Hofbauer J, Oechssler J, Riedel F. Brown–von Neumann–Nash Dynamics: The Continuous Strategy Case. Games and Economic Behavior. 2009;65(2):406-429.Brown and von Neumann introduced a dynamical system that converges to saddle points of zero sum,carries with finitely many strategies. Nash used the mapping underlying these dynamics to prove existence of equilibria in general games. The resulting Brown-von Neumann-Nash dynamics are a benchmark example for myopic adjustment dynamics that, in contrast to replicator dynamics. allow for innovation, but require less rationality than the best response dynamics. This paper studies the BNN dynamics for games with infinitely many strategies. We establish Nash stationarity for continuous payoff functions. ...
We study the repeated congestion game, in which multiple populations of players share resources, and...
We define and analyse three learning dynamics for two-player zero-sum discounted-payoff stochastic g...
We show that a strategy is a Nash equilibrium in a game with a continuum of players if and only if t...
In John Nash’s proofs for the existence of (Nash) equilibria based on Brouwer’s theorem, an iteratio...
In John Nash’s proofs for the existence of (Nash) equilibria based on Brouwer’s theorem, an iteratio...
In John Nash’s proofs for the existence of (Nash) equilibria based on Brouwer’s theorem, an iteratio...
Nashs three proofs for the existence of equilibria in strategic games correspond to three dynamics: ...
Diese Diplomarbeit untersucht evolutionäre Spieldynamiken für Spiele mit stetigen Strategieräumen. I...
In 1950, Nash proposed a natural equilibrium solution concept for games hence called Nash equilibriu...
We present a class of games with a pure strategy being strictly dominated by an-other pure strategy ...
The study of evolutionary dynamics was so far mainly restricted to finite strategy spaces. In this p...
Lahkar R, Riedel F. The logit dynamic for games with continuous strategy sets. Games and Economic Be...
A general framework for analyzing finite games will be introduced. The concept of an incentive funct...
The predominant paradigm in evolutionary game theory and more generally online learning in games is ...
Le fichier accessible ci-dessous est une version également éditée dans les Cahiers de la Chaire "Les...
We study the repeated congestion game, in which multiple populations of players share resources, and...
We define and analyse three learning dynamics for two-player zero-sum discounted-payoff stochastic g...
We show that a strategy is a Nash equilibrium in a game with a continuum of players if and only if t...
In John Nash’s proofs for the existence of (Nash) equilibria based on Brouwer’s theorem, an iteratio...
In John Nash’s proofs for the existence of (Nash) equilibria based on Brouwer’s theorem, an iteratio...
In John Nash’s proofs for the existence of (Nash) equilibria based on Brouwer’s theorem, an iteratio...
Nashs three proofs for the existence of equilibria in strategic games correspond to three dynamics: ...
Diese Diplomarbeit untersucht evolutionäre Spieldynamiken für Spiele mit stetigen Strategieräumen. I...
In 1950, Nash proposed a natural equilibrium solution concept for games hence called Nash equilibriu...
We present a class of games with a pure strategy being strictly dominated by an-other pure strategy ...
The study of evolutionary dynamics was so far mainly restricted to finite strategy spaces. In this p...
Lahkar R, Riedel F. The logit dynamic for games with continuous strategy sets. Games and Economic Be...
A general framework for analyzing finite games will be introduced. The concept of an incentive funct...
The predominant paradigm in evolutionary game theory and more generally online learning in games is ...
Le fichier accessible ci-dessous est une version également éditée dans les Cahiers de la Chaire "Les...
We study the repeated congestion game, in which multiple populations of players share resources, and...
We define and analyse three learning dynamics for two-player zero-sum discounted-payoff stochastic g...
We show that a strategy is a Nash equilibrium in a game with a continuum of players if and only if t...