Abstract. The -pseudospectrum of a matrix A is the subset of the complex plane consisting of all eigenvalues of complex matrices within a distance of A, ...
The pseudospectral abscissa is the largest real part of such an eigenvalue, and the pseudospectral radius is the largest absolute value of such an eigenvalue.
Abstract. The -pseudospectrum of a matrix A is the subset of the com- plex plane consisting of all eigenvalues of complex matrices within a.
Dive into the research topics of 'Convexity and lipschitz behavior of small pseudospectra'. Together they form a unique fingerprint. Lipschitz Behavior ...
Convexity and Lipschitz behavior for small pseudospectra, with Adrian S. Lewis and Michael L. Overton, SIAM J. Matrix Analysis, 29(2007) 586-595. Robust ...
Convexity and Lipschitz Behavior of Small Pseudospectra SIAM J. Matrix Anal. Appl. 29 (2007), pp. 586-595. Published Article · Final Submitted Version(pdf). M ...
Convexity and Lipschitz Behavior of Small Pseudospectra · J. V. Burke,; A. S. Lewis,; M. L. Overton · Abstract · PDF · XML. Abstract. The ε‐pseudospectrum of a ...
"Convexity and Lipschitz behavior of small pseudospectra" SIAM JOURNAL ON MATRIX ANALYSIS AND APPLICATIONS , v.29 , 2006 , p.586 View record at Web of ...
Convexity and lipschitz behavior of small pseudospectra Siam Journal On Matrix Analysis and Applications. 29: 586-595. DOI: 10.1137/050645841, 0.317. 2007 ...
(PDF) Variational Analysis of Pseudospectra - ResearchGate
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A careful analysis shows that Lipschitz behavior behavior fails for a precise reason: the presence on the pseudospectral boundary of a resolvent-critical point, ...