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| Name: | ||||||||||||||||||||
| Miloslav Znojil | ||||||||||||||||||||
| Reviewer number: | ||||||||||||||||||||
| 9689 | ||||||||||||||||||||
| Email: | ||||||||||||||||||||
| znojil@ujf.cas.cz | ||||||||||||||||||||
| Item's zbl-Number: | ||||||||||||||||||||
| DE 017 902 888 | ||||||||||||||||||||
| Author(s): | ||||||||||||||||||||
| Highham, Nicolas J.; Tisseur, Francoise: | ||||||||||||||||||||
| Shorttitle: | ||||||||||||||||||||
| More on pseudospectra for polynomial eigenvalue problems and applications in control theory | ||||||||||||||||||||
| Source: | ||||||||||||||||||||
| Linear Algebra Appl. 351-352, 435 - 453 (2002). | ||||||||||||||||||||
| Classification: | ||||||||||||||||||||
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Keywords:
| polynomial eigenvalue problem; pseudospectrum; nearest nonregular polynomial; nearest uncontrollable dynamical system; structured perturbations | Review: | Next to the usual linear spectral (or eigenvalue) problem A x = e x one finds the generalized one, A x = e B x. Moving on, a square-matrix polynomial problem follows, P(e) x = 0. Its non-square form appeals finally to the authors motivated (say, by the theory of games) to study the ``infinite" eigenvalues e = a/b with b = 0. They contemplate the homogeneous polynomial and add perturbations, [P(a,b)+ D P'(a,b)] x = 0. In this way the authors define the (complex) pseudospectrum [= a set of pairs (a,b)] and show how it can be calculated via minimization of P x over x with unit norm (cf. their main Theorem 2.1). In the sequel they illustrate the concept (on the Wilkinson's pathological example), suggest a vizualization on the Riemann sphere (a projection which treats also the information about the infinite eigenvalues properly) and outline a few applications [studying the distance from the nearest nonregular matrix polynomial or from a domain of uncontrollability (= impossibility to reach some final states) in a dynamical system]. Finally they extend the concept, in the spirit of their preceding paper [21], to the so called structured pseudospectra and illustrate their merits on a damped mass-spring example of the Tisseur's older paper [20]. Remarks to the editors: |
I do not mind replacements of my plain-text equations by their improved TEX forms (then, you could also replace e by lambda, a by \alpha, b by \beta and D by capital \Delta).
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