International audienceIn this article, we propose a new merit function based on sub-additive functions for solving a general complementarity problem. This leads to consider an optimization problem that is equivalent to the NCP. In the case of a concave NCP this optimization problem is a Difference of Convex (DC) program and we can therefore use DC Algorithm to locally solve it. We prove that in the case of a monotone NCP, it is sufficient to compute a stationary point of the optimization problem to get a solution of the complementarity problems. In the case of a general NCP, assuming that a DC decomposition of the complementarity problem is known, we propose a penalization technique to reformulate the optimization problem as a DC program. N...
In this thesis, we study two generalizations of the classical linear complementarity problem (LCP) -...
In this paper, general linear complementarity problems (LCPs) are studied via global optimization pr...
A Mathematical Program with Linear Complementarity Constraints (MPLCC) is an optimization problem wh...
International audienceIn this article, we propose a new merit function based on sub-additive functio...
. Recently, much eort has been made in solving and analyzing the nonlinear complementarity problem (...
International audienceIn this paper, we discuss the solution of a Quadratic Eigenvalue Complementari...
International audienceWe address a large class of Mathematical Programs with Linear Complementarity ...
Abstract. A reformulation of the nonlinear complementarity problem (NCP) as an unconstrained minimiz...
Abstract In last decades, there has been much effort on the solution and the analysis of the nonline...
AbstractWe describe a “condition” number for the linear complementarity problem (LCP), which charact...
We propose a new approach to convex nonlinear multiobjective optimization that captures the geometry...
AbstractAn underlying general structure of complementary pivot theory is presented with applications...
Solutions to the linear complementarity problem (LCP) are naturally sparse in many applications such...
In this dissertation, we investigate approaches based on DC (Difference of Convex functions) program...
Recent improvements in the capabilities of complementarity solvers have led to an increased interest...
In this thesis, we study two generalizations of the classical linear complementarity problem (LCP) -...
In this paper, general linear complementarity problems (LCPs) are studied via global optimization pr...
A Mathematical Program with Linear Complementarity Constraints (MPLCC) is an optimization problem wh...
International audienceIn this article, we propose a new merit function based on sub-additive functio...
. Recently, much eort has been made in solving and analyzing the nonlinear complementarity problem (...
International audienceIn this paper, we discuss the solution of a Quadratic Eigenvalue Complementari...
International audienceWe address a large class of Mathematical Programs with Linear Complementarity ...
Abstract. A reformulation of the nonlinear complementarity problem (NCP) as an unconstrained minimiz...
Abstract In last decades, there has been much effort on the solution and the analysis of the nonline...
AbstractWe describe a “condition” number for the linear complementarity problem (LCP), which charact...
We propose a new approach to convex nonlinear multiobjective optimization that captures the geometry...
AbstractAn underlying general structure of complementary pivot theory is presented with applications...
Solutions to the linear complementarity problem (LCP) are naturally sparse in many applications such...
In this dissertation, we investigate approaches based on DC (Difference of Convex functions) program...
Recent improvements in the capabilities of complementarity solvers have led to an increased interest...
In this thesis, we study two generalizations of the classical linear complementarity problem (LCP) -...
In this paper, general linear complementarity problems (LCPs) are studied via global optimization pr...
A Mathematical Program with Linear Complementarity Constraints (MPLCC) is an optimization problem wh...