International audienceIn this paper we give a conjugate duality approach for a strong bilevel programming problem (S). The approach is based on the use of a regularization of problem (S) and the so-called Fenchel-Lagrange duality. We first show that the regularized problem of (S) admits solutions and any accumulation point of a sequence of regularized solutions solves (S). Then, via this duality approach, we establish necessary and sufficient optimality conditions for the regularized problem. Finally, necessary and sufficient optimality conditions are given for the initial problem (S). We note that such an approach which allows us to apply the Fenchel-Lagrange duality to the class of strong bilevel programming problems is new in the literat...
Focus in the paper is on the definition of linear bilevel programming problems, the existence of opt...
Abstract In this article, we construct a Fenchel-Lagrangian ε-dual problem for set-valued opti-mizat...
We consider bilevel optimization from the optimistic point of view. Let the pair (x,y) denote the va...
International audienceIn this paper we give a conjugate duality approach for a strong bilevel progra...
International audienceIn this paper, for a bilevel programming problem (S) with an extremal-value fu...
In this paper, we exploit the so-called value function reformulation of the bilevel optimization pro...
International audienceIn this paper, we present a duality approach using conjugacy for a semivectori...
International audienceIn this paper we are interested in a strong bilevel programming problem (S). F...
Depuis son introduction, la programmation mathématique à deux niveaux suscite un intérêt toujours cr...
Via perturbational approach, we give an alternative dual problem for a general infinite dimensional ...
By means of a conjugation scheme based on generalized convex conjugation theory instead of Fenchel c...
[[abstract]]One of the interesting features of the bilevel programming problem is that its optimal s...
. The paper presents a decomposition based global optimization approach to bilevel linear and quadra...
Bilevel programs are optimization problems which have a subset of their variables constrained to be ...
Bilevel programming is characterized by two optimization problems located at different levels, in wh...
Focus in the paper is on the definition of linear bilevel programming problems, the existence of opt...
Abstract In this article, we construct a Fenchel-Lagrangian ε-dual problem for set-valued opti-mizat...
We consider bilevel optimization from the optimistic point of view. Let the pair (x,y) denote the va...
International audienceIn this paper we give a conjugate duality approach for a strong bilevel progra...
International audienceIn this paper, for a bilevel programming problem (S) with an extremal-value fu...
In this paper, we exploit the so-called value function reformulation of the bilevel optimization pro...
International audienceIn this paper, we present a duality approach using conjugacy for a semivectori...
International audienceIn this paper we are interested in a strong bilevel programming problem (S). F...
Depuis son introduction, la programmation mathématique à deux niveaux suscite un intérêt toujours cr...
Via perturbational approach, we give an alternative dual problem for a general infinite dimensional ...
By means of a conjugation scheme based on generalized convex conjugation theory instead of Fenchel c...
[[abstract]]One of the interesting features of the bilevel programming problem is that its optimal s...
. The paper presents a decomposition based global optimization approach to bilevel linear and quadra...
Bilevel programs are optimization problems which have a subset of their variables constrained to be ...
Bilevel programming is characterized by two optimization problems located at different levels, in wh...
Focus in the paper is on the definition of linear bilevel programming problems, the existence of opt...
Abstract In this article, we construct a Fenchel-Lagrangian ε-dual problem for set-valued opti-mizat...
We consider bilevel optimization from the optimistic point of view. Let the pair (x,y) denote the va...