We consider the classical duality operators for convex objects suchas the polar of a convex set containing the origin, the dual norm,the Fenchel-transform of a convex function and the conjugate of aconvex cone. We give a new, sharper, unified treatment of the theoryof these operators, deriving generalized theorems of Hahn-Banach,Fenchel-Moreau and Dubovitsky-Milyutin for the conjugate of convexcones in not necessarily finite dimensional vector spaces and hencefor all the other duality operators of convex objects.
In this article we discuss weak and strong duality properties of convex semi-infinite programming pr...
AbstractBifunctional Duality, Lagrange Duality, and Fenchel Duality in convex programming are presen...
AbstractLet C be a convex set in Rn. For each y ϵ C, the cone of C at y, denoted by cone(y, C), is t...
textabstractWe consider the classical duality operators for convex objects such as the polar of a co...
textabstractThe aim of this paper is to make a contribution to the investigation of the roots and es...
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 ...
Via perturbational approach, we give an alternative dual problem for a general infinite dimensional ...
We provide definition of such a Fenchel-Young type duality for a convexifiable function f that its s...
preprint version The conjugate duality, which states that infx∈X φ(x, 0) = maxv∈Y ′ −φ∗(0, v), when...
In this paper, we present a generalization of Fenchel's conjugation and derive infimal convolution f...
AbstractWe introduce and study a new notion of conjugacy, similar to Fenchel conjugacy, in a non-con...
International audienceWe introduce and study a new notion of conjugacy, similar to Fenchel conjugacy...
The aim of this paper is to develop a conjugate duality theory for convex set–valued maps. The basic...
textabstractThis paper attempts to extend the notion of duality for convex cones, by basing it on a ...
In this article we discuss weak and strong duality properties of convex semi-infinite programming pr...
AbstractBifunctional Duality, Lagrange Duality, and Fenchel Duality in convex programming are presen...
AbstractLet C be a convex set in Rn. For each y ϵ C, the cone of C at y, denoted by cone(y, C), is t...
textabstractWe consider the classical duality operators for convex objects such as the polar of a co...
textabstractThe aim of this paper is to make a contribution to the investigation of the roots and es...
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 ...
Via perturbational approach, we give an alternative dual problem for a general infinite dimensional ...
We provide definition of such a Fenchel-Young type duality for a convexifiable function f that its s...
preprint version The conjugate duality, which states that infx∈X φ(x, 0) = maxv∈Y ′ −φ∗(0, v), when...
In this paper, we present a generalization of Fenchel's conjugation and derive infimal convolution f...
AbstractWe introduce and study a new notion of conjugacy, similar to Fenchel conjugacy, in a non-con...
International audienceWe introduce and study a new notion of conjugacy, similar to Fenchel conjugacy...
The aim of this paper is to develop a conjugate duality theory for convex set–valued maps. The basic...
textabstractThis paper attempts to extend the notion of duality for convex cones, by basing it on a ...
In this article we discuss weak and strong duality properties of convex semi-infinite programming pr...
AbstractBifunctional Duality, Lagrange Duality, and Fenchel Duality in convex programming are presen...
AbstractLet C be a convex set in Rn. For each y ϵ C, the cone of C at y, denoted by cone(y, C), is t...