The Fourier Singular Complement Method for the Poisson Problem. Part III: Implementation Issues

Ciarlet, Jr., Patrick, Jung, Beate, Kaddouri, Samir, Labrunie, Simon, Zou, Jun

11 September 2006

This paper is the last part of a three-fold article aimed at some efficient numerical methods for solving the Poisson problem in three-dimensional prismatic and axisymmetric domains. In the first and second parts, the Fourier singular complement method (FSCM) was introduced and analysed for prismatic and axisymmetric domains with reentrant edges, as well as for the axisymmetric domains with sharp conical vertices. In this paper we shall mainly conduct numerical experiments to check and compare the accuracies and efficiencies of FSCM and some other related numerical methods for solving the Poisson problem in the aforementioned domains. In the case of prismatic domains with a reentrant edge, we shall compare the convergence rates of three numerical methods: 3D finite element method using prismatic elements, FSCM, and the 3D finite element method combined with the FSCM. For axisymmetric domains with a non-convex edge or a sharp conical vertex we investigate the convergence rates of the Fourier finite element method (FFEM) and the FSCM, where the FFEM will be implemented on both quasi-uniform meshes and locally graded meshes. The complexities of the considered algorithms are also analysed.

Fourier method

mesh grading

numerical experiments

singular complement method

ddc:510

Eckensingularität

Finite-Elemente-Methode

The Fourier Singular Complement Method for the Poisson Problem. Part III: Implementation Issues

Ciarlet, Jr., Patrick, Jung, Beate, Kaddouri, Samir, Labrunie, Simon, Zou, Jun

11 September 2006

This paper is the last part of a three-fold article aimed at some efficient numerical methods for solving the Poisson problem in three-dimensional prismatic and axisymmetric domains. In the first and second parts, the Fourier singular complement method (FSCM) was introduced and analysed for prismatic and axisymmetric domains with reentrant edges, as well as for the axisymmetric domains with sharp conical vertices. In this paper we shall mainly conduct numerical experiments to check and compare the accuracies and efficiencies of FSCM and some other related numerical methods for solving the Poisson problem in the aforementioned domains. In the case of prismatic domains with a reentrant edge, we shall compare the convergence rates of three numerical methods: 3D finite element method using prismatic elements, FSCM, and the 3D finite element method combined with the FSCM. For axisymmetric domains with a non-convex edge or a sharp conical vertex we investigate the convergence rates of the Fourier finite element method (FFEM) and the FSCM, where the FFEM will be implemented on both quasi-uniform meshes and locally graded meshes. The complexities of the considered algorithms are also analysed.

info:eu-repo/classification/ddc/510

ddc:510

Eckensingularität

Finite-Elemente-Methode

Fourier method

mesh grading

numerical experiments

singular complement method

Realization and comparison of various mesh refinement strategies near edges

Apel, T., Milde, F.

30 October 1998

This paper is concerned with mesh refinement techniques for treating elliptic boundary value problems in domains with re- entrant edges and corners, and focuses on numerical experiments. After a section about the model problem and discretization strategies, their realization in the experimental code FEMPS3D is described. For two representative examples the numerically determined error norms are recorded, and various mesh refinement strategies are compared.

singularities near edges

Fichera corner

finite element methods

convergence

a priori mesh grading algorithms

adaptive mesh

refinement

Poisson's equation

MSC 65N50

MSC 65N30

MSC 35J05

ddc:510

Realization and comparison of various mesh refinement strategies near edges

Apel, T., Milde, F.

30 October 1998

This paper is concerned with mesh refinement techniques for treating elliptic boundary value problems in domains with re- entrant edges and corners, and focuses on numerical experiments. After a section about the model problem and discretization strategies, their realization in the experimental code FEMPS3D is described. For two representative examples the numerically determined error norms are recorded, and various mesh refinement strategies are compared.

info:eu-repo/classification/ddc/510

ddc:510

MSC 65N50, MSC 65N30, MSC 35J05