AbstractThe existence and construction of common invariant cones for families of real matrices is considered. The complete results are obtained for 2×2 matrices (with no additional restrictions) and for families of simultaneously diagonalizable matrices of any size. Families of matrices with a shared dominant eigenvector are considered under some additional conditions
AbstractA finite rational procedure of the Shemesh type is proposed to check whether given complex n...
AbstractLet A be an n×n matrix. It is a relatively simple process to construct a homogeneous ideal (...
AbstractA necessary and sufficient condition for any set of matrices to have an eigenvector in commo...
The existence and construction of common invariant cones for families of real matrices is considered...
AbstractThe existence and construction of common invariant cones for families of real matrices is co...
AbstractWe establish a criterion for a finite family of matrices to possess a common invariant cone....
AbstractMotivated by a differential continuous-time switching model for gene and neural networks, we...
In this survey we collect and revisit some notions and results regarding the theory of cones and mat...
AbstractThe main purpose of this paper is to study common invariant subspaces of any matrix in the c...
AbstractWe generalize many known results on a nonnegative matrix concerning linear inequalities, Col...
[[abstract]]For an n x n nonnegative matrix P, an isomorphism is obtained between the lattice of ini...
In this paper, based on algebraic arguments, a new proof of the spectral characterization of those r...
AbstractRecently, several research efforts showed that the analysis of joint spectral characteristic...
AbstractIt is shown that square matrices A and B have a common invariant subspace W of dimension k⩾1...
AbstractWe characterize the exposed faces of convex sets C of symmetric matrices, invariant under or...
AbstractA finite rational procedure of the Shemesh type is proposed to check whether given complex n...
AbstractLet A be an n×n matrix. It is a relatively simple process to construct a homogeneous ideal (...
AbstractA necessary and sufficient condition for any set of matrices to have an eigenvector in commo...
The existence and construction of common invariant cones for families of real matrices is considered...
AbstractThe existence and construction of common invariant cones for families of real matrices is co...
AbstractWe establish a criterion for a finite family of matrices to possess a common invariant cone....
AbstractMotivated by a differential continuous-time switching model for gene and neural networks, we...
In this survey we collect and revisit some notions and results regarding the theory of cones and mat...
AbstractThe main purpose of this paper is to study common invariant subspaces of any matrix in the c...
AbstractWe generalize many known results on a nonnegative matrix concerning linear inequalities, Col...
[[abstract]]For an n x n nonnegative matrix P, an isomorphism is obtained between the lattice of ini...
In this paper, based on algebraic arguments, a new proof of the spectral characterization of those r...
AbstractRecently, several research efforts showed that the analysis of joint spectral characteristic...
AbstractIt is shown that square matrices A and B have a common invariant subspace W of dimension k⩾1...
AbstractWe characterize the exposed faces of convex sets C of symmetric matrices, invariant under or...
AbstractA finite rational procedure of the Shemesh type is proposed to check whether given complex n...
AbstractLet A be an n×n matrix. It is a relatively simple process to construct a homogeneous ideal (...
AbstractA necessary and sufficient condition for any set of matrices to have an eigenvector in commo...