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...
AbstractWe present an efficient algorithm for obtaining a canonical system of Jordan chains for an n...
AbstractLet A be a fixed complex matrix and let u,v be two vectors. The eigenvalues of matrices A+τu...
We characterise all Jordan triple product homomorphisms, that is, mappings $\Phi$ satisfying $$ \Phi...
AbstractThe bialternate product of matrices was introduced at the end of the 19th century and recent...
AbstractThe well known bialternate product of two square matrices is re-examined together with anoth...
Elsner L, Monov V. The bialternate matrix product revisited. Linear Algebra and its Applications. 20...
AbstractThe well-known determinantal cinjecture of de Oliveira and Marcus (OMC) confines the determi...
AbstractWe consider a bimatroid (linking system) which has a natural one-to-one corre-spondence betw...
We describe combinatorial approaches to the question of whether families of real matrices admit pair...
AbstractIn this paper, an algorithm for the computation of the Jordan canonical form of regular matr...
AbstractThis paper studies the possible eigenvalues of the Jordan product XA+AX, when A is fixed and...
The relationship between the Jordan forms of the matrix products AB and BA for some given A and B w...
AbstractThis paper presents a criterion for high-codimensional bifurcations with several pairs of pu...
Given a real parameter-dependent matrix, we obtain an algorithm for computing the value of the param...
We consider a special class of Poisson brackets related to systems of ordinary differential equation...
AbstractWe present an efficient algorithm for obtaining a canonical system of Jordan chains for an n...
AbstractLet A be a fixed complex matrix and let u,v be two vectors. The eigenvalues of matrices A+τu...
We characterise all Jordan triple product homomorphisms, that is, mappings $\Phi$ satisfying $$ \Phi...
AbstractThe bialternate product of matrices was introduced at the end of the 19th century and recent...
AbstractThe well known bialternate product of two square matrices is re-examined together with anoth...
Elsner L, Monov V. The bialternate matrix product revisited. Linear Algebra and its Applications. 20...
AbstractThe well-known determinantal cinjecture of de Oliveira and Marcus (OMC) confines the determi...
AbstractWe consider a bimatroid (linking system) which has a natural one-to-one corre-spondence betw...
We describe combinatorial approaches to the question of whether families of real matrices admit pair...
AbstractIn this paper, an algorithm for the computation of the Jordan canonical form of regular matr...
AbstractThis paper studies the possible eigenvalues of the Jordan product XA+AX, when A is fixed and...
The relationship between the Jordan forms of the matrix products AB and BA for some given A and B w...
AbstractThis paper presents a criterion for high-codimensional bifurcations with several pairs of pu...
Given a real parameter-dependent matrix, we obtain an algorithm for computing the value of the param...
We consider a special class of Poisson brackets related to systems of ordinary differential equation...
AbstractWe present an efficient algorithm for obtaining a canonical system of Jordan chains for an n...
AbstractLet A be a fixed complex matrix and let u,v be two vectors. The eigenvalues of matrices A+τu...
We characterise all Jordan triple product homomorphisms, that is, mappings $\Phi$ satisfying $$ \Phi...