AbstractThe aim of this paper is to point out some sufficient constraint qualification conditions ensuring the boundedness of a set of Lagrange multipliers for vectorial optimization problems in infinite dimension. In some (smooth) cases these conditions turn out to be necessary for the existence of multipliers as well
AbstractThis paper investigates vector optimization problems with objective and the constraints are ...
In this paper, we present a new set-valued Lagrange multiplier theorem for constrained convex set-va...
In this paper, we establish a necessary optimality condition for a nondifferentiable vector extremum...
AbstractThe aim of this paper is to point out some sufficient constraint qualification conditions en...
Some recent work on dynamic incentive constraints poses the question of existence and regularity of ...
AbstractIn this paper an infinite dimensional generalized Lagrange multipliers rule for convex optim...
We consider the following optimization problem: in an abstract set X, find and element x that minimi...
We consider the following optimization problem: in an abstract set X, find and element x that minimi...
AbstractWe describe two methods for use in constrained optimization problems. One method computes gu...
Abstract. In this paper we study uniqueness of Lagrange multipliers in optimization problems subject...
The aim of this note is to show that recent results concerning regularity conditions and constraint ...
AbstractIn this paper, we study constrained multiobjective optimization problems with objectives bei...
The Lagrange multipliers method is used in mathematical analysis, in mechanics, in economics, and in...
Note:This thesis studies the behaviour of mathematical models in finite-dimensional optimization. Th...
We consider infinite programming problems with constraint sets defined by systems of infinite number...
AbstractThis paper investigates vector optimization problems with objective and the constraints are ...
In this paper, we present a new set-valued Lagrange multiplier theorem for constrained convex set-va...
In this paper, we establish a necessary optimality condition for a nondifferentiable vector extremum...
AbstractThe aim of this paper is to point out some sufficient constraint qualification conditions en...
Some recent work on dynamic incentive constraints poses the question of existence and regularity of ...
AbstractIn this paper an infinite dimensional generalized Lagrange multipliers rule for convex optim...
We consider the following optimization problem: in an abstract set X, find and element x that minimi...
We consider the following optimization problem: in an abstract set X, find and element x that minimi...
AbstractWe describe two methods for use in constrained optimization problems. One method computes gu...
Abstract. In this paper we study uniqueness of Lagrange multipliers in optimization problems subject...
The aim of this note is to show that recent results concerning regularity conditions and constraint ...
AbstractIn this paper, we study constrained multiobjective optimization problems with objectives bei...
The Lagrange multipliers method is used in mathematical analysis, in mechanics, in economics, and in...
Note:This thesis studies the behaviour of mathematical models in finite-dimensional optimization. Th...
We consider infinite programming problems with constraint sets defined by systems of infinite number...
AbstractThis paper investigates vector optimization problems with objective and the constraints are ...
In this paper, we present a new set-valued Lagrange multiplier theorem for constrained convex set-va...
In this paper, we establish a necessary optimality condition for a nondifferentiable vector extremum...
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