In the case that the matrix of a linear complementarity problem consists of the sum of a positive semi-definite matrix and a co-positive matrix a general condition is deduced implying that the Lemke algorithm will terminate with a complementarity solution. Applications are presented on bi-matrix games, convex quadratic programming and multi-period programs
In this report we discuss the set of copositive plus matrices and their properties. We examine certa...
Linear complementarity problems are considered in the paper aiming at the investigation of the solut...
Although LCP(q,M), where M is a general integer matrix, is NP-complete, LCPs corresponding to intege...
This study centers on the task of efficiently finding a solution of the linear complementarity probl...
We define the Linear Complementarity Problem (LCP) and outline its applications including those to L...
AbstractIn this article, we consider positive subdefinite matrices (PSBD) recently studied by J.-P. ...
In this paper, we present a new approach in order to solve the linear complementary problem noted (L...
In this paper, we present a theoretical and numerical study of linear complementary problems solvabl...
AbstractWe introduce a new matrix class Pc, which consists of those matrices M for which the solutio...
It is shown that the linear complementarity problem of finding an n-by-1 vector x such that Mx + q ...
An iterative scheme is given for solving the linear complementarity problem x> 0, Mx + q> 0, x...
We introduce a new matrix class Pc , which consists of those matrices M for which the solution set o...
The plain Newton-min algorithm to solve the linear complementarity problem (LCP for short) 0 £ x^(Mx...
Lemke’s algorithm is a pivotal kind of algorithm which is developed based on principal pivot transfo...
Abstract — The linear complementarity problem (LCP) is a general problem that unifies linear and qua...
In this report we discuss the set of copositive plus matrices and their properties. We examine certa...
Linear complementarity problems are considered in the paper aiming at the investigation of the solut...
Although LCP(q,M), where M is a general integer matrix, is NP-complete, LCPs corresponding to intege...
This study centers on the task of efficiently finding a solution of the linear complementarity probl...
We define the Linear Complementarity Problem (LCP) and outline its applications including those to L...
AbstractIn this article, we consider positive subdefinite matrices (PSBD) recently studied by J.-P. ...
In this paper, we present a new approach in order to solve the linear complementary problem noted (L...
In this paper, we present a theoretical and numerical study of linear complementary problems solvabl...
AbstractWe introduce a new matrix class Pc, which consists of those matrices M for which the solutio...
It is shown that the linear complementarity problem of finding an n-by-1 vector x such that Mx + q ...
An iterative scheme is given for solving the linear complementarity problem x> 0, Mx + q> 0, x...
We introduce a new matrix class Pc , which consists of those matrices M for which the solution set o...
The plain Newton-min algorithm to solve the linear complementarity problem (LCP for short) 0 £ x^(Mx...
Lemke’s algorithm is a pivotal kind of algorithm which is developed based on principal pivot transfo...
Abstract — The linear complementarity problem (LCP) is a general problem that unifies linear and qua...
In this report we discuss the set of copositive plus matrices and their properties. We examine certa...
Linear complementarity problems are considered in the paper aiming at the investigation of the solut...
Although LCP(q,M), where M is a general integer matrix, is NP-complete, LCPs corresponding to intege...
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