One of the most important optimality conditions to aid in solving a vector optimization problem is the first-order necessary optimality condition that generalizes the Karush-Kuhn-Tucker condition. However, to obtain the sufficient optimality conditions, it is necessary to impose additional assumptions on the objective functions and on the constraint set. The present work is concerned with the constrained vector quadratic fractional optimization problem. It shows that sufficient Pareto optimality conditions and the main duality theorems can be established without the assumption of generalized convexity in the objective functions, by considering some assumptions on a linear combination of Hessian matrices instead. The main aspect of this cont...
In this paper we suggest a general approach in studying optimality for a multiobjective problem. Fir...
Duality is studied for a minimization problem with finitely many inequality and equality constraints...
Abstract Duality is studied for a minimization problem with finitely many in-equality and equality c...
One of the most important optimality conditions to aid in solving a vector optimization problem is t...
AbstractUsing the scalar ε-parametric approach, we establish the Karush-Kuhn-Tucker (which we call K...
AbstractThis paper is concerned with the optimality conditions for nonsmooth and nonconvex vector ma...
summary:In this paper, we have studied the problem of minimizing the ratio of two indefinite quadrat...
Bilevel programs are optimization problems which have a subset of their variables constrained to be ...
AbstractBoth parametric and nonparametric necessary and sufficient optimality conditions are establi...
AbstractBoth parametric and nonparametric necessary and sufficient optimality conditions are establi...
AbstractWe establish the sufficient conditions for generalized fractional programming from a viewpoi...
Abstract. We establish sufficient optimality conditions for a class of nondif-ferentiable minimax fr...
AbstractWe establish the sufficient conditions for generalized fractional programming in the framewo...
We consider a fractional programming problem that minimizes the ratio of two indefinite quadratic fu...
The paper is devoted to the existence of global optimal solutions for a general class of nonsmooth p...
In this paper we suggest a general approach in studying optimality for a multiobjective problem. Fir...
Duality is studied for a minimization problem with finitely many inequality and equality constraints...
Abstract Duality is studied for a minimization problem with finitely many in-equality and equality c...
One of the most important optimality conditions to aid in solving a vector optimization problem is t...
AbstractUsing the scalar ε-parametric approach, we establish the Karush-Kuhn-Tucker (which we call K...
AbstractThis paper is concerned with the optimality conditions for nonsmooth and nonconvex vector ma...
summary:In this paper, we have studied the problem of minimizing the ratio of two indefinite quadrat...
Bilevel programs are optimization problems which have a subset of their variables constrained to be ...
AbstractBoth parametric and nonparametric necessary and sufficient optimality conditions are establi...
AbstractBoth parametric and nonparametric necessary and sufficient optimality conditions are establi...
AbstractWe establish the sufficient conditions for generalized fractional programming from a viewpoi...
Abstract. We establish sufficient optimality conditions for a class of nondif-ferentiable minimax fr...
AbstractWe establish the sufficient conditions for generalized fractional programming in the framewo...
We consider a fractional programming problem that minimizes the ratio of two indefinite quadratic fu...
The paper is devoted to the existence of global optimal solutions for a general class of nonsmooth p...
In this paper we suggest a general approach in studying optimality for a multiobjective problem. Fir...
Duality is studied for a minimization problem with finitely many inequality and equality constraints...
Abstract Duality is studied for a minimization problem with finitely many in-equality and equality c...