We analyse deterministic aggregative games, with large but finite number of players, that are subject to both local and coupling constraints. Firstly, we derive sufficient conditions for the existence of a generalized Nash equilibrium, by using the theory of variational inequalities together with the specific structure of the objective functions and constraints. Secondly, we present a coordination scheme, belonging to the class of asymmetric projection algorithms, and we prove that it converges R-linearly to a generalized Nash equilibrium. To this end, we extend the available results on asymmetric projection algorithms to our setting. Finally, we show that the proposed scheme can be implemented in a decentralized fashion and it is suitable ...
We consider quasi-aggregative games for large populations of heterogeneous agents, whose interaction...
This paper considers decentralized control and optimization methodologies for large populations of s...
In this paper, we deal with the problem of finding a Nash equilibrium for a generalized convex game....
We analyse deterministic aggregative games, with large but finite number of players, that are subjec...
We consider the framework of aggregative games, in which the cost function of each agent depends on ...
We consider the framework of aggregative games, in which the cost function of each agent depends on ...
This thesis studies equilibrium problems in aggregative games. A game describes the interaction amon...
We consider the framework of average aggregative games, where the cost function of each agent depend...
We study the existence and uniqueness of Nash equilibria for a certain class of aggregative games wi...
International audienceAggregative games have many industrial applications, and computing an equilibr...
We propose a two-layer, semi-decentralized algorithm to compute a local solution to the Stackelberg ...
We assess the robustness of equilibria in generalized Nash equilibrium problems in aggregative form ...
We consider quasi-aggregative games for large populations of heterogeneous agents, whose interaction...
We address the generalized Nash equilibrium seeking problem for a population of agents playing aggre...
We address the generalized Nash equilibrium seeking problem for a population of noncooperative agent...
We consider quasi-aggregative games for large populations of heterogeneous agents, whose interaction...
This paper considers decentralized control and optimization methodologies for large populations of s...
In this paper, we deal with the problem of finding a Nash equilibrium for a generalized convex game....
We analyse deterministic aggregative games, with large but finite number of players, that are subjec...
We consider the framework of aggregative games, in which the cost function of each agent depends on ...
We consider the framework of aggregative games, in which the cost function of each agent depends on ...
This thesis studies equilibrium problems in aggregative games. A game describes the interaction amon...
We consider the framework of average aggregative games, where the cost function of each agent depend...
We study the existence and uniqueness of Nash equilibria for a certain class of aggregative games wi...
International audienceAggregative games have many industrial applications, and computing an equilibr...
We propose a two-layer, semi-decentralized algorithm to compute a local solution to the Stackelberg ...
We assess the robustness of equilibria in generalized Nash equilibrium problems in aggregative form ...
We consider quasi-aggregative games for large populations of heterogeneous agents, whose interaction...
We address the generalized Nash equilibrium seeking problem for a population of agents playing aggre...
We address the generalized Nash equilibrium seeking problem for a population of noncooperative agent...
We consider quasi-aggregative games for large populations of heterogeneous agents, whose interaction...
This paper considers decentralized control and optimization methodologies for large populations of s...
In this paper, we deal with the problem of finding a Nash equilibrium for a generalized convex game....