Duality is studied for an abstract equilibrium problem which includes, among others, optimization problems and variational inequality problems. Following different schemes, various duals are proposed and primal-dual relationships are established under certain generalized convexity and generalized monotonicity assumptions. In a primal-dual setting, existence results for a solution are derived for different generalized monotone equilibrium problems within each duality scheme
Jointly convex generalized Nash equilibrium problems are the most studied class of generalized Nash ...
AbstractIn this paper, by applying new coincidence theorems due to the author, some existence theore...
We consider a generalized equilibrium problem involving DC functions. By using the properties of the...
Duality is studied for an abstract equilibrium problem which includes, among others, optimization pr...
AbstractThe aim of this paper is to introduce and study a dual problem associated to a generalized e...
The aim of this paper is to introduce and study a dual problem associated to a generalized equilibri...
We consider a generalized ε-vector equilibrium problem which contain vector equilibrium problems and...
A system of primal-dual variational inequalities, which appears in many equilibrium-type problems in...
AbstractIn this paper, we propose some dual formulations of generalized vector equilibrium problems....
Equilibrium problems, Duality, Fenchel conjugation, DC functions, Variational inequalities, 49N15, 5...
We extend the concept of relaxed α -monotonicity to mixed relaxed α - β -monotonicity. The concept o...
A function is convex if its epigraph is convex. This geometrical structure has very strong implicati...
In this paper, we propose some dual formulations of generalized vector equilib-rium problems. By usi...
In this paper, we introduce the concept of relaxed (ρ-θ)-η-invariant monotonicity to establish the e...
This work aims to investigate some applications of the conjugate duality for scalar and vector optim...
Jointly convex generalized Nash equilibrium problems are the most studied class of generalized Nash ...
AbstractIn this paper, by applying new coincidence theorems due to the author, some existence theore...
We consider a generalized equilibrium problem involving DC functions. By using the properties of the...
Duality is studied for an abstract equilibrium problem which includes, among others, optimization pr...
AbstractThe aim of this paper is to introduce and study a dual problem associated to a generalized e...
The aim of this paper is to introduce and study a dual problem associated to a generalized equilibri...
We consider a generalized ε-vector equilibrium problem which contain vector equilibrium problems and...
A system of primal-dual variational inequalities, which appears in many equilibrium-type problems in...
AbstractIn this paper, we propose some dual formulations of generalized vector equilibrium problems....
Equilibrium problems, Duality, Fenchel conjugation, DC functions, Variational inequalities, 49N15, 5...
We extend the concept of relaxed α -monotonicity to mixed relaxed α - β -monotonicity. The concept o...
A function is convex if its epigraph is convex. This geometrical structure has very strong implicati...
In this paper, we propose some dual formulations of generalized vector equilib-rium problems. By usi...
In this paper, we introduce the concept of relaxed (ρ-θ)-η-invariant monotonicity to establish the e...
This work aims to investigate some applications of the conjugate duality for scalar and vector optim...
Jointly convex generalized Nash equilibrium problems are the most studied class of generalized Nash ...
AbstractIn this paper, by applying new coincidence theorems due to the author, some existence theore...
We consider a generalized equilibrium problem involving DC functions. By using the properties of the...