Most eigenvalue problems arising in practice are known to be structured. Structure is often introduced by discretization and linearization techniques but may also be a consequence of properties induced by the original problem. Preserving this structure can help preserve physically relevant symmetries in the eigenvalues of the matrix and may improve the accuracy and efficiency of an eigenvalue computation. The purpose of this brief survey is to highlight these facts for some common matrix structures. This includes a treatment of rather general concepts such as structured condition numbers and backward errors as well as an overview of algorithms and applications for several matrix classes including symmetric, skew-symmetric, persymmetric, blo...
Abstract. We investigate the behavior of eigenvalues under structured perturbations. We show that fo...
AbstractWe develop Jacobi algorithms for solving the complete eigenproblem for Hamiltonian and skew-...
Matrix polynomial eigenproblems arise in many application areas, both directly and as approximations...
AbstractWe derive explicit computable expressions of structured backward errors of approximate eigen...
This paper investigates the effect of structure-preserving perturbations on the eigenvalues of line...
This PhD thesis is an important development in the theories, methods, and applications of eigenvalue...
Minimal structured perturbations are constructed such that an approximate eigenpair of a nonlinear e...
This paper investigates the effect of structure-preserving perturbations on the eigenvalues of linea...
AbstractThis work is concerned with eigenvalue problems for structured matrix polynomials, including...
Abstract. Various applications give rise to eigenvalue problems for which the matrices are Hamiltoni...
Various applications give rise to eigenvalue problems for which the matrices are Hamiltonian or skew...
Invariant subspaces of structured matrices are sometimes better conditioned with respect to structur...
Structured eigenvalue problems feature a prominent role in many algorithms for the computation of ro...
Abstract Skew-Hamiltonian and Hamiltonian eigenvalue problems arise from a number of applications, p...
We discuss the numerical solution of eigenvalue problems for matrix polynomials, where the coefficie...
Abstract. We investigate the behavior of eigenvalues under structured perturbations. We show that fo...
AbstractWe develop Jacobi algorithms for solving the complete eigenproblem for Hamiltonian and skew-...
Matrix polynomial eigenproblems arise in many application areas, both directly and as approximations...
AbstractWe derive explicit computable expressions of structured backward errors of approximate eigen...
This paper investigates the effect of structure-preserving perturbations on the eigenvalues of line...
This PhD thesis is an important development in the theories, methods, and applications of eigenvalue...
Minimal structured perturbations are constructed such that an approximate eigenpair of a nonlinear e...
This paper investigates the effect of structure-preserving perturbations on the eigenvalues of linea...
AbstractThis work is concerned with eigenvalue problems for structured matrix polynomials, including...
Abstract. Various applications give rise to eigenvalue problems for which the matrices are Hamiltoni...
Various applications give rise to eigenvalue problems for which the matrices are Hamiltonian or skew...
Invariant subspaces of structured matrices are sometimes better conditioned with respect to structur...
Structured eigenvalue problems feature a prominent role in many algorithms for the computation of ro...
Abstract Skew-Hamiltonian and Hamiltonian eigenvalue problems arise from a number of applications, p...
We discuss the numerical solution of eigenvalue problems for matrix polynomials, where the coefficie...
Abstract. We investigate the behavior of eigenvalues under structured perturbations. We show that fo...
AbstractWe develop Jacobi algorithms for solving the complete eigenproblem for Hamiltonian and skew-...
Matrix polynomial eigenproblems arise in many application areas, both directly and as approximations...