On the adaptive coupling of FEM and BEM in 2-d-elasticity

Carstensen, Carsten; Funken, Stefan A.; Stephan, Ernst P.

doi:10.1007/s002110050283

Cited by 35 publications

(42 citation statements)

References 23 publications

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“…The efficiency quotients γ h are computed for various numerical examples reported in [5,6,7,8]. From this, the efficiency results of this paper are confirmed; one observes efficiency in practice.…”

Section: Numerical Testssupporting

confidence: 68%

“…The questions of how and where to perform the refinement and whether this is "efficient" (a concept to be defined) is subject of many papers, and we refer, e.g., to [1,14,15,16,17,18,23,24,28,29,30] and the references quoted therein. The framework of adaptive methods, introduced by Eriksson and Johnson [14,15] for finite elements, is studied in [3,4,5,6,7,8] for boundary element methods (BEM) and covers weakly singular and hypersingular integral equations, integral equations for transmission problems, and the coupling of finite elements and boundary elements. However, the questions of efficiency of the adaptive algorithms and the sharpness of the a posteriori error estimates have been studied by numerical experiments only.…”

Section: Introductionmentioning

confidence: 99%

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Efficiency of a posteriori BEM–error estimates for first-kind integral equations on quasi–uniform meshes

Carstensen

1996

Math. Comp.

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Abstract. In the numerical treatment of integral equations of the first kind using boundary element methods (BEM), the author and E. P. Stephan have derived a posteriori error estimates as tools for both reliable computation and self-adaptive mesh refinement. So far, efficiency of those a posteriori error estimates has been indicated by numerical examples in model situations only. This work affirms efficiency by proving the reverse inequality. Based on best approximation, on inverse inequalities and on stability of the discretization, and complementary to our previous work, an abstract approach yields a converse estimate. This estimate proves efficiency of an a posteriori error estimate in the BEM on quasi-uniform meshes for Symm's integral equation, for a hypersingular equation, and for a transmission problem.

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Section: Numerical Testssupporting

confidence: 68%

Section: Introductionmentioning

confidence: 99%

Efficiency of a posteriori BEM–error estimates for first-kind integral equations on quasi–uniform meshes

Carstensen

1996

Math. Comp.

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“…using (16). For the boundary error term e, we remark that e = curl for some ∈ H 1/2 ( ) / C, since e ∈ H −1/2 (div 0, ) (cf.…”

Section: Proof Of Theorem 41mentioning

confidence: 98%

Adaptive FE–BE coupling for an electromagnetic problem in ℝ³—A residual error estimator

Leydecker

Maischak

Stephan

et al. 2010

Math Methods in App Sciences

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We construct a reliable and efficient residual-based local a posteriori error estimator for a Galerkin method coupling finite elements and boundary elements for an eddy current problem in a three-dimensional polyhedral domain. For the proof of the efficiency of the error estimator, we assume that the boundary mesh is quasi-uniform and that the boundary surface and the boundary data satisfy certain smoothness assumptions. The Galerkin method uses lowestorder Nédélec elements in the interior domain and vectorial surface rotations of continuous, piecewise bilinear functions on the boundary. Singular, weakly singular and hypersingular boundary integral operators appearing in the variational formulation show up in terms of the error estimator as well. The estimator is derived from the defect equation using a Helmholtz decomposition and Green's formulas. The decomposed parts of the Galerkin error are approximated by local interpolation operators. Numerical tests underline reliability and efficiency of the residual error estimator.

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“…The residual error estimate is formulated in the L 2 -norm using standard techniques for FE methods, see [11] and techniques for FE/BE coupling methods e.g. [20,12,13,14]. The derived error indicators are used later for the implementation of adaptive algorithms.…”

Section: Residual a Posteriori Error Estimatementioning

confidence: 99%

FE/BE coupling for an acoustic fluid–structure interaction problem. Residual a posteriori error estimates

Domínguez

Stephan

Maischak

2011

Numerical Meth Engineering

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SUMMARYIn this paper we develop an a posteriori error analysis of a coupling of finite elements and boundary elements for a fluid-structure interaction problem in two and three dimensions. This problem is governed by the acoustic and the elastodynamic equations in time-harmonic vibration. Our methods combine integral equations for the exterior fluid and finite element methods for the elastic structure. It is well-known that due to the reduction of the boundary value problem to boundary integral equations the solution is not unique in general. However, due to superposition of various potentials, we consider a boundary integral equation which is uniquely solvable and which avoids the irregular frequencies of the negative Laplacian operator of the interior domain. In this paper, two stable procedures are considered; one is based on the non-symmetric formulation and the other one is based on a symmetric formulation. For both formulations we derive reliable residual a posteriori error estimates. From the estimators we compute local error indicators which allow us to develop an adaptive mesh refinement strategy. For the two dimensional case we perform an adaptive algorithm on triangles and for the three dimensional case we use hanging nodes on hexahedrons. Numerical experiments underline our theoretical results. Copyright c 2000 John Wiley & Sons, Ltd.key words: Coupling of finite elements and boundary elements, fluid-structure interaction problem, residual a posteriori error estimator, adaptive algorithm.

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On the adaptive coupling of FEM and BEM in 2-d-elasticity

Cited by 35 publications

References 23 publications

Efficiency of a posteriori BEM–error estimates for first-kind integral equations on quasi–uniform meshes

Efficiency of a posteriori BEM–error estimates for first-kind integral equations on quasi–uniform meshes

Adaptive FE–BE coupling for an electromagnetic problem in ℝ³—A residual error estimator

FE/BE coupling for an acoustic fluid–structure interaction problem. Residual a posteriori error estimates

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On the adaptive coupling of FEM and BEM in 2-d-elasticity

Cited by 35 publications

References 23 publications

Efficiency of a posteriori BEM–error estimates for first-kind integral equations on quasi–uniform meshes

Efficiency of a posteriori BEM–error estimates for first-kind integral equations on quasi–uniform meshes

Adaptive FE–BE coupling for an electromagnetic problem in ℝ3—A residual error estimator

FE/BE coupling for an acoustic fluid–structure interaction problem. Residual a posteriori error estimates

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Product

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Adaptive FE–BE coupling for an electromagnetic problem in ℝ³—A residual error estimator