We consider Hamiltonian matrices obtained by means of symmetric and positive definite matrices and analyse some perturbations that maintain the eigenvalues on the imaginary axis of the complex plane. To obtain this result we prove for such matrices the existence of a diagonal form or, alternatively by means of symplectic transformations, the existence of the simplest canonical form. Applications related to a pair of problems in the context of linear algebra and differential equations are also reported
[[abstract]]This paper presents algorithms far computing stable Lagrangian invariant subspaces of a ...
In a recent paper, Overton and Van Dooren have considered structured indefinite perturbations to a g...
Abstract. This paper presents algorithms for computing stable Lagrangian invariant subspaces of a Ha...
In this paper, strong relative perturbation bounds are developed for a number of linear algebra prob...
Symplectic eigenvalues are conventionally defined for symmetric positive-definite matrices via Willi...
In the framework of perturbation theory the reality of the perturbed eigenvalues of a class of PT-sy...
AbstractIt is proved that, under small perturbations that preserve the Jordan structure, canonical t...
Basic classes of matrices or linear transformations in finite dimensional quaternionic vector spaces...
AbstractWe prove a Hamiltonian/skew-Hamiltonian version of the classical theorem relating strict equ...
Given a Hamiltonian matrix H = JS with S symmetric and positive definite, we analyze a symplectic La...
AbstractCharacterizations are given for the Hamiltonian matrices that can be reduced to Hamiltonian ...
SIGLEAvailable at INIST (FR), Document Supply Service, under shelf-number : 22495, issue : a.1996 n....
AbstractWe give a sharp estimate for the eigenvectors of a positive definite Hermitian matrix under ...
This paper relates disconjugacy of linear Hamiltonian difference systems (LHdS) (and hence positive ...
We consider the application of symmetric Boundary Value Methods to linear autonomous Hamiltonian sys...
[[abstract]]This paper presents algorithms far computing stable Lagrangian invariant subspaces of a ...
In a recent paper, Overton and Van Dooren have considered structured indefinite perturbations to a g...
Abstract. This paper presents algorithms for computing stable Lagrangian invariant subspaces of a Ha...
In this paper, strong relative perturbation bounds are developed for a number of linear algebra prob...
Symplectic eigenvalues are conventionally defined for symmetric positive-definite matrices via Willi...
In the framework of perturbation theory the reality of the perturbed eigenvalues of a class of PT-sy...
AbstractIt is proved that, under small perturbations that preserve the Jordan structure, canonical t...
Basic classes of matrices or linear transformations in finite dimensional quaternionic vector spaces...
AbstractWe prove a Hamiltonian/skew-Hamiltonian version of the classical theorem relating strict equ...
Given a Hamiltonian matrix H = JS with S symmetric and positive definite, we analyze a symplectic La...
AbstractCharacterizations are given for the Hamiltonian matrices that can be reduced to Hamiltonian ...
SIGLEAvailable at INIST (FR), Document Supply Service, under shelf-number : 22495, issue : a.1996 n....
AbstractWe give a sharp estimate for the eigenvectors of a positive definite Hermitian matrix under ...
This paper relates disconjugacy of linear Hamiltonian difference systems (LHdS) (and hence positive ...
We consider the application of symmetric Boundary Value Methods to linear autonomous Hamiltonian sys...
[[abstract]]This paper presents algorithms far computing stable Lagrangian invariant subspaces of a ...
In a recent paper, Overton and Van Dooren have considered structured indefinite perturbations to a g...
Abstract. This paper presents algorithms for computing stable Lagrangian invariant subspaces of a Ha...