Add to ORKGWe compute constrained equilibria satisfying an optimality condition. Important examples include convex programming, saddle problems, noncooperative games, and variational inequalities. Under a monotonicity hypothesis we show that equilibrium solutions can be found via iterative convex minimization. In the main algorithm each stage of computation requires two proximal steps, possibly using Bregman functions. One step serves to predict the next point; the other helps to correct the new prediction. To enhance practical applicability we tolerate numerical errors.
Several methods for solving systems of equilibrium problems in Hilbert spaces – and for find-ing bes...
ABSTRACT. We consider equilibrium constrained optimization problems, which have a general formulatio...
Equilibrium problems provide a mathematical framework which includes optimization, variational inequ...
We compute constrained equilibria satisfying an optimality condition. Important examples include con...
We consider problems where solutions -- called equilibria -- emerge as fixed points of an extremal m...
The main objective of this study is to introduce a new two-step proximal-type method to solve equili...
Abstract. A globally convergent algorithm for solving equilibrium prob-lems is proposed. The algorit...
This paper concerns developing two hybrid proximal point methods (PPMs) for finding a common solutio...
The paper introduces a proximal point algorithm for solving equilibrium problems on convex sets with...
Mathematical programming problems with equilibrium constraints (MPEC) are nonlinear programming prob...
We consider a general equilibrium problem defined on a convex set, whose cost bifunction may be nonm...
We consider potential games with mixed-integer variables, for which we propose two distributed, prox...
textabstractWe consider equilibrium constrained optimization problems, which have a general formulat...
We consider equilibrium constrained optimization problems, which have a general formulation that enc...
In the last years many solution methods for equilibrium problems (EPs) have been developed. Several ...
Several methods for solving systems of equilibrium problems in Hilbert spaces – and for find-ing bes...
ABSTRACT. We consider equilibrium constrained optimization problems, which have a general formulatio...
Equilibrium problems provide a mathematical framework which includes optimization, variational inequ...
We compute constrained equilibria satisfying an optimality condition. Important examples include con...
We consider problems where solutions -- called equilibria -- emerge as fixed points of an extremal m...
The main objective of this study is to introduce a new two-step proximal-type method to solve equili...
Abstract. A globally convergent algorithm for solving equilibrium prob-lems is proposed. The algorit...
This paper concerns developing two hybrid proximal point methods (PPMs) for finding a common solutio...
The paper introduces a proximal point algorithm for solving equilibrium problems on convex sets with...
Mathematical programming problems with equilibrium constraints (MPEC) are nonlinear programming prob...
We consider a general equilibrium problem defined on a convex set, whose cost bifunction may be nonm...
We consider potential games with mixed-integer variables, for which we propose two distributed, prox...
textabstractWe consider equilibrium constrained optimization problems, which have a general formulat...
We consider equilibrium constrained optimization problems, which have a general formulation that enc...
In the last years many solution methods for equilibrium problems (EPs) have been developed. Several ...
Several methods for solving systems of equilibrium problems in Hilbert spaces – and for find-ing bes...
ABSTRACT. We consider equilibrium constrained optimization problems, which have a general formulatio...
Equilibrium problems provide a mathematical framework which includes optimization, variational inequ...