Hierarchical Preconditioners and Adaptivity for Kirchhoff-Plates

Meyer, Arnd

17 September 2008

We describe a preconditioner for the Kirchhoff plate equation for use of Bogner-Fox-Schmidt finite elements based on a hierarchical technique.

Kirchhoff-plate equation

ddc:510

Deformation

Dünne Schale

Finite-Elemente-Methode

Plattengleichung

Explicit models for flexural edge and interfacial waves in thin elastic plates

Kossovich, Elena

January 2011

In the thesis explicit dual parabolic-elliptic models are constructed for the Konenkov flexural edge wave and the Stoneley-type flexural interfacial wave in case of thin linearly elastic plates. These waves do not appear in an explicit form in the original equations of motion within the framework of the classical Kirchhoff plate theory. The thesis is aimed to highlight the contribution of the edge and interfacial waves into the overall displacement field by deriving specialised equations oriented to aforementioned waves only. The proposed models consist of a parabolic equation governing the wave propagation along a plate edge or plate junction along with an elliptic equation over the interior describing decay in depth. In this case the parabolicity of the one-dimensional edge and interfacial equations supports flexural wave dispersion. The methodology presented in the thesis reveals a dual nature of edge and interfacial plate waves contrasting them to bulk-type wave propagating in thin elastic structures. The thesis tackles a number of important examples of the edge and interfacial wave propagation. First, it addresses the propagation of Konenkov flexural wave in an elastic isotropic plate under prescribed edge loading. For the latter, parabolic-elliptic explicit models were constructed and thoroughly investigated. A similar problem for a semi-infinite orthotropic plate resulted in a more general dual parabolic-elliptic model. Finally, an anal- ogous model was derived and analysed for two isotropic semi-infinite Kirchhoff plates under perfect contact conditions.

515.983

Hierarchical Preconditioners and Adaptivity for Kirchhoff-Plates

Meyer, Arnd

17 September 2008

We describe a preconditioner for the Kirchhoff plate equation for use of Bogner-Fox-Schmidt finite elements based on a hierarchical technique.

info:eu-repo/classification/ddc/510

ddc:510

Deformation

Dünne Schale

Finite-Elemente-Methode

Plattengleichung

Kirchhoff-plate equation

Adaptive finite element computation of eigenvalues

Gallistl, Dietmar

17 July 2014

Gegenstand dieser Arbeit ist die numerische Approximation von Eigenwerten elliptischer Differentialoperatoren vermittels der adaptiven finite-Elemente-Methode (AFEM). Durch lokale Netzverfeinerung können derartige Verfahren den Rechenaufwand im Vergleich zu uniformer Verfeinerung deutlich reduzieren und sind daher von großer praktischer Bedeutung. Diese Arbeit behandelt adaptive Algorithmen für Finite-Elemente-Methoden (FEMs) für drei selbstadjungierte Modellprobleme: den Laplaceoperator, das Stokes-System und den biharmonischen Operator. In praktischen Anwendungen führen Störungen der Koeffizienten oder der Geometrie auf Eigenwert-Haufen (Cluster). Dies macht simultanes Markieren im adaptiven Algorithmus notwendig. In dieser Arbeit werden optimale Konvergenzraten für einen praktischen adaptiven Algorithmus für Eigenwert-Cluster des Laplaceoperators (konforme und nichtkonforme P1-FEM), des Stokes-Systems (nichtkonforme P1-FEM) und des biharmonischen Operators (Morley-FEM) bewiesen. Fehlerabschätzungen in der L2-Norm und Bestapproximations-Resultate für diese Nichtstandard-Methoden erfordern neue Techniken, die in dieser Arbeit entwickelt werden. Dadurch wird der Beweis optimaler Konvergenzraten ermöglicht. Die Optimalität bezüglich einer nichtlinearen Approximationsklasse betrachtet die Approximation des invarianten Unterraums, der von den Eigenfunktionen im Cluster aufgespannt wird. Der Fehler der Eigenwerte kann dazu in Bezug gesetzt werden: Die hierfür notwendigen Eigenwert-Fehlerabschätzungen für nichtkonforme Finite-Elemente-Methoden werden in dieser Arbeit gezeigt. Die numerischen Tests für die betrachteten Modellprobleme legen nahe, dass der vorgeschlagene Algorithmus, der bezüglich aller Eigenfunktionen im Cluster markiert, einem Markieren, das auf den Vielfachheiten der Eigenwerte beruht, überlegen ist. So kann der neue Algorithmus selbst im Fall, dass alle Eigenwerte im Cluster einfach sind, den vorasymptotischen Bereich signifikant verringern. / The numerical approximation of the eigenvalues of elliptic differential operators with the adaptive finite element method (AFEM) is of high practical interest because the local mesh-refinement leads to reduced computational costs compared to uniform refinement. This thesis studies adaptive algorithms for finite element methods (FEMs) for three model problems, namely the eigenvalues of the Laplacian, the Stokes system and the biharmonic operator. In practice, little perturbations in coefficients or in the geometry immediately lead to eigenvalue clusters which requires the simultaneous marking in adaptive finite element methods. This thesis proves optimality of a practical adaptive algorithm for eigenvalue clusters for the conforming and nonconforming P1 FEM for the eigenvalues of the Laplacian, the nonconforming P1 FEM for the eigenvalues of the Stokes system and the Morley FEM for the eigenvalues of the biharmonic operator. New techniques from the medius analysis enable the proof of L2 error estimates and best-approximation properties for these nonstandard finite element methods and thereby lead to the proof of optimality. The optimality in terms of the concept of nonlinear approximation classes is concerned with the approximation of invariant subspaces spanned by eigenfunctions of an eigenvalue cluster. In order to obtain eigenvalue error estimates, this thesis presents new estimates for nonconforming finite elements which relate the error of the eigenvalue approximation to the error of the approximation of the invariant subspace. Numerical experiments for the aforementioned model problems suggest that the proposed practical algorithm that uses marking with respect to all eigenfunctions within the cluster is superior to marking that is based on the multiplicity of the eigenvalues: Even if all exact eigenvalues in the cluster are simple, the simultaneous approximation can reduce the pre-asymptotic range significantly.

numerische Analysis

Konvergenz

Eigenwertproblem

adaptive Finite-Elemente-Methode

nichtkonform

Eigenwert-Cluster

Stokes-System

Kirchhoff-Platte

numerical analysis

adaptive finite element method

convergence

eigenvalue problem

nonconforming

eigenvalue cluster

Stokes system

Kirchhoff plate

510 Mathematik

27 Mathematik

SK 920

ddc:510