Add to ORKGtextabstractThis paper presents a unified study of duality properties for the problem of minimizing a linear function over the intersection of an affine space with a convex cone in finite dimension. Existing duality results are carefully surveyed and some new duality properties are established. Examples are given to illustrate these new properties. The topics covered in this paper include Gordon-Stiemke type theorems, Farkas type theorems, perfect duality, Slater condition, regularization, Ramana's duality, and approximate dualities. The dual representations of various convex sets, convex cones and conic convex programs are also discussed
AbstractIn a recent paper D. J. White presented a new approach to the problem of minimizing a differ...
A convex semidefinite optimization problem with a conic constraint is considered. We formulate a Wol...
textabstractWe consider the classical duality operators for convex objects such as the polar of a co...
Problems of minimizing a convex function or maximizing a concave function over a convex set are call...
Problems of minimizing a convex function or maximizing a concave function over a convex set are call...
Given a primal-dual pair of linear programs, it is well known that if their optimal values are viewe...
Given a primal-dual pair of linear programs, it is well known that if their optimal values are viewe...
Any convex optimization problem may be represented as a conic problem that minimizes a linear functi...
In this article we discuss weak and strong duality properties of convex semi-infinite programming pr...
This thesis is centred around the topic of duality. It presents the classical duality theories in op...
We propose a new iterative approach for solving linear programs over convex cones. Assuming that Sla...
textabstractThe aim of this paper is to make a contribution to the investigation of the roots and es...
Strong duality for conic linear problems $(P)$ and $(D)$ generated by convex cones $S\subset X$, $T\...
AbstractThe asymptotic duality theory of linear programming over closed convex cones [4] is extended...
International audienceWe study the counterparts of conic linear programs, i.e., problems of optimiza...
AbstractIn a recent paper D. J. White presented a new approach to the problem of minimizing a differ...
A convex semidefinite optimization problem with a conic constraint is considered. We formulate a Wol...
textabstractWe consider the classical duality operators for convex objects such as the polar of a co...
Problems of minimizing a convex function or maximizing a concave function over a convex set are call...
Problems of minimizing a convex function or maximizing a concave function over a convex set are call...
Given a primal-dual pair of linear programs, it is well known that if their optimal values are viewe...
Given a primal-dual pair of linear programs, it is well known that if their optimal values are viewe...
Any convex optimization problem may be represented as a conic problem that minimizes a linear functi...
In this article we discuss weak and strong duality properties of convex semi-infinite programming pr...
This thesis is centred around the topic of duality. It presents the classical duality theories in op...
We propose a new iterative approach for solving linear programs over convex cones. Assuming that Sla...
textabstractThe aim of this paper is to make a contribution to the investigation of the roots and es...
Strong duality for conic linear problems $(P)$ and $(D)$ generated by convex cones $S\subset X$, $T\...
AbstractThe asymptotic duality theory of linear programming over closed convex cones [4] is extended...
International audienceWe study the counterparts of conic linear programs, i.e., problems of optimiza...
AbstractIn a recent paper D. J. White presented a new approach to the problem of minimizing a differ...
A convex semidefinite optimization problem with a conic constraint is considered. We formulate a Wol...
textabstractWe consider the classical duality operators for convex objects such as the polar of a co...
