Anisotropic mesh refinement for singularly perturbed reaction diffusion problems

Apel, Th., Lube, G.

30 October 1998

The paper is concerned with the finite element resolution of layers appearing in singularly perturbed problems. A special anisotropic grid of Shishkin type is constructed for reaction diffusion problems. Estimates of the finite element error in the energy norm are derived for two methods, namely the standard Galerkin method and a stabilized Galerkin method. The estimates are uniformly valid with respect to the (small) diffusion parameter. One ingredient is a pointwise description of derivatives of the continuous solution. A numerical example supports the result. Another key ingredient for the error analysis is a refined estimate for (higher) derivatives of the interpolation error. The assumptions on admissible anisotropic finite elements are formulated in terms of geometrical conditions for triangles and tetrahedra. The application of these estimates is not restricted to the special problem considered in this paper.

elliptic boundary value problems

Galerkin finite element methods

anisotropic mesh refinement

MSC 65N30

MSC 65N50

MSC 35J25

ddc:510

Coupling Methods for Interior Penalty Discontinuous Galerkin Finite Element Methods and Boundary Element Methods

Of, Günther, Rodin, Gregory J., Steinbach, Olaf, Taus, Matthias

19 October 2012

This paper presents three new coupling methods for interior penalty discontinuous Galerkin finite element methods and boundary element methods. The new methods allow one to use discontinuous basis functions on the interface between the subdomains represented by the finite element and boundary element methods. This feature is particularly important when discontinuous Galerkin finite element methods are used. Error and stability analysis is presented for some of the methods. Numerical examples suggest that all three methods exhibit very similar convergence properties, consistent with available theoretical results.

Kopplung

Randelementmethode

Coupling

Boundary Element Methods

ddc:518

Diskontinuierliche Galerkin-Methode

Randelemente-Methode

Anisotropic mesh refinement in stabilized Galerkin methods

Apel, Thomas, Lube, Gert

30 October 1998

The numerical solution of the convection-diffusion-reaction problem is considered in two and three dimensions. A stabilized finite element method of Galerkin/Least squares type accomodates diffusion-dominated as well as convection- and/or reaction- dominated situations. The resolution of boundary layers occuring in the singularly perturbed case is accomplished using anisotropic mesh refinement in boundary layer regions. In this paper, the standard analysis of the stabilized Galerkin method on isotropic meshes is extended to more general meshes with boundary layer refinement. Simplicial Lagrangian elements of arbitrary order are used.

elliptic boundary value problems

Galerkin finite element methods

anisotropic mesh refinement

MSC 65N30

MSC 65N50

MSC 35J25

ddc:510

ITERATIVE SOLVERS FOR DISCONTINUOUS GALERKIN FINITE ELEMENT METHODS

SINGH, ONKAR DEEP

06 October 2004

No description available.

Engineering, Mechanical

DG

Interior penalty methdos

GMRES

CG

ILU preconditioner

Aztec

SPOOLES

Anisotropic mesh refinement in stabilized Galerkin methods

Apel, Thomas, Lube, Gert

30 October 1998

The numerical solution of the convection-diffusion-reaction problem is considered in two and three dimensions. A stabilized finite element method of Galerkin/Least squares type accomodates diffusion-dominated as well as convection- and/or reaction- dominated situations. The resolution of boundary layers occuring in the singularly perturbed case is accomplished using anisotropic mesh refinement in boundary layer regions. In this paper, the standard analysis of the stabilized Galerkin method on isotropic meshes is extended to more general meshes with boundary layer refinement. Simplicial Lagrangian elements of arbitrary order are used.

info:eu-repo/classification/ddc/510

ddc:510

Anisotropic mesh refinement for singularly perturbed reaction diffusion problems

Apel, Th., Lube, G.

30 October 1998

The paper is concerned with the finite element resolution of layers appearing in singularly perturbed problems. A special anisotropic grid of Shishkin type is constructed for reaction diffusion problems. Estimates of the finite element error in the energy norm are derived for two methods, namely the standard Galerkin method and a stabilized Galerkin method. The estimates are uniformly valid with respect to the (small) diffusion parameter. One ingredient is a pointwise description of derivatives of the continuous solution. A numerical example supports the result. Another key ingredient for the error analysis is a refined estimate for (higher) derivatives of the interpolation error. The assumptions on admissible anisotropic finite elements are formulated in terms of geometrical conditions for triangles and tetrahedra. The application of these estimates is not restricted to the special problem considered in this paper.

info:eu-repo/classification/ddc/510

ddc:510

elliptic boundary value problems

Galerkin finite element methods

anisotropic mesh refinement

MSC 65N30

MSC 65N50

MSC 35J25

Coupling Methods for Interior Penalty Discontinuous Galerkin Finite Element Methods and Boundary Element Methods

Of, Günther, Rodin, Gregory J., Steinbach, Olaf, Taus, Matthias

19 October 2012

This paper presents three new coupling methods for interior penalty discontinuous Galerkin finite element methods and boundary element methods. The new methods allow one to use discontinuous basis functions on the interface between the subdomains represented by the finite element and boundary element methods. This feature is particularly important when discontinuous Galerkin finite element methods are used. Error and stability analysis is presented for some of the methods. Numerical examples suggest that all three methods exhibit very similar convergence properties, consistent with available theoretical results.:1. Introduction 2. Model Problem and Background 3. New Coupling Methods 4. Stability and Error Analysis 5. Numerical Examples 6. Summary A. Appendix

info:eu-repo/classification/ddc/518

ddc:518

Kopplung, Randelementmethode