AbstractThis research paper is devoted to establish the coincidence between Choquet boundaries and a new type of approximate efficient points sets in ordered Hausdorff locally convex spaces, being based on the first result established by us concerning such a property as this for Pareto-type efficient points sets and the corresponding Choquet boundaries of non-empty compact sets, with respect to appropriate convex cones of real, increasing and continuous functions. Thus, the main result represents a strong connection between two great fields of mathematics: The Axiomatic Theory of Potential and Vector Optimization. The present study contains also important relationships concerning strong optimization and approximate efficiency, interesting e...
Abstract In this paper, we introduce a new kind of approximate weakly efficient solutions to the set...
We study maximal points in a locally convex space partially ordered by a convex cone with a bounded ...
We study a notion of well-posedness in vector optimization through the behaviour of minimizing seque...
This research paper is devoted to the study of the properties for Pareto-type efficient point sets i...
AbstractThis research paper is devoted to establish the coincidence between Choquet boundaries and a...
Recently Benson proposed a definition for extending Geoffrion's concept of proper efficiency to the ...
AbstractRecently Benson proposed a definition for extending Geoffrion's concept of proper efficiency...
AbstractWe consider the constrained vector optimization problem minCf(x), x∈A, where X and Y are nor...
We introduce a new concept of efficiency in vector optimization. This concept, super efficiency, is ...
We consider the constrained vector optimization problem min(C) f (x), x is an element of A, where X ...
Let $E $ be alocally convex topological vector space over the real number field $\mathbb{R} $ , $K $...
This project is a literature survey of various theorems and their applications in Choquet theory. Fo...
The connectivity of the efficient point set and of some proper efficient point sets in locally conve...
AbstractIn this paper we give sufficient conditions for a set and/or a cone ensuring the density of ...
We consider the problem of finding the set of proper minimal (proper efficient, proper Pareto optima...
Abstract In this paper, we introduce a new kind of approximate weakly efficient solutions to the set...
We study maximal points in a locally convex space partially ordered by a convex cone with a bounded ...
We study a notion of well-posedness in vector optimization through the behaviour of minimizing seque...
This research paper is devoted to the study of the properties for Pareto-type efficient point sets i...
AbstractThis research paper is devoted to establish the coincidence between Choquet boundaries and a...
Recently Benson proposed a definition for extending Geoffrion's concept of proper efficiency to the ...
AbstractRecently Benson proposed a definition for extending Geoffrion's concept of proper efficiency...
AbstractWe consider the constrained vector optimization problem minCf(x), x∈A, where X and Y are nor...
We introduce a new concept of efficiency in vector optimization. This concept, super efficiency, is ...
We consider the constrained vector optimization problem min(C) f (x), x is an element of A, where X ...
Let $E $ be alocally convex topological vector space over the real number field $\mathbb{R} $ , $K $...
This project is a literature survey of various theorems and their applications in Choquet theory. Fo...
The connectivity of the efficient point set and of some proper efficient point sets in locally conve...
AbstractIn this paper we give sufficient conditions for a set and/or a cone ensuring the density of ...
We consider the problem of finding the set of proper minimal (proper efficient, proper Pareto optima...
Abstract In this paper, we introduce a new kind of approximate weakly efficient solutions to the set...
We study maximal points in a locally convex space partially ordered by a convex cone with a bounded ...
We study a notion of well-posedness in vector optimization through the behaviour of minimizing seque...