We propose an extended version of Chandrasekaran's method for general complementarity problems with multi-valued weakly off-diagonally antitone costmappings. It allows one either to construct a sequence converging to a solution or to recognize that the problem has no solutions. We also propose versions of Jacobi's methods for multi-valued inclusions subject to one- and two-side constraints. © 2011 Allerton Press, Inc
The complementarity problem is examined in the case where the basic mapping is the sum of a finite n...
We consider a generalized mixed complementarity problem (MCP) with box constraints and multi-valued ...
The complementarity problem is one of the basic topics in nonlinear analysis; however, the methods f...
We propose an extended version of Chandrasekaran's method for general complementarity problems with ...
We propose an extended version of Chandrasekaran's method for general complementarity problems with ...
We propose an extended version of Chandrasekaran's method for general complementarity problems with ...
We consider a generalized complementarity problem whose cost mapping is multi-valued and is the sum ...
We consider a generalized complementarity problem whose cost mapping is multi-valued and is the sum ...
We consider a generalized complementarity problem whose cost mapping is multi-valued and is the sum ...
The complementarity problem is examined in the case where the basic mapping is the sum of a finite n...
The complementarity problem is examined in the case where the basic mapping is the sum of a finite n...
We consider a generalized mixed complementarity problem (MCP) with box constraints and multi-valued ...
We consider a generalized mixed complementarity problem (MCP) with box constraints and multi-valued ...
We consider a generalized complementarity problem whose cost mapping is multi-valued and is the sum ...
We consider a generalized mixed complementarity problem (MCP) with box constraints and multi-valued ...
The complementarity problem is examined in the case where the basic mapping is the sum of a finite n...
We consider a generalized mixed complementarity problem (MCP) with box constraints and multi-valued ...
The complementarity problem is one of the basic topics in nonlinear analysis; however, the methods f...
We propose an extended version of Chandrasekaran's method for general complementarity problems with ...
We propose an extended version of Chandrasekaran's method for general complementarity problems with ...
We propose an extended version of Chandrasekaran's method for general complementarity problems with ...
We consider a generalized complementarity problem whose cost mapping is multi-valued and is the sum ...
We consider a generalized complementarity problem whose cost mapping is multi-valued and is the sum ...
We consider a generalized complementarity problem whose cost mapping is multi-valued and is the sum ...
The complementarity problem is examined in the case where the basic mapping is the sum of a finite n...
The complementarity problem is examined in the case where the basic mapping is the sum of a finite n...
We consider a generalized mixed complementarity problem (MCP) with box constraints and multi-valued ...
We consider a generalized mixed complementarity problem (MCP) with box constraints and multi-valued ...
We consider a generalized complementarity problem whose cost mapping is multi-valued and is the sum ...
We consider a generalized mixed complementarity problem (MCP) with box constraints and multi-valued ...
The complementarity problem is examined in the case where the basic mapping is the sum of a finite n...
We consider a generalized mixed complementarity problem (MCP) with box constraints and multi-valued ...
The complementarity problem is one of the basic topics in nonlinear analysis; however, the methods f...