Global ETD Search

31	Vibrations of plates with masses Solov'ëv, Sergey I. 31 August 2006 (has links) This paper presents the investigation of the nonlinear eigenvalue problem describing free vibrations of plates with elastically attached masses. We study properties of eigenvalues and eigenfunctions and prove the existence theorem. Theoretical results are illustrated by numerical experiments. info:eu-repo/classification/ddc/510 ddc:510 Nichtlineares Eigenwertproblem Schwingung eigenfunctions numerical experiments vibrations of plates
32	CoCoS - Computation of Corner Singularities Pester, Cornelia 06 September 2006 (has links) This is a documentation of the software package COCOS. The purpose of COCOS is the computation of corner singularities of elliptic equations in polyhedral corners and crack tips. COCOS provides a self-contained library for the generation of structured 2D finite element meshes, including various routines for mesh manipulation, as well as several algorithms for the solution of quadratic eigenvalue problems with Hamiltonian structure. These and further features will be described in this documentation. info:eu-repo/classification/ddc/510 ddc:510 CoCoS linear elasticity problem
33	A rational SHIRA method for the Hamiltonian eigenvalue problem Benner, Peter, Effenberger, Cedric 07 January 2009 (has links) (PDF) The SHIRA method of Mehrmann and Watkins belongs among the structure preserving Krylov subspace methods for solving skew-Hamiltonian eigenvalue problems. It can also be applied to Hamiltonian eigenproblems by considering a suitable transformation. Structure induced shift-and-invert techniques are employed to steer the algorithm towards the interesting region of the spectrum. However, the shift cannot be altered in the middle of the computation without discarding the information that has been accumulated so far. This paper shows how SHIRA can be combined with ideas from Ruhe's Rational Krylov algorithm to yield a method that permits an adjustment of shift after every step of the computation, adding greatly to the flexibility of the algorithm. We call this new method rational SHIRA. A numerical example is presented to demonstrate its efficiency. Hamiltonian matrix eigenvalue problem rational Krylov subspace method shift-and-invert Arnoldi skew-Hamiltonian matrix ddc:510 Eigenwertproblem
34	The Anderson Model of Localization: A Challenge for Modern Eigenvalue Methods Elsner, Ulrich, Mehrmann, Volker, Römer, Rudolf A., Schreiber, Michael 09 September 2005 (has links) We present a comparative study of the application of modern eigenvalue algorithms to an eigenvalue problem arising in quantum physics, namely, the computation of a few interior eigenvalues and their associated eigenvectors for the large, sparse, real, symmetric, and indefinite matrices of the Anderson model of localization. We compare the Lanczos algorithm in the 1987 implementation of Cullum and Willoughby with the implicitly restarted Arnoldi method coupled with polynomial and several shift-and-invert convergence accelerators as well as with a sparse hybrid tridiagonalization method. We demonstrate that for our problem the Lanczos implementation is faster and more memory efficient than the other approaches. This seemingly innocuous problem presents a major challenge for all modern eigenvalue algorithms. info:eu-repo/classification/ddc/510 ddc:510 Eigenwertproblem; Lanczos-Algorithmus
35	Lagrangian invariant subspaces of Hamiltonian matrices Mehrmann, Volker, Xu, Hongguo 14 September 2005 (has links) The existence and uniqueness of Lagrangian invariant subspaces of Hamiltonian matrices is studied. Necessary and sufficient conditions are given in terms of the Jordan structure and certain sign characteristics that give uniqueness of these subspaces even in the presence of purely imaginary eigenvalues. These results are applied to obtain in special cases existence and uniqueness results for Hermitian solutions of continuous time algebraic Riccati equations. info:eu-repo/classification/ddc/510 ddc:510
36	Preconditioned iterative methods for monotone nonlinear eigenvalue problems Solov'ëv, Sergey I. 11 April 2006 (has links) This paper proposes new iterative methods for the efficient computation of the smallest eigenvalue of the symmetric nonlinear matrix eigenvalue problems of large order with a monotone dependence on the spectral parameter. Monotone nonlinear eigenvalue problems for differential equations have important applications in mechanics and physics. The discretization of these eigenvalue problems leads to ill-conditioned nonlinear eigenvalue problems with very large sparse matrices monotone depending on the spectral parameter. To compute the smallest eigenvalue of large matrix nonlinear eigenvalue problem, we suggest preconditioned iterative methods: preconditioned simple iteration method, preconditioned steepest descent method, and preconditioned conjugate gradient method. These methods use only matrix-vector multiplications, preconditioner-vector multiplications, linear operations with vectors and inner products of vectors. We investigate the convergence and derive grid-independent error estimates of these methods for computing eigenvalues. Numerical experiments demonstrate practical effectiveness of the proposed methods for a class of mechanical problems. info:eu-repo/classification/ddc/510 ddc:510 Iterativ; Nichtlineares Eigenwertproblem
37	Contributions to the Minimal Realization Problem for Descriptor Systems Sokolov, Viatcheslav 02 June 2006 (has links) In this thesis we have studied several aspects of the minimal realization problem for descriptor systems. These aspects include purely theoretical questions such as that about the order of a minimal realization of a general improper rational matrix and problems of a numerical nature, like rounding error analysis of the computing a minimal realization from a nonminimal one. We have also treated the minimal partial realization problem for general descriptor systems with application to model reduction and to generalised eigenvalue problems. info:eu-repo/classification/ddc/510 ddc:510 Deskriptorsystem <Mathematik> Rationale matrixwertige Funktion Realisierung Modellreduktion partielle Realisierung verallgemeinertes Eigenwertproblem
38	Preconditioned iterative methods for a class of nonlinear eigenvalue problems Solov'ëv, Sergey I. 31 August 2006 (has links) In this paper we develop new preconditioned iterative methods for solving monotone nonlinear eigenvalue problems. We investigate the convergence and derive grid-independent error estimates for these methods. Numerical experiments demonstrate the practical effectiveness of the proposed methods for a model problem. info:eu-repo/classification/ddc/510 ddc:510 Gradientenverfahren Konjugierte-Gradienten-Methode Nichtlineares Eigenwertproblem Präkonditionierung preconditioned iterative method symmetric eigenvalue problem
39	The Laplace and the linear elasticity problems near polyhedral corners and associated eigenvalue problems Meyer, Arnd, Pester, Cornelia 01 September 2006 (has links) The solutions to certain elliptic boundary value problems have singularities with a typical structure near polyhedral corners. This structure can be exploited to devise an eigenvalue problem whose solution can be used to quantify the singularities of the given boundary value problem. It is necessary to parametrize a ball centered at the corner. There are different possibilities for a suitable parametrization; from the numerical point of view, spherical coordinates are not necessarily the best choice. This is why we do not specify a parametrization in this paper but present all results in a rather general form. We derive the eigenvalue problems that are associated with the Laplace and the linear elasticity problems and show interesting spectral properties. Finally, we discuss the necessity of widely accepted symmetry properties of the elasticity tensor. We show in an example that some of these properties are not only dispensable, but even invalid, although claimed in many standard books on linear elasticity. info:eu-repo/classification/ddc/510 ddc:510
40	On the Convergence Factor in Multilevel Methods for Solving 3D Elasticity Problems Jung, Michael, Todorov, Todor D. 01 September 2006 (has links) The constant gamma in the strengthened Cauchy-Bunyakowskii-Schwarz inequality is a basic tool for constructing of two-level and multilevel preconditioning matrices. Therefore many authors consider estimates or computations of this quantity. In this paper the bilinear form arising from 3D linear elasticity problems is considered on a polyhedron. The cosine of the abstract angle between multilevel finite element subspaces is computed by a spectral analysis of a general eigenvalue problem. Octasection and bisection approaches are used for refining the triangulations. Tetrahedron, pentahedron and hexahedron meshes are considered. The dependence of the constant $\gamma$ on the Poisson ratio is presented graphically. info:eu-repo/classification/ddc/510 ddc:510

Search results