highly oscillating coefficients based on a coupling of macro and micro methods in the framework of the heterogeneous multiscale method. The macro method, defined on a macroscopic triangulation, aims at recovering the effective (homogenized) solution of an unknown macro model. The unspecified data of this model are computed by micro methods on sampling domains during the macro assembly process. In this Note, we show how to construct such a coupling with a discontinuous macro finite element space. We show that the flux information needed in this formulation in order to impose weak interelement continuity can be recovered from the known micro calculations on the sampling domains. A fully discrete analysis is presented. To cite this article: A. Abdulle, C. R. Acad. Sci. Paris, Ser. I 346 (2008).

Assyr Abdulle | A. Abdulle

[1] A. Bensoussan,et al. Asymptotic analysis for periodic structures , 1979 .

[2] Assyr Abdulle,et al. On A Priori Error Analysis of Fully Discrete Heterogeneous Multiscale FEM , 2005, Multiscale Model. Simul..

[3] E Weinan,et al. The Heterogeneous Multiscale Method Based on the Discontinuous Galerkin Method for Hyperbolic and Parabolic Problems , 2005, Multiscale Model. Simul..

[4] Assyr Abdulle,et al. Heterogeneous Multiscale FEM for Diffusion Problems on Rough Surfaces , 2005, Multiscale Model. Simul..

[5] J. Banavar,et al. The Heterogeneous Multi-Scale Method , 1992 .

[6] Bjørn-Ove Heimsund,et al. Multiscale Discontinuous Galerkin Methods for Elliptic Problems with Multiple Scales , 2005 .

[7] D. Arnold. An Interior Penalty Finite Element Method with Discontinuous Elements , 1982 .

[8] E. Weinan,et al. Analysis of the heterogeneous multiscale method for elliptic homogenization problems , 2004 .

[9] E Weinan,et al. The Heterognous Multiscale Methods , 2003 .

[10] E. Giorgi,et al. Sulla convergenza degli integrali dell''energia per operatori ellittici del secondo ordine , 1973 .

[11] Douglas N. Arnold,et al. Unified Analysis of Discontinuous Galerkin Methods for Elliptic Problems , 2001, SIAM J. Numer. Anal..

[12] E Weinan,et al. Finite difference heterogeneous multi-scale method for homogenization problems , 2003 .