The heterogeneous multiscale finite element method for elliptic homogenization problems in perforated domains

A direct numerical solution of the multiple scale problems is difficult even with modern supercomputers. The In this paper, we study a multiscale finite element method for solving a class of elliptic problems arising from composite materials major difficulty of direct solutions is the scale of comp

The coupling of the Sobolev space gradient method and the finite element method is developed. The Sobolev space gradient method reduces the solution of a quasilinear elliptic problem to a sequence of linear Poisson equations. These equations can be solved numerically by an appropriate finite element

Engineering applications frequently require the numerical solution of elliptic boundary value problems in irregularly shaped domains. For smooth problems, spectral element methods have proved very successful, since they can accommodate fairly complicated geometries while retaining a rapid rate of co

This paper is concerned with a specific finite element strategy for solving elliptic boundary value problems in domains with corners and edges. First, the anisotropic singular behaviour of the solution is described. Then the finite element method with anisotropic, graded meshes and piecewise linear