On the solution of generalized non‐linear complex‐symmetric eigenvalue problems

Dumont, Ney Augusto

doi:10.1002/nme.1997

Cited by 12 publications

(33 citation statements)

References 39 publications

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“…An issue of paramount importance is the cost-effective solution of the non-linear eigenvalue problem associated with -matrices [2][3][4][5][6][7] (see References [52] for a thorough outline of the general non-linear eigenvalue problem). For the present context, a promising procedure has been recently developed [28] on the basis of the Jacobi-Davidson iteration [53][54][55] and making use of the generalized eigenvalue properties introduced in Reference [9].…”

Section: Discussionmentioning

confidence: 99%

“…The author and his collaborators found no case of finite element development [9,20,24], no matter how complicated the underlying physical problem was, in which splitting K as in Equations (A14)-(A16) would yield some mechanical interpretation that renders it more useful than Equation (A13)-see a discussion on the subject in Reference [28].…”

Section: A2 Derivation Of the Stiffness Matrixmentioning

confidence: 98%

“…In the more general case of viscous damping, on the other hand, the expression of the stiffness matrix K, as illustrated in Equation (A25) for a simple truss element, cannot be easily separated into stiffness, mass and damping contributions. However, although this might become a concern in the frame of a displacement-based variational formulation, as proposed by Przemieniecki, it is completely irrelevant for K obtained in the context of a hybrid formulation (this subject is discussed in some detail in Reference [28]). Moreover, the linear algebra outline of this paper deals with general complex coefficient matrices and no special care has to be taken with respect to the way these matrices are obtained.…”

Section: Introductionmentioning

confidence: 98%

“…• In case of an elasticity problem with underlying real fundamental solutions but taking into account viscous damping in the term ( 2 + 2i )-as in Equation (A3)-the resultant stiffness matrix is complex symmetric [28] and all coefficient matrices A j in the summand (−i ) j A j of Equation (1) are real (and ≡ ), which means that only real linear algebra operations need to be performed in the evaluation of the coefficient matrices of the inverse X, with subsequent multiplication by (−i ) j .…”

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confidence: 99%

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On the inverse of generalized λ‐matrices with singular leading term

Dumont

2005

Numerical Meth Engineering

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SUMMARYAn algorithm is introduced for the inverse of a -matrix given as the truncated serieswith square coefficient matrices and singular leading term A 0 . Moreover, A 1 may be conditionally singular and no restrictions are made for the remaining terms. The result is a -matrix given as a unique, truncated series of the same error order. Motivation for this problem is the evaluation of the frequency-dependent stiffness matrix of general boundary or macro-finite elements in the frame of a hybrid variational formulation that is based on a flexibility matrix F expressed as a truncated power series of the circular frequency .

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Section: Discussionmentioning

confidence: 99%

Section: A2 Derivation Of the Stiffness Matrixmentioning

confidence: 98%

Section: Introductionmentioning

confidence: 98%

mentioning

confidence: 99%

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On the inverse of generalized λ‐matrices with singular leading term

Dumont

2005

Numerical Meth Engineering

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“…The NEP (1.1), including the typical linear and quadratic eigenvalue problems as special cases, is of great importance in a large number of disciplines of scientific computing and engineering applications such as density functional theory calculations [4], vibration of viscoelastic structures [9], dynamic finite element method [11], photonic band structure calculations [38], vibration of fluid-solid structures [40], and so on. When A(λ) is a matrix polynomial, the NEP (1.1) can be reformulated as a linear eigenvalue problem [24,31] and, hence, it may be effectively solved by the Jacobi-Davidson method; see, e.g., [19,36].…”

Section: Introductionmentioning

confidence: 99%

On Smooth LU Decompositions with Applications to Solutions of Nonlinear Eigenvalue Problems

Dai

Bai

2010

JCM

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We study the smooth LU decomposition of a given analytic functional λ-matrix A(λ) and its block-analogue. Sufficient conditions for the existence of such matrix decompositions are given, some differentiability about certain elements arising from them are proved, and several explicit expressions for derivatives of the specified elements are provided. By using these smooth LU decompositions, we propose two numerical methods for computing multiple nonlinear eigenvalues of A(λ), and establish their locally quadratic convergence properties. Several numerical examples are provided to show the feasibility and effectiveness of these new methods.Mathematics subject classification: 15A18, 15A23, 65F15.

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Solving large‐scale nonlinear eigenvalue problems by rational interpolation and resolvent sampling based Rayleigh–Ritz method

Xiao

Zhang

Huang

et al. 2016

Numerical Meth Engineering

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Numerical solution of nonlinear eigenvalue problems (NEPs) is frequently encountered in computational science and engineering. The applicability of most existing methods is limited by the matrix structures, properties of the eigen-solutions, sizes of the problems, etc. This paper aims to remove those limitations and develop robust and universal NEP solvers for large-scale engineering applications. The novelty lies in two aspects. First, a rational interpolation approach (RIA) is proposed based on the Keldysh theorem for holomorphic matrix functions. Comparing with the existing contour integral approach, the RIA provides the possibility to select sampling points in more general regions and has advantages in improving the accuracy and reducing the computational cost. Second, a resolvent sampling scheme using the RIA is proposed to construct reliable search spaces for the Rayleigh-Ritz procedure, based on which a robust eigen-solver, called resolvent sampling based Rayleigh-Ritz method (RSRR), is developed for solving general NEPs. The RSRR can be easily implemented and parallelized. The advantages of the RIA and the performance of the RSRR are demonstrated by a variety of benchmark and application examples.Generally speaking, although there exist a number of numerical methods for NEPs in literature, most of them are restricted by the matrix structures, properties of eigenvalues, computational costs, etc. Accurate and efficient methods that can robustly and reliably calculate all the eigenpairs within a given region, and at the same time, can be applied to large-scale computations are still lacking [3,4,[7][8][9][10][11].In recent years, the contour integral approach (CIA) based on contour integrals of the probed resolvent T .´/ 1 U has attracted great attention [12][13][14][15][16][17][18][19], where the constant matrix U 2 C n L consists of L random column vectors used to probe T .´/ 1 . The CIA is first developed for solving generalized eigenvalue problems [12,13], and later, extended to NEPs in [20] and [15] based on the Smith form and Keldysh's theorem for analytic matrix-valued functions, respectively. Because [20] and [15] result in similar algorithms, we consider the block Sakurai-Sugiura (SS) algorithm in [20]. This algorithm transforms the original NEP into a small-sized generalized eigenvalue problem involving block Hankel matrices by using the monomial moments of the probed resolvent T .´/ 1 U on a given contour. It becomes unstable and inaccurate when higher order contour moments of T .´/ 1 U are used.To circumvent this problem, the SS method with the Rayleigh-Ritz projection (SSRR) has been recently proposed [16]. The eigenspace of the SSRR is constructed from a matrix M 2 C n K L collecting all the monomial moments of T .´/ 1 U up to a given order K. We refer to this as the resolvent moment scheme (or simply moment scheme) for generating eigenspaces. Numerical results in [16] show that the SSRR has a much better stability and accuracy than the SS algorithm when a small value of L is used. Besides, the...

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On the solution of generalized non‐linear complex‐symmetric eigenvalue problems

Cited by 12 publications

References 39 publications

On the inverse of generalized λ‐matrices with singular leading term

On the inverse of generalized λ‐matrices with singular leading term

On Smooth LU Decompositions with Applications to Solutions of Nonlinear Eigenvalue Problems

Solving large‐scale nonlinear eigenvalue problems by rational interpolation and resolvent sampling based Rayleigh–Ritz method

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