New results are established for multiobjective DC programs with infinite convex constraints (MOPIC) that are defined on Banach spaces (finite or infinite dimensional) with objectives given as the difference of convex functions. This class of problems can also be called multiobjective DC semi-infinite and infinite programs, where decision variables run over finite-dimensional and infinite-dimensional spaces, respectively. Such problems have not been studied as yet. Necessary and sufficient optimality conditions for the weak Pareto efficiency are introduced. Further, we seek a connection between multiobjective linear infinite programs and MOPIC. Both Wolfe and Mond-Weir dual problems are presented, and corresponding weak, strong, and strict c...
Abstract In this paper, new classes of generalized (F,α,ρ, d)-V-type I functions are introduced for ...
AbstractIn this note, it is shown that, for an arbitrary semi-infinite convex program, there exists ...
AbstractUsing the theory of abstract optimization problems in infinite-dimensional spaces we provide...
AbstractThe concept of efficiency (Pareto optimum) is used to formulate duality for multiobjective n...
Abstract In this paper, we consider the mathematical programs with equilibrium constraints (MPECs) i...
AbstractIn 1961, Clark proved that if either the feasible region of a linear program or its dual is ...
AbstractIn this paper we have obtained Fritz-John type necessary optimality criteria for non-linear ...
AbstractFor a multiobjective nonlinear program which involved inequality and equality constraints, W...
AbstractEgudo derived some duality theorems for Multi-objective programs using the concept of effici...
In this article we discuss weak and strong duality properties of convex semi-infinite programming pr...
AbstractIn this paper we provide a duality theory for multiobjective optimization problems with conv...
In this paper, we study a nonsmooth semi-infinite multi-objective E-convex programming problem invol...
Fourier-Motzkin elimination is a projection algorithm for solving finite linear programs. We extend ...
This diploma thesis comprises of theoretical and practical part. In the theoretical part, we present...
In two recent papers Chabnes, Gbibie, and Kortanek studied a special class of infinite linear progra...
Abstract In this paper, new classes of generalized (F,α,ρ, d)-V-type I functions are introduced for ...
AbstractIn this note, it is shown that, for an arbitrary semi-infinite convex program, there exists ...
AbstractUsing the theory of abstract optimization problems in infinite-dimensional spaces we provide...
AbstractThe concept of efficiency (Pareto optimum) is used to formulate duality for multiobjective n...
Abstract In this paper, we consider the mathematical programs with equilibrium constraints (MPECs) i...
AbstractIn 1961, Clark proved that if either the feasible region of a linear program or its dual is ...
AbstractIn this paper we have obtained Fritz-John type necessary optimality criteria for non-linear ...
AbstractFor a multiobjective nonlinear program which involved inequality and equality constraints, W...
AbstractEgudo derived some duality theorems for Multi-objective programs using the concept of effici...
In this article we discuss weak and strong duality properties of convex semi-infinite programming pr...
AbstractIn this paper we provide a duality theory for multiobjective optimization problems with conv...
In this paper, we study a nonsmooth semi-infinite multi-objective E-convex programming problem invol...
Fourier-Motzkin elimination is a projection algorithm for solving finite linear programs. We extend ...
This diploma thesis comprises of theoretical and practical part. In the theoretical part, we present...
In two recent papers Chabnes, Gbibie, and Kortanek studied a special class of infinite linear progra...
Abstract In this paper, new classes of generalized (F,α,ρ, d)-V-type I functions are introduced for ...
AbstractIn this note, it is shown that, for an arbitrary semi-infinite convex program, there exists ...
AbstractUsing the theory of abstract optimization problems in infinite-dimensional spaces we provide...