Compact Rational Krylov Methods for Nonlinear Eigenvalue Problems

Beeumen, Roel Van; Meerbergen, Karl; Michiels, Wim

doi:10.1137/140976698

Cited by 64 publications

(150 citation statements)

References 21 publications

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“…For instance, in [27] the author refers to V j t j as the continuation vector, while in [23] the term is used to denote (ρ j A − η j I)V j t j . The terminology of "continuation combinations" is adopted in [5,27,31] for the vectors t j . With the notion of continuation pair we want to stress that there are two parts, a root and a vector, both of which are equally important.…”

Section: S201mentioning

confidence: 99%

“…Currently, the choices t m = e m and t m = q m appear to be dominant in the literature; see, e.g., [27,31]. Note that t m = e m may (with probability zero) not be admissible; i.e., we would not be able to expand the space with the obtained w m+1 even though the space is not yet A-invariant.…”

Section: S201mentioning

confidence: 99%

“…8.5]), these methods have seen an increasing number of other applications over the last two decades or so. Examples of rational Krylov applications can be found in model order reduction [11,16,17,22], matrix function approximation [10,13,19], matrix equations [3,9,24], nonlinear eigenvalue problems [20,21,31], and nonlinear rational least squares fitting [5,6].At the core of most rational Krylov applications is the rational Arnoldi algorithm, which is a Gram-Schmidt procedure for generating an orthonormal basis of a rational Krylov space. Given a matrix A ∈ C N,N , a vector b ∈ C N , and a polynomial q m of degree at most m and such that q m (A) is nonsingular, the rational Krylov space of order m is defined as…”

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Parallelization of the Rational Arnoldi Algorithm

Berljafa¹,

Güttel²

2017

SIAM J. Sci. Comput.

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Abstract. Rational Krylov methods are applicable to a wide range of scientific computing problems, and the rational Arnoldi algorithm is a commonly used procedure for computing an orthonormal basis of a rational Krylov space. Typically, the computationally most expensive component of this algorithm is the solution of a large linear system of equations at each iteration. We explore the option of solving several linear systems simultaneously, thus constructing the rational Krylov basis in parallel. If this is not done carefully, the basis being orthogonalized may become badly conditioned, leading to numerical instabilities in the orthogonalization process. We introduce the new concept of continuation pairs, which gives rise to a near-optimal parallelization strategy that allows us to control the growth of the condition number of this nonorthogonal basis. As a consequence we obtain a significantly more accurate and reliable parallel rational Arnoldi algorithm. The computational benefits are illustrated using several numerical examples from different application areas.Key words. rational Krylov, orthogonalization, parallelization AMS subject classifications. 68W10, 65F25, 65G50, 65F15 DOI. 10.1137/16M10791781. Introduction. Rational Krylov methods have become an indispensable tool of scientific computing. Invented by Ruhe for the solution of large sparse eigenvalue problems (see, e.g., [26,27]) and frequently advocated for this purpose (see, e.g., [23,32] and [2, sect. 8.5]), these methods have seen an increasing number of other applications over the last two decades or so. Examples of rational Krylov applications can be found in model order reduction [11,16,17,22], matrix function approximation [10,13,19], matrix equations [3,9,24], nonlinear eigenvalue problems [20,21,31], and nonlinear rational least squares fitting [5,6].At the core of most rational Krylov applications is the rational Arnoldi algorithm, which is a Gram-Schmidt procedure for generating an orthonormal basis of a rational Krylov space. Given a matrix A ∈ C N,N , a vector b ∈ C N , and a polynomial q m of degree at most m and such that q m (A) is nonsingular, the rational Krylov space of order m is defined as

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Section: S201mentioning

confidence: 99%

Section: S201mentioning

confidence: 99%

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confidence: 99%

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Parallelization of the Rational Arnoldi Algorithm

Berljafa¹,

Güttel²

2017

SIAM J. Sci. Comput.

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“…Extending the ideas of a compact representation of the Krylov vectors and of the two levels of orthogonalization from polynomials of degree 2 (TOAR) to polynomials of any degree, Kressner and Roman 19 developed a memory-efficient and stable Arnoldi process for the linearizations of matrix polynomials expressed in the Chebyshev basis. In 2015, the compact rational Krylov (CORK) method for nonlinear eigenvalue problems (NLEPs) was introduced in the work of Van Beeumen et al 20 CORK considers particular NLEPs that can be expressed and linearized in certain ways, which are solved by applying a CORK method to such linearizations. A key feature of the CORK method is that it works for many kinds of linearizations involving a Kronecker structure, as the Frobenius companion form or linearizations of matrix polynomials in different bases (as Newton or Chebyshev, among others 21 ).…”

Section: Introductionmentioning

confidence: 99%

“…More precisely, they ordered the matrices P i in reverse order and interchanged the identity blocks in  and . Since we are following, in this paper, the spirit of CORK, then  and  are written in (10) in the same way as in table 1 in the work of Van Beeumen et al 20…”

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confidence: 99%

A compact rational Krylov method for large‐scale rational eigenvalue problems

Dopico

González-Pizarro

2018

Numerical Linear Algebra App

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In this work, we propose a new method, termed as R-CORK, for the numerical solution of large-scale rational eigenvalue problems, which is based on a linearization and on a compact decomposition of the rational Krylov subspaces corresponding to this linearization. R-CORK is an extension of the compact rational Krylov method (CORK) introduced very recently in the literature to solve a family of nonlinear eigenvalue problems that can be expressed and linearized in certain particular ways and which include arbitrary polynomial eigenvalue problems, but not arbitrary rational eigenvalue problems. The R-CORK method exploits the structure of the linearized problem by representing the Krylov vectors in a compact form in order to reduce the cost of storage, resulting in a method with two levels of orthogonalization. The first level of orthogonalization works with vectors of the same size as the original problem, and the second level works with vectors of size much smaller than the original problem. Since vectors of the size of the linearization are never stored or orthogonalized, R-CORK is more efficient from the point of view of memory and orthogonalization than the classical rational Krylov method applied directly to the linearization. Taking into account that the R-CORK method is based on a classical rational Krylov method, to implement implicit restarting is also possible, and we show how to do it in a memory-efficient way. Finally, some numerical examples are included in order to show that the R-CORK method performs satisfactorily in practice. KEYWORDSlarge-scale, linearization, rational eigenvalue problem, rational Krylov method where R( ) ∈ ℂ( ) n×n is a nonsingular rational matrix, that is, the entries of R( ) are scalar rational functions in the variable with complex coefficients and det(R( )) ≢ 0 is not identically zero, and x ∈ ℂ n is a nonzero vector. More Numer Linear Algebra Appl. 2018;26:e2214.wileyonlinelibrary.com/journal/nla † We remark that Su and Bai 4 considered the permutations of the matrices  and  in (10) for the linearized problem (9). More precisely, they ordered the matrices P i in reverse order and interchanged the identity blocks in  and . Since we are following, in this paper, the spirit of CORK, then  and  are written in (10) in the same way as in table 1 in the work of Van Beeumen et al. 20

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A perturbation‐based method for a parameter‐dependent nonlinear eigenvalue problem

Xie

2021

Numerical Linear Algebra App

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A new method is proposed to compute the eigenpairs of a parameter-dependent nonlinear eigenvalue problem. We first analyze the properties on the analytic perturbation of the invariant pair of a nonlinear eigenvalue problem and provide a method to compute the first-order and high-order derivatives of the invariant pair. On these grounds, the subspaces independent of the parameter and containing the approximations to the desired eigenvectors of a nonlinear eigenvalue problem are constructed. Then the desired eigenpairs of a nonlinear eigenvalue problem are obtained by projecting the parameter-dependent nonlinear eigenvalue problem to the generated subspaces. The errors of the computed eigenpairs are estimated. Finally, the efficiency of the proposed method is illustrated with some numerical examples.

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Compact Rational Krylov Methods for Nonlinear Eigenvalue Problems

Cited by 64 publications

References 21 publications

Parallelization of the Rational Arnoldi Algorithm

Parallelization of the Rational Arnoldi Algorithm

A compact rational Krylov method for large‐scale rational eigenvalue problems

A perturbation‐based method for a parameter‐dependent nonlinear eigenvalue problem

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