International audienceA newly defined notion of convex closedness regarding a set is used in order to state a necessary and sufficient criterion for the min-sup property in non necessarily convex primal-dual optimization problems, generalizing well-known theorems valid in the convex setting. Our main result is then applied to the classical penalty method
Given a primal-dual pair of linear programs, it is well known that if their optimal values are viewe...
This thesis is centred around the topic of duality. It presents the classical duality theories in op...
We present a primal-dual algorithmic framework to obtain approximate solutions to a prototypical con...
We introduce and study a new dual condition which characterizes zero duality gap in nonsmooth convex...
<p><span>The duality principle provides that optimization problems may be viewed from either of two ...
International audienceThis article uses classical notions of convex analysis over Euclidean spaces, ...
ABSTRACT. This article uses classical notions of convex analysis over euclidean spaces, like Gale &a...
This article provides results guarateeing that the optimal value of a given convex infinite optimiza...
Primal or dual strong-duality (or min-sup, inf-max duality) in nonconvex optimization is revisited i...
Abstract. This article addresses a general criterion providing a zero duality gap for convex program...
Using tools provided by the theory of abstract convexity, we extend conditions for zero duality gap ...
AbstractWe examine a notion of duality which appears to be useful in situations where the usual conv...
We revisit the classic supporting hyperplane illustration of the duality gap for non-convex optimiza...
We start our discussion with a class of nondifferentiable minimax programming problems in complex sp...
AbstractThe main goal of this paper is to define a dual problem for a special non-convex, global opt...
Given a primal-dual pair of linear programs, it is well known that if their optimal values are viewe...
This thesis is centred around the topic of duality. It presents the classical duality theories in op...
We present a primal-dual algorithmic framework to obtain approximate solutions to a prototypical con...
We introduce and study a new dual condition which characterizes zero duality gap in nonsmooth convex...
<p><span>The duality principle provides that optimization problems may be viewed from either of two ...
International audienceThis article uses classical notions of convex analysis over Euclidean spaces, ...
ABSTRACT. This article uses classical notions of convex analysis over euclidean spaces, like Gale &a...
This article provides results guarateeing that the optimal value of a given convex infinite optimiza...
Primal or dual strong-duality (or min-sup, inf-max duality) in nonconvex optimization is revisited i...
Abstract. This article addresses a general criterion providing a zero duality gap for convex program...
Using tools provided by the theory of abstract convexity, we extend conditions for zero duality gap ...
AbstractWe examine a notion of duality which appears to be useful in situations where the usual conv...
We revisit the classic supporting hyperplane illustration of the duality gap for non-convex optimiza...
We start our discussion with a class of nondifferentiable minimax programming problems in complex sp...
AbstractThe main goal of this paper is to define a dual problem for a special non-convex, global opt...
Given a primal-dual pair of linear programs, it is well known that if their optimal values are viewe...
This thesis is centred around the topic of duality. It presents the classical duality theories in op...
We present a primal-dual algorithmic framework to obtain approximate solutions to a prototypical con...