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| Name: | ||
| Miloslav Znojil | ||
| Reviewer number: | ||
| 9689 | ||
| Email: | ||
| znojil@ujf.cas.cz | ||
| Item's zbl-Number: | ||
| DE 018 728 672 | ||
| Author(s): | ||
| Grammont, Laurence; Largillier, Alain: | ||
| Shorttitle: | ||
| On epsilon-spectra and stability radii | ||
| Source: | ||
| J. Comput. Appl. Math. 147, No. 2, 453 - 469 | ||
| Classification: | ||
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| Primary Classification: | ||
| Secondary Classification: | ||
| Keywords: | ||
| epsilon-spectrum; Lyapunov stability; partitioning two by two; sufficient conditions of stability | ||
| Review: | ||
Authors suggest that for large matrices A (one of illustrative examples of which is Wilkinson matrix), the analysis of the epsilon spectra (= sets where the resolvent is large) should be done, in parallel, also for certain diagonal submatrices of A. Within this framework they analyse the simplest case (of a two-by-two partitioning) and study its details (new upper bound for the resolvent and its consequences, the influence of the off-diagonal components, a lower bound for a stability radius etc). Consequences are discussed for the Lyapunov stability (illustration: Orr-Sommerfeld operator) and for the reliability of the Krylov-subspace iteration techniques. | ||
| Remarks to the editors: | ||