We consider potential games with mixed-integer variables, for which we propose two distributed, proximal-like equilibrium seeking algorithms. Specifically, we focus on two scenarios: i) the underlying game is generalized ordinal and the agents update through iterations by choosing an exact optimal strategy; ii) the game admits an exact potential and the agents adopt approximated optimal responses. By exploiting the properties of integer-compatible regularization functions used as penalty terms, we show that both algorithms converge to either an exact or an epsilon-approximate equilibrium. We corroborate our findings on a numerical instance of a Cournot oligopoly model
Finding a Nash equilibrium of a game and in particular a bimatrix game is one of the most central pr...
We compute constrained equilibria satisfying an optimality condition. Important examples include con...
International audienceBayesian games offer a suitable framework for games where the utility degrees ...
We consider potential games with mixed-integer variables, for which we propose two distributed, prox...
We consider potential games with mixed-integer variables, for which we propose two distributed, prox...
We address the generalized Nash equilibrium seeking problem for a population of noncooperative agent...
We address the Nash equilibrium problem in a partial-decision information scenario, where each agent...
We present, to our knowledge, the first mixed integer pro-gram (MIP) formulations for finding Nash e...
We present, to our knowledge, the first mixed integer program (MIP) formulations for finding Nash equi...
We define and discuss different enumerative methods to compute solutions of generalized Nash equilib...
We consider the problem of computing a mixed-strategy generalized Nash equilibrium (MS-GNE) for a cl...
We consider generalized potential games, that constitute a fundamental subclass of generalized Nash ...
We develop an efficient algorithm for computing pure strategy Nash equilibria that satisfy various c...
Since the existence of at least one mixed Nash equilibrium (NE) for any game was proved by Nash, fin...
In an ε-Nash equilibrium, a player can gain at most ε by changing his behaviour. Recent work has add...
Finding a Nash equilibrium of a game and in particular a bimatrix game is one of the most central pr...
We compute constrained equilibria satisfying an optimality condition. Important examples include con...
International audienceBayesian games offer a suitable framework for games where the utility degrees ...
We consider potential games with mixed-integer variables, for which we propose two distributed, prox...
We consider potential games with mixed-integer variables, for which we propose two distributed, prox...
We address the generalized Nash equilibrium seeking problem for a population of noncooperative agent...
We address the Nash equilibrium problem in a partial-decision information scenario, where each agent...
We present, to our knowledge, the first mixed integer pro-gram (MIP) formulations for finding Nash e...
We present, to our knowledge, the first mixed integer program (MIP) formulations for finding Nash equi...
We define and discuss different enumerative methods to compute solutions of generalized Nash equilib...
We consider the problem of computing a mixed-strategy generalized Nash equilibrium (MS-GNE) for a cl...
We consider generalized potential games, that constitute a fundamental subclass of generalized Nash ...
We develop an efficient algorithm for computing pure strategy Nash equilibria that satisfy various c...
Since the existence of at least one mixed Nash equilibrium (NE) for any game was proved by Nash, fin...
In an ε-Nash equilibrium, a player can gain at most ε by changing his behaviour. Recent work has add...
Finding a Nash equilibrium of a game and in particular a bimatrix game is one of the most central pr...
We compute constrained equilibria satisfying an optimality condition. Important examples include con...
International audienceBayesian games offer a suitable framework for games where the utility degrees ...