Two-scale FEM for homogenization problems
Open Access
- 1 July 2002
- journal article
- research article
- Published by EDP Sciences in ESAIM: Mathematical Modelling and Numerical Analysis
- Vol. 36 (4) , 537-572
- https://doi.org/10.1051/m2an:2002025
Abstract
The convergence of a two-scale FEM for elliptic problems in divergence form with coefficients and geometries oscillating at length scale ε << 1 is analyzed. Full elliptic regularity independent of ε is shown when the solution is viewed as mapping from the slow into the fast scale. Two-scale FE spaces which are able to resolve the ε scale of the solution with work independent of ε and without analytical homogenization are introduced. Robust in ε error estimates for the two-scale FE spaces are proved. Numerical experiments confirm the theoretical analysis.Keywords
This publication has 6 references indexed in Scilit:
- Finite Dimensional Approximations for Elliptic Problems with Rapidly Oscillating CoefficientsPublished by Springer Nature ,2002
- Generalized p-FEM in homogenizationNumerische Mathematik, 2000
- Convergence of a multiscale finite element method for elliptic problems with rapidly oscillating coefficientsMathematics of Computation, 1999
- Homogenization of Reticulated StructuresPublished by Springer Nature ,1999
- A Multiscale Finite Element Method for Elliptic Problems in Composite Materials and Porous MediaJournal of Computational Physics, 1997
- An Approach for Constructing Families of Homogenized Equations for Periodic Media. I: An Integral Representation and its ConsequencesSIAM Journal on Mathematical Analysis, 1991