Add to ORKGGiven a pair of matrices (A;B) we study the stability of their invariant subspaces from the geometry of the manifold of quadruples (A;B; S; F) where S is an (A;B)-invariant subspace and F is such that (A + BF)S ½ S. In particular, we derive a su±cient computable condition of stability
AbstractGiven an observable pair of matrices (C,A) we consider the manifold of (C,A)-invariant subsp...
• Characterization of stable invariant subspaces • of an endomorphism: done • of a pair of matric...
Given a nondegenerate sesquilinear inner product on a finite dimensional complex vector space, or a ...
AbstractLet (A,B)∈Cn×n×Cn×m and let M be an (A,B)-invariant subspace. In this paper the following re...
AbstractLet (A,B)∈Cn×n×Cn×m and M be an (A,B)-invariant subspace. Let C(A,B) be the controllability ...
Given a pair of matrices (A,B) we study the Lipschitz stability of its controlled invariant subspace...
AbstractWe study the stability of (joint) invariant subspaces of a finite set of commuting matrices....
AbstractLet (A,B)∈Cn×n×Cn×m and M be an (A,B)-invariant subspace. Let C(A,B) be the controllability ...
AbstractLet (A,B)∈Cn×n×Cn×m and let M be an (A,B)-invariant subspace. In this paper the following re...
Introduction In the present paper a review is given of the important system theoretic concept of (A...
AbstractLet (A,B)∈Cn×n×Cn×m and M be an (A,B)-invariant subspace. In this paper the following result...
AbstractWe study stability in classes of subspaces which are invariant under a self-adjoint matrix i...
Given an observable pair of matrices (C;A) we consider the manifold of (C;A)-invariant and observab...
Given a pair of matrices (A,B) we study the Lipschitz stability of its controlled invariant subspac...
Given an observable pair of matrices (C;A) we consider the manifold of (C;A)-invariant and observabl...
AbstractGiven an observable pair of matrices (C,A) we consider the manifold of (C,A)-invariant subsp...
• Characterization of stable invariant subspaces • of an endomorphism: done • of a pair of matric...
Given a nondegenerate sesquilinear inner product on a finite dimensional complex vector space, or a ...
AbstractLet (A,B)∈Cn×n×Cn×m and let M be an (A,B)-invariant subspace. In this paper the following re...
AbstractLet (A,B)∈Cn×n×Cn×m and M be an (A,B)-invariant subspace. Let C(A,B) be the controllability ...
Given a pair of matrices (A,B) we study the Lipschitz stability of its controlled invariant subspace...
AbstractWe study the stability of (joint) invariant subspaces of a finite set of commuting matrices....
AbstractLet (A,B)∈Cn×n×Cn×m and M be an (A,B)-invariant subspace. Let C(A,B) be the controllability ...
AbstractLet (A,B)∈Cn×n×Cn×m and let M be an (A,B)-invariant subspace. In this paper the following re...
Introduction In the present paper a review is given of the important system theoretic concept of (A...
AbstractLet (A,B)∈Cn×n×Cn×m and M be an (A,B)-invariant subspace. In this paper the following result...
AbstractWe study stability in classes of subspaces which are invariant under a self-adjoint matrix i...
Given an observable pair of matrices (C;A) we consider the manifold of (C;A)-invariant and observab...
Given a pair of matrices (A,B) we study the Lipschitz stability of its controlled invariant subspac...
Given an observable pair of matrices (C;A) we consider the manifold of (C;A)-invariant and observabl...
AbstractGiven an observable pair of matrices (C,A) we consider the manifold of (C,A)-invariant subsp...
• Characterization of stable invariant subspaces • of an endomorphism: done • of a pair of matric...
Given a nondegenerate sesquilinear inner product on a finite dimensional complex vector space, or a ...