论文信息 - Sparse Two-Scale FEM for Homogenization Problems

Sparse Two-Scale FEM for Homogenization Problems

We analyze two-scale Finite Element Methods for the numerical solution of elliptic homogenization problems with coefficients oscillating at a small length scale ε≪1. Based on a refined two-scale regularity on the solutions, two-scale tensor product FE spaces are introduced and error estimates which are robust (i.e., independent of ε) are given. We show that under additional two-scale regularity assumptions on the solution, resolution of the fine scale is possible with substantially fewer degrees of freedom and the two-scale full tensor product spaces can be “thinned out” by means of sparse interpolation preserving at the same time the error estimates.

Ana-Maria Matache | A. Matache

[1] P. Donato,et al. An introduction to homogenization , 2000 .

[2] A. Aziz. The Mathematical Foundations of the Finite Element Method with Applications to Partial Differential Equations , 1972 .

[3] C. Schwab,et al. Two-scale FEM for homogenization problems , 2002 .

[4] I. Babuska,et al. Finite Element Analysis , 2021 .

[5] Ivo Babuska,et al. Generalized p-FEM in homogenization , 2000, Numerische Mathematik.

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

[7] C. Schwab,et al. High Order Generalized FEM For Lattice Materials , 1999 .

[8] A.-M. Ana-Maria Matache. Spectral and p-Finite Elements for problems with microstructure , 2000 .

[9] C. Schwab,et al. Homogenization via p -FEM for problems with microstructure , 2000 .