2006
DOI: 10.1137/050628519
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Structured Eigenvalue Condition Numbers

Abstract: Abstract. This paper investigates the effect of structure-preserving perturbations on the eigenvalues of linearly and nonlinearly structured eigenvalue problems. Particular attention is paid to structures that form Jordan algebras, Lie algebras, and automorphism groups of a scalar product. Bounds and computable expressions for structured eigenvalue condition numbers are derived for these classes of matrices, which include complex symmetric, pseudo-symmetric, persymmetric, skewsymmetric, Hamiltonian, symplectic… Show more

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Cited by 62 publications
(51 citation statements)
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“…Since κ struct (λ) ≤ κ(λ) holds for any struct, this implies that there is no significant difference between κ R n×n (λ) and κ(λ). Surprisingly, the same statement holds for a variety of other structures [18,55,74,107], see also Section 3. Note that (7) implies |λ − λ| κ struct (λ) E 2 for all E ∈ struct.…”
Section: Condition Numbers and Pseudospectramentioning
confidence: 75%
See 3 more Smart Citations
“…Since κ struct (λ) ≤ κ(λ) holds for any struct, this implies that there is no significant difference between κ R n×n (λ) and κ(λ). Surprisingly, the same statement holds for a variety of other structures [18,55,74,107], see also Section 3. Note that (7) implies |λ − λ| κ struct (λ) E 2 for all E ∈ struct.…”
Section: Condition Numbers and Pseudospectramentioning
confidence: 75%
“…Analogously, any eigenvector belonging to λ(A 11 + A 12 F n ) is center-symmetric. While the structured and unstructured eigenvalue condition numbers for symmetric persymmetric matrices are the same [74,107], there can be a significant difference in the invariant subspace condition numbers. With respect to structured perturbations, the separation between λ(A 11 − A 12 F n ) and λ(A 11 + A 12 F n ), which can be arbitrarily small, does not play any role for invariant subspaces belonging to eigenvalues from one of the two eigenvalue sets [31].…”
Section: Persymmetric Matricesmentioning
confidence: 99%
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“…Equality holds since the union of the curves A + g E contains an open neighborhood in S of A (see [10] for details). An automorphism group G forms a smooth manifold.…”
Section: This Implies φ(A X; S)mentioning
confidence: 99%