AbstractIn the study of linear complementary problem, it is known that pseudomonotone matrices belong to the class P0 ∩ Q0. In this note we show that under certain conditions, such as invertibility or normality, the transpose of a pseudomonotone matrix belongs to the class Q0
AbstractLet V be a Euclidean Jordan algebra with symmetric cone K. We show that if a linear transfor...
AbstractThe classes of sufficient matrices and of P∗-matrices have recently arisen in connection wit...
AbstractIn this paper, we study and characterize various classes of matrices that are defined based ...
AbstractWe study general and complementarity properties of matrices which are either pseudomonotone ...
AbstractIn this paper we investigate a subclass W of the n × n real matrices. A matrix M belongs to ...
AbstractIn this paper we examine two well-known classes of matrices in linear complementarity theory...
AbstractWe introduce a new matrix class Pc, which consists of those matrices M for which the solutio...
AbstractWe pose and answer two questions about solutions of the linear complementarity problem (LCP)...
It is known that special types of linear complementarity problems can be solved in polynomial time, ...
AbstractThis paper deals with the class of Q-matrices, that is, the real n × n matrices M such that ...
AbstractIn this paper we consider the class C0f of fully copositive and the class E0f of fully semim...
AbstractIn 1966, Fiedler and Pták wrote the first systematic investigation of the matrix class P0 co...
AbstractWe continue an investigation of the class W of real square matrices. A matrix belongs to W i...
AbstractA matrix M ∈ Rn×n is in the class Q if for all q ∈ Rn there exist w, z ∈ Rn+ such that w − M...
AbstractLet E∗ denote the class of square matrices M such that the linear complementarity problem Mz...
AbstractLet V be a Euclidean Jordan algebra with symmetric cone K. We show that if a linear transfor...
AbstractThe classes of sufficient matrices and of P∗-matrices have recently arisen in connection wit...
AbstractIn this paper, we study and characterize various classes of matrices that are defined based ...
AbstractWe study general and complementarity properties of matrices which are either pseudomonotone ...
AbstractIn this paper we investigate a subclass W of the n × n real matrices. A matrix M belongs to ...
AbstractIn this paper we examine two well-known classes of matrices in linear complementarity theory...
AbstractWe introduce a new matrix class Pc, which consists of those matrices M for which the solutio...
AbstractWe pose and answer two questions about solutions of the linear complementarity problem (LCP)...
It is known that special types of linear complementarity problems can be solved in polynomial time, ...
AbstractThis paper deals with the class of Q-matrices, that is, the real n × n matrices M such that ...
AbstractIn this paper we consider the class C0f of fully copositive and the class E0f of fully semim...
AbstractIn 1966, Fiedler and Pták wrote the first systematic investigation of the matrix class P0 co...
AbstractWe continue an investigation of the class W of real square matrices. A matrix belongs to W i...
AbstractA matrix M ∈ Rn×n is in the class Q if for all q ∈ Rn there exist w, z ∈ Rn+ such that w − M...
AbstractLet E∗ denote the class of square matrices M such that the linear complementarity problem Mz...
AbstractLet V be a Euclidean Jordan algebra with symmetric cone K. We show that if a linear transfor...
AbstractThe classes of sufficient matrices and of P∗-matrices have recently arisen in connection wit...
AbstractIn this paper, we study and characterize various classes of matrices that are defined based ...
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