AbstractWe investigate the behavior of eigenvalues under structured perturbations. We show that for many common structures such as (complex) symmetric, Toeplitz, symmetric Toeplitz, circulant and others the structured condition number is equal to the unstructured condition number for normwise perturbations, and prove similar results for real perturbations. An exception are complex skewsymmetric matrices. We also investigate componentwise complex and real perturbations. Here Hermitian and skew-Hermitian matrices are exceptional for real perturbations. Furthermore we characterize the structured (complex and real) pseudospectrum for a number of structures and show that often there is little or no significant difference to the usual, unstructur...
We continue the study started in [Noschese and Pasquini, Eigenvalue condition numbers: zero-structur...
Abstract. In this paper we study the condition number of linear systems, the condition number of mat...
. Pseudospectra associated with the standard and generalized eigenvalue problems have been widely in...
Abstract. We investigate the behavior of eigenvalues under structured perturbations. We show that fo...
AbstractWe investigate the behavior of eigenvalues under structured perturbations. We show that for ...
AbstractIn this note, we study the notion of structured pseudospectra. We prove that for Toeplitz, c...
In this note, we study the notion of structured pseudospectra. We prove that for Toeplitz, circulant...
This paper investigates the effect of structure-preserving perturbations on the eigenvalues of line...
This paper investigates the effect of structure-preserving perturbations on the eigenvalues of linea...
AbstractPseudospectra and structured pseudospectra have been investigated widely. In this paper, for...
We study the perturbation theory of structured matrices under structured rank one perturbations, wit...
Structured singular values and pseudospectra play an important role in assessing the properties of a...
Pseudospectra associated with the standard and generalized eigenvalue problems have been widely inve...
This paper concerns a quantity which is equal to the norm of the smallest structured perturbation to...
AbstractWe continue the study started in [Noschese and Pasquini, Eigenvalue condition numbers: zero-...
We continue the study started in [Noschese and Pasquini, Eigenvalue condition numbers: zero-structur...
Abstract. In this paper we study the condition number of linear systems, the condition number of mat...
. Pseudospectra associated with the standard and generalized eigenvalue problems have been widely in...
Abstract. We investigate the behavior of eigenvalues under structured perturbations. We show that fo...
AbstractWe investigate the behavior of eigenvalues under structured perturbations. We show that for ...
AbstractIn this note, we study the notion of structured pseudospectra. We prove that for Toeplitz, c...
In this note, we study the notion of structured pseudospectra. We prove that for Toeplitz, circulant...
This paper investigates the effect of structure-preserving perturbations on the eigenvalues of line...
This paper investigates the effect of structure-preserving perturbations on the eigenvalues of linea...
AbstractPseudospectra and structured pseudospectra have been investigated widely. In this paper, for...
We study the perturbation theory of structured matrices under structured rank one perturbations, wit...
Structured singular values and pseudospectra play an important role in assessing the properties of a...
Pseudospectra associated with the standard and generalized eigenvalue problems have been widely inve...
This paper concerns a quantity which is equal to the norm of the smallest structured perturbation to...
AbstractWe continue the study started in [Noschese and Pasquini, Eigenvalue condition numbers: zero-...
We continue the study started in [Noschese and Pasquini, Eigenvalue condition numbers: zero-structur...
Abstract. In this paper we study the condition number of linear systems, the condition number of mat...
. Pseudospectra associated with the standard and generalized eigenvalue problems have been widely in...