AbstractWe continue an investigation of the class W of real square matrices. A matrix belongs to W if and only if certain pairs of its complementary cones intersect in the zero vector only. We show that a W matrix with no zero diagonal entries is a P0 matrix (each principal minor is nonnegative), and a W matrix with no nonzero diagonal entries is a nonnegative matrix which either is monomial or has a zero column. Lastly, we show how these two results impose certain necessary conditions on the structure of a W matrix
AbstractWe investigate classes of real square matrices possessing some weakened from of strict diago...
AbstractGeneralizing the concept of W0-pair of Willson, we introduce the notions of column (row) W0-...
• A matrix is a weakly sign symmetric P0-matrix (wss P0-matrix), if and only if every principal mino...
AbstractWe continue an investigation of the class W of real square matrices. A matrix belongs to W i...
A linear structure is a family of matrices that satisfy a given set of linear restrictions, such as ...
A P0-matrix is a real square matrix all of whose principle minors are nonnegative. In this paper, we...
AbstractA matrix M ∈ Rn×n is in the class Q if for all q ∈ Rn there exist w, z ∈ Rn+ such that w − M...
AbstractIn 1966, Fiedler and Pták wrote the first systematic investigation of the matrix class P0 co...
AbstractThe class of real matrices which are both monotone (inverse positive) and positive stable is...
AbstractThe purpose of this paper is to characterize and interrelate various degrees of stability an...
AbstractThis paper concerns the cone of positive semidefinite matrices which have zeros in prescribe...
International audienceLet A be an element of the copositive cone C^n. A zero u of A is a nonzero non...
AbstractBapat et al. previously described a class of nonnegative matrices dominated by a nonnegative...
AbstractLet A be a real n × n matrix. A is TP (totally positive) if all the minors of A are nonnegat...
AbstractIf K is a cone in Rn we let Γ(K) denote the cone in the space Mn of nXn matrices consisting ...
AbstractWe investigate classes of real square matrices possessing some weakened from of strict diago...
AbstractGeneralizing the concept of W0-pair of Willson, we introduce the notions of column (row) W0-...
• A matrix is a weakly sign symmetric P0-matrix (wss P0-matrix), if and only if every principal mino...
AbstractWe continue an investigation of the class W of real square matrices. A matrix belongs to W i...
A linear structure is a family of matrices that satisfy a given set of linear restrictions, such as ...
A P0-matrix is a real square matrix all of whose principle minors are nonnegative. In this paper, we...
AbstractA matrix M ∈ Rn×n is in the class Q if for all q ∈ Rn there exist w, z ∈ Rn+ such that w − M...
AbstractIn 1966, Fiedler and Pták wrote the first systematic investigation of the matrix class P0 co...
AbstractThe class of real matrices which are both monotone (inverse positive) and positive stable is...
AbstractThe purpose of this paper is to characterize and interrelate various degrees of stability an...
AbstractThis paper concerns the cone of positive semidefinite matrices which have zeros in prescribe...
International audienceLet A be an element of the copositive cone C^n. A zero u of A is a nonzero non...
AbstractBapat et al. previously described a class of nonnegative matrices dominated by a nonnegative...
AbstractLet A be a real n × n matrix. A is TP (totally positive) if all the minors of A are nonnegat...
AbstractIf K is a cone in Rn we let Γ(K) denote the cone in the space Mn of nXn matrices consisting ...
AbstractWe investigate classes of real square matrices possessing some weakened from of strict diago...
AbstractGeneralizing the concept of W0-pair of Willson, we introduce the notions of column (row) W0-...
• A matrix is a weakly sign symmetric P0-matrix (wss P0-matrix), if and only if every principal mino...