Linear separation theorems, besides being important results in Convex Ananysis, play a central role in the proofs of several central theorems in other fields. Morover, several results as such can be proven to be equivalent in themselves to a suitable separation theorem. In this paper we start analysing such a phenomenon, showing that the "Dual Cone" theorem between dual pairs of linear spaces implies several separation results, and that it can be exploited for several purposes, such as chatacterising both maxima of convex sets and aolutions of convex optimisation problems
This book presents fundamentals and comprehensive results regarding duality for scalar, vector and s...
textabstractThe aim of this paper is to make a contribution to the investigation of the roots and es...
In this paper a generalized format for a constrained extremum problem is considered. Subsequently, t...
Linear separation theorems, besides being important results in Convex Ananysis, play a central role ...
Linear separation theorems, besides being important results in Convex Ananysis, play a central role ...
AbstractIn this note, a general cone separation theorem between two subsets of image space is presen...
Problems of minimizing a convex function or maximizing a concave function over a convex set are call...
textabstractThis paper presents a unified study of duality properties for the problem of minimizing ...
AbstractIn this paper we explore the duality relations that characterize least norm problems. The pa...
In this paper, we study the linear separation between a set and a convex cone. We introduce the conc...
In this paper we present two approaches to duality in multiple objective linear programming. The fir...
<p><span>The duality principle provides that optimization problems may be viewed from either of two ...
AbstractThis is the second of a series of three papers dealing with convexity spaces. In the first p...
In the paper, we describe various applications of closedness and duality theorems from previous work...
Given a primal-dual pair of linear programs, it is well known that if their optimal values are viewe...
This book presents fundamentals and comprehensive results regarding duality for scalar, vector and s...
textabstractThe aim of this paper is to make a contribution to the investigation of the roots and es...
In this paper a generalized format for a constrained extremum problem is considered. Subsequently, t...
Linear separation theorems, besides being important results in Convex Ananysis, play a central role ...
Linear separation theorems, besides being important results in Convex Ananysis, play a central role ...
AbstractIn this note, a general cone separation theorem between two subsets of image space is presen...
Problems of minimizing a convex function or maximizing a concave function over a convex set are call...
textabstractThis paper presents a unified study of duality properties for the problem of minimizing ...
AbstractIn this paper we explore the duality relations that characterize least norm problems. The pa...
In this paper, we study the linear separation between a set and a convex cone. We introduce the conc...
In this paper we present two approaches to duality in multiple objective linear programming. The fir...
<p><span>The duality principle provides that optimization problems may be viewed from either of two ...
AbstractThis is the second of a series of three papers dealing with convexity spaces. In the first p...
In the paper, we describe various applications of closedness and duality theorems from previous work...
Given a primal-dual pair of linear programs, it is well known that if their optimal values are viewe...
This book presents fundamentals and comprehensive results regarding duality for scalar, vector and s...
textabstractThe aim of this paper is to make a contribution to the investigation of the roots and es...
In this paper a generalized format for a constrained extremum problem is considered. Subsequently, t...