On the Nearest Singular Matrix Pencil

Guglielmi, Nicola; Lubich, Christian; Mehrmann, Volker

doi:10.1137/16m1079026

Cited by 33 publications

(41 citation statements)

References 16 publications

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“…All experiments are done using quad precision floating point arithmetic, with about 35 decimal digits of accuracy. We compare some degree one examples to the recent results of (Guglielmi et al, 2017).…”

Section: Implementation Description and Comparisonmentioning

confidence: 96%

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Computing lower rank approximations of matrix polynomials

Giesbrecht

Haraldson

Labahn

2020

Journal of Symbolic Computation

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Given an input matrix polynomial whose coefficients are floating point numbers, we consider the problem of finding the nearest matrix polynomial which has rank at most a specified value. This generalizes the problem of finding a nearest matrix polynomial that is algebraically singular with a prescribed lower bound on the dimension given in a previous paper by the authors. In this paper we prove that such lower rank matrices at minimal distance always exist, satisfy regularity conditions, and are all isolated and surrounded by a basin of attraction of non-minimal solutions. In addition, we present an iterative algorithm which, on given input sufficiently close to a rank-at-most matrix, produces that matrix. The algorithm is efficient and is proven to converge quadratically given a sufficiently good starting point. An implementation demonstrates the effectiveness and numerical robustness of our algorithm in practice.

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Section: Implementation Description and Comparisonmentioning

confidence: 96%

“…In this section we consider Examples 2.10, 2.11 and 2.12 from Guglielmi et al (2017), where we compare our results to real perturbations. Note that complex perturbations are a straight-forward generalization of the theory presented here, and can be re-formulated as a problem over R.…”

Section: Nearest Rank Deficient Linearly and Affinely Structured Matrixmentioning

confidence: 99%

Computing lower rank approximations of matrix polynomials

Giesbrecht

Haraldson

Labahn

2020

Journal of Symbolic Computation

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“…Because we require a stable pair to be regular, it is also complementary to the distance to the nearest singular pencil, which is a long-standing open problem. [14][15][16] The nearest stable matrix pair problem occurs in system identification, where one needs to identify a stable matrix pair depending on observations, similar to the nearest stable matrix problem. 12,13 For example, when a real-world problem is approximated by a system model (1), the stability of the physical system may not be preserved, that is, the approximation process (e.g., finite element or finite difference models, linearization, or model order reduction) may make the stable system unstable.…”

Section: The Linear Daementioning

confidence: 99%

“…An important consequence of the proof of Theorem 4 is an explicit construction of the DH characterization of a matrix pair (E, A), as follows: (a) solve the system (13) (if the system does not admit a solution, the pair is not regular, of index at most one, and asymptotically stable), and (b) use (15) to construct (J, R, Q).…”

Section: Theorem 1 Every Regular Dh Pair (E (J − R)q) Of Index At Mmentioning

confidence: 99%

Computing the nearest stable matrix pairs

Gillis

Mehrmann

Sharma

2018

Numerical Linear Algebra App

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Summary In this paper, we study the nearest stable matrix pair problem: given a square matrix pair (E,A), minimize the Frobenius norm of (ΔE,ΔA) such that (E+ΔE,A+ΔA) is a stable matrix pair. We propose a reformulation of the problem with a simpler feasible set by introducing dissipative Hamiltonian matrix pairs: A matrix pair (E,A) is dissipative Hamiltonian if A=(J−R)Q with skew‐symmetric J, positive semidefinite R, and an invertible Q such that QTE is positive semidefinite. This reformulation has a convex feasible domain onto which it is easy to project. This allows us to employ a fast gradient method to obtain a nearby stable approximation of a given matrix pair.

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“…A matrix pencil A(s) = sE − A with E, A ∈ C n×n is called regular if det A(s) is not the zero polynomial, otherwise it is called singular. In the numerical treatment of matrix pencils it turns out that regular pencils which are close to singular pencils are difficult to handle [5]. In general, it is not even possible to compute canonical forms because rank decisions turn out to be impossible.…”

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confidence: 99%

A new bound for the distance to singularity of a regular matrix pencil

Berger

Gernandt

Trunk

et al. 2017

Proc Appl Math and Mech

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For regular matrix pencils A(s) = sE − A the distance to the nearest singular pencil in the Frobenius norm of the coefficients is called the distance to singularity. We derive a new lower bound for this distance by using the spectral theory of tridiagonal Toeplitz matrices.is not the zero polynomial, otherwise it is called singular. In the numerical treatment of matrix pencils it turns out that regular pencils which are close to singular pencils are difficult to handle [5]. In general, it is not even possible to compute canonical forms because rank decisions turn out to be impossible. This is an important issue in numerous applications, we mention only the solution theory of linear time-invariant differential-algebraic equations d dt Ex(t) = Ax(t), t ∈ [0, ∞), x(0) = x 0 . Here a unique solution exists for every consistent initial value if and only if the associated matrix pencil A(s) = sE − A is regular.

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On the Nearest Singular Matrix Pencil

Cited by 33 publications

References 16 publications

Computing lower rank approximations of matrix polynomials

Computing lower rank approximations of matrix polynomials

Computing the nearest stable matrix pairs

A new bound for the distance to singularity of a regular matrix pencil

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