In John Nash’s proofs for the existence of (Nash) equilibria based on Brouwer’s theorem, an iteration mapping is used. A continuous- time analogue of the same mapping has been studied even earlier by Brown and von Neumann. This differential equation has recently been suggested as a plausible boundedly rational learning process in games. In the current paper we study this Brown-von Neumann-Nash dynamics for the case of continuous strategy spaces. We show that for continuous payoff functions, the set of rest points of the dynamics coincides with the set of Nash equilibria of the underlying game. We also study the asymptotic stability properties of rest points. While strict Nash equilibria may be unstable, we identify sufficient conditions for...
International audienceWhile payoff-based learning models are almost exclusively devised for finite a...
Louge F. On the stability of CSS under the replicator dynamic. Working Papers. Institute of Mathemat...
This paper studies the evolutionary stability of the unique Nash equilibrium of a first price sealed...
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...
Hofbauer J, Oechssler J, Riedel F. Brown–von Neumann–Nash Dynamics: The Continuous Strategy Case. Ga...
Diese Diplomarbeit untersucht evolutionäre Spieldynamiken für Spiele mit stetigen Strategieräumen. I...
Nashs three proofs for the existence of equilibria in strategic games correspond to three dynamics: ...
In the paper, we re-investigate the long run behavior of an adaptive learning process driven by the ...
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 ...
We show on a 4x4 example that many dynamics may eliminate all strategies used in correlated equilibr...
The study of evolutionary dynamics was so far mainly restricted to finite strategy spaces. In this p...
International audienceThis paper examines the convergence of a broad classof distributed learning dy...
International audienceWhile payoff-based learning models are almost exclusively devised for finite a...
Louge F. On the stability of CSS under the replicator dynamic. Working Papers. Institute of Mathemat...
This paper studies the evolutionary stability of the unique Nash equilibrium of a first price sealed...
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...
Hofbauer J, Oechssler J, Riedel F. Brown–von Neumann–Nash Dynamics: The Continuous Strategy Case. Ga...
Diese Diplomarbeit untersucht evolutionäre Spieldynamiken für Spiele mit stetigen Strategieräumen. I...
Nashs three proofs for the existence of equilibria in strategic games correspond to three dynamics: ...
In the paper, we re-investigate the long run behavior of an adaptive learning process driven by the ...
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 ...
We show on a 4x4 example that many dynamics may eliminate all strategies used in correlated equilibr...
The study of evolutionary dynamics was so far mainly restricted to finite strategy spaces. In this p...
International audienceThis paper examines the convergence of a broad classof distributed learning dy...
International audienceWhile payoff-based learning models are almost exclusively devised for finite a...
Louge F. On the stability of CSS under the replicator dynamic. Working Papers. Institute of Mathemat...
This paper studies the evolutionary stability of the unique Nash equilibrium of a first price sealed...