AbstractIn a finite atomless measure space (X, Γ, μ), the optimization problem of vector-valued n-set functions defined on a convex subfamily S of Γn = Γ × … × Γ is investigated. The necessary and sufficient conditions of Pareto optimal solution or proper R+p-solution of optimization problem with differentiable vector valued n-set functions are given
The aim of this paper is to study necessary optimality conditions for vector valued problems having ...
This paper gives the formal definition of a class of optimization problems, that is, problems of fin...
AbstractWe consider two criteria of a solution associated with a set-valued optimization problem, a ...
[[abstract]]In a finite atomless measure space (X, Γ, μ), the optimization problem of vector-valued ...
AbstractIn a finite atomless measure space (X, Γ, μ), the optimization problem of vector-valued n-se...
AbstractThe necessary and sufficient conditions for the existence of an optimal solution of a vector...
[[abstract]]The necessary and sufficient conditions for the existence of an optimal solution of a ve...
[[abstract]]Let (X, F,/z) be a finite atomless measure space, 5e a convex subfamily of F, and Y and ...
AbstractThis paper deals with the minimization problems of set-valued maps in the real linear spaces...
Abstract The vector criterion and set criterion are two defining approaches of solutions for the set...
Abstract: In this paper, we define several relations of two sets with respect to an ordering convex ...
AbstractIn this paper we study necessary and sufficient optimality conditions for a set-valued optim...
AbstractLet X, Y, and Z be real topological vector spaces and E⊆c X be a convex set. C⊆Y, D⊆Z are to...
[[abstract]]Let X, Y, and Z be real topological vector spaces and Ec X be a convex set. CY, DZ are t...
AbstractIn this note, a general cone separation theorem between two subsets of image space is presen...
The aim of this paper is to study necessary optimality conditions for vector valued problems having ...
This paper gives the formal definition of a class of optimization problems, that is, problems of fin...
AbstractWe consider two criteria of a solution associated with a set-valued optimization problem, a ...
[[abstract]]In a finite atomless measure space (X, Γ, μ), the optimization problem of vector-valued ...
AbstractIn a finite atomless measure space (X, Γ, μ), the optimization problem of vector-valued n-se...
AbstractThe necessary and sufficient conditions for the existence of an optimal solution of a vector...
[[abstract]]The necessary and sufficient conditions for the existence of an optimal solution of a ve...
[[abstract]]Let (X, F,/z) be a finite atomless measure space, 5e a convex subfamily of F, and Y and ...
AbstractThis paper deals with the minimization problems of set-valued maps in the real linear spaces...
Abstract The vector criterion and set criterion are two defining approaches of solutions for the set...
Abstract: In this paper, we define several relations of two sets with respect to an ordering convex ...
AbstractIn this paper we study necessary and sufficient optimality conditions for a set-valued optim...
AbstractLet X, Y, and Z be real topological vector spaces and E⊆c X be a convex set. C⊆Y, D⊆Z are to...
[[abstract]]Let X, Y, and Z be real topological vector spaces and Ec X be a convex set. CY, DZ are t...
AbstractIn this note, a general cone separation theorem between two subsets of image space is presen...
The aim of this paper is to study necessary optimality conditions for vector valued problems having ...
This paper gives the formal definition of a class of optimization problems, that is, problems of fin...
AbstractWe consider two criteria of a solution associated with a set-valued optimization problem, a ...
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