AbstractThe bialternate product of matrices was introduced at the end of the 19th century and recently revived as a computational tool in problems where real matrices with conjugate pairs of pure imaginary eigenvalues are important, i.e., in stability theory and Hopf bifurcation problems. We give a complete description of the Jordan structure of the bialternate product 2A⊙In of an n×n matrix A, thus extending several partial results in the literature. We use these results to obtain regular (local) defining systems for some manifolds of matrices which occur naturally in applications, in particular for manifolds with resonant conjugate pairs of pure imaginary eigenvalues. Such defining systems can be used analytically to obtain local paramete...
AbstractLet G be a nonsingular n × n integer matrix. The structure of G is studied using methods fro...
AbstractWe show that any matrix perturbation of an n×n nilpotent complex matrix is similar to a matr...
We study the structured condition number of differentiable maps between smooth matrix manifolds, ext...
AbstractThe bialternate product of matrices was introduced at the end of the 19th century and recent...
Elsner L, Monov V. The bialternate matrix product revisited. Linear Algebra and its Applications. 20...
AbstractWe consider defining systems for manifolds of possibly nonsquare matrices. The functions are...
AbstractThe well known bialternate product of two square matrices is re-examined together with anoth...
AbstractIn this paper a complete description including multiplicity is given for the Jordan structur...
We construct some new local diffeomorphism that enables us to study submanifolds of matrices. Using ...
We study the local structure of Lie bialgebroids at regular points. In particular, we classify all t...
AbstractA complex matrix is said to be stable if all its eigenvalues have negative real part. Let J ...
Matrix theory has been one of the most utilised concepts in fuzzy models and neutrosophic models. Fr...
We shall study bifurcation and stability for nonlinear ordinary differential systems of arbitrary di...
Lambda-Matrices and Vibrating Systems presents aspects and solutions to problems concerned with line...
We study the structured condition number of differentiable maps between smooth matrix manifolds, dev...
AbstractLet G be a nonsingular n × n integer matrix. The structure of G is studied using methods fro...
AbstractWe show that any matrix perturbation of an n×n nilpotent complex matrix is similar to a matr...
We study the structured condition number of differentiable maps between smooth matrix manifolds, ext...
AbstractThe bialternate product of matrices was introduced at the end of the 19th century and recent...
Elsner L, Monov V. The bialternate matrix product revisited. Linear Algebra and its Applications. 20...
AbstractWe consider defining systems for manifolds of possibly nonsquare matrices. The functions are...
AbstractThe well known bialternate product of two square matrices is re-examined together with anoth...
AbstractIn this paper a complete description including multiplicity is given for the Jordan structur...
We construct some new local diffeomorphism that enables us to study submanifolds of matrices. Using ...
We study the local structure of Lie bialgebroids at regular points. In particular, we classify all t...
AbstractA complex matrix is said to be stable if all its eigenvalues have negative real part. Let J ...
Matrix theory has been one of the most utilised concepts in fuzzy models and neutrosophic models. Fr...
We shall study bifurcation and stability for nonlinear ordinary differential systems of arbitrary di...
Lambda-Matrices and Vibrating Systems presents aspects and solutions to problems concerned with line...
We study the structured condition number of differentiable maps between smooth matrix manifolds, dev...
AbstractLet G be a nonsingular n × n integer matrix. The structure of G is studied using methods fro...
AbstractWe show that any matrix perturbation of an n×n nilpotent complex matrix is similar to a matr...
We study the structured condition number of differentiable maps between smooth matrix manifolds, ext...