Duality theory is important in finding solutions to optimization problems. For example, in linear programming problems, the primal and dual problem pairs are closely related, i.e., if the optimal solution of one problem is known, then the optimal solution for the other problem can be obtained easily. In order for an optimization problem to be solved through the dual, the first step is to formulate its dual problem and analyze its characteristics. In this paper, we construct the dual model of an uncertain linear multi-objective optimization problem as well as its weak and strong duality criteria via conic duality. The multi-objective form of the problem is solved using the utility function method. In addition, the uncertainty is handled usin...
This paper considers an uncertain convex optimization problem, posed in a locally convex decision sp...
We treat in this paper linear programming (LP) problems with uncertain data. The focus is on uncerta...
Robust bi-level programming problems are a newborn branch of optimization theory. In this study, we ...
Abstract: We propose a new way to derive tractable robust counterparts of a linear conic optimizatio...
This paper deals with the robust strong duality for nonconvex optimization problem with the data unc...
This paper considers an uncertain convex optimization problem, posed in a locally convex decision sp...
The multiobjective optimization model studied in this paper deals with simultaneous minimization of ...
Robust and distributionally robust optimization are modeling paradigms for decision-making under unc...
Robust optimization has come out to be a potent approach to study mathematical problems with data un...
In this paper we present a robust conjugate duality theory for convex programming problems in the fa...
Abstract. In this paper, Mond-Weir type duality results for a uncertain multiobjective robust optimi...
The paper deals with optimization problems with uncertain constraints and linear perturbations of th...
In this work, we study optimization problems where some cost parameters are not known at decision ti...
This thesis deals with optimization problems with uncertain data. Uncertainty here means that the da...
In this paper we extend to a multi-objective optimization with a interval-valued function and real v...
This paper considers an uncertain convex optimization problem, posed in a locally convex decision sp...
We treat in this paper linear programming (LP) problems with uncertain data. The focus is on uncerta...
Robust bi-level programming problems are a newborn branch of optimization theory. In this study, we ...
Abstract: We propose a new way to derive tractable robust counterparts of a linear conic optimizatio...
This paper deals with the robust strong duality for nonconvex optimization problem with the data unc...
This paper considers an uncertain convex optimization problem, posed in a locally convex decision sp...
The multiobjective optimization model studied in this paper deals with simultaneous minimization of ...
Robust and distributionally robust optimization are modeling paradigms for decision-making under unc...
Robust optimization has come out to be a potent approach to study mathematical problems with data un...
In this paper we present a robust conjugate duality theory for convex programming problems in the fa...
Abstract. In this paper, Mond-Weir type duality results for a uncertain multiobjective robust optimi...
The paper deals with optimization problems with uncertain constraints and linear perturbations of th...
In this work, we study optimization problems where some cost parameters are not known at decision ti...
This thesis deals with optimization problems with uncertain data. Uncertainty here means that the da...
In this paper we extend to a multi-objective optimization with a interval-valued function and real v...
This paper considers an uncertain convex optimization problem, posed in a locally convex decision sp...
We treat in this paper linear programming (LP) problems with uncertain data. The focus is on uncerta...
Robust bi-level programming problems are a newborn branch of optimization theory. In this study, we ...