In this paper we study the effects of a change in some exogenous variable (the number of players or a parameter in the payoff funtions) on the strategies played an payoffs obtained in a Nash equilibrium in the framework of an Aggregative Game (a generalization of the Cournot model). We assume a strong concavity condition which implies that the best reply function of any player is decreasing in the sum of the strategies of the remaining players(i.e. strategic subtitutin). Our results generalize and unify those known in the Cournot model.Publicad
Strategic Substitutes Under some conditions, parameterized games with strategic substitutes exhibit ...
An abstract notion of aggregative games is introduced and a pure strategy Nash equilibrium shown to ...
Under some conditions, parameterized games with strategic substitutes exhibit monotone comparative s...
In this paper we study the effects of a change in some exogenous variable (the number of players or ...
In this paper we study the effects of a change in sorne exogenous variable (the number of players o...
We provide general comparative static results for large finite and infinite-dimensional aggregative ...
Strategic Substitutes This paper studies comparative statics of equilibria in models where the optim...
Various Nash equilibrium results for a broad class of aggregative games are presented. The main ones...
We consider n-person games with quasi-concave payoffs that depend on a player's own action and the s...
A game is fully aggregative if payoffs and marginal payoffs depend only on a player's own strategy a...
A game is fully aggregative if payoffs and marginal payoffs depend only on a player's own strategy a...
This paper studies comparative statics of equilibria in models where the optimal responses under con...
This paper analyzes games with both strategic substitutes and strategic complements. Such games may ...
This thesis studies equilibrium problems in aggregative games. A game describes the interaction amon...
We study a class of games featuring payoff functions where best reply functions are orthogonal and t...
Strategic Substitutes Under some conditions, parameterized games with strategic substitutes exhibit ...
An abstract notion of aggregative games is introduced and a pure strategy Nash equilibrium shown to ...
Under some conditions, parameterized games with strategic substitutes exhibit monotone comparative s...
In this paper we study the effects of a change in some exogenous variable (the number of players or ...
In this paper we study the effects of a change in sorne exogenous variable (the number of players o...
We provide general comparative static results for large finite and infinite-dimensional aggregative ...
Strategic Substitutes This paper studies comparative statics of equilibria in models where the optim...
Various Nash equilibrium results for a broad class of aggregative games are presented. The main ones...
We consider n-person games with quasi-concave payoffs that depend on a player's own action and the s...
A game is fully aggregative if payoffs and marginal payoffs depend only on a player's own strategy a...
A game is fully aggregative if payoffs and marginal payoffs depend only on a player's own strategy a...
This paper studies comparative statics of equilibria in models where the optimal responses under con...
This paper analyzes games with both strategic substitutes and strategic complements. Such games may ...
This thesis studies equilibrium problems in aggregative games. A game describes the interaction amon...
We study a class of games featuring payoff functions where best reply functions are orthogonal and t...
Strategic Substitutes Under some conditions, parameterized games with strategic substitutes exhibit ...
An abstract notion of aggregative games is introduced and a pure strategy Nash equilibrium shown to ...
Under some conditions, parameterized games with strategic substitutes exhibit monotone comparative s...