Mixed-strategy equilibria are typically rather unstable in evolutionary game theory. "Monocyclic" games, such as Rock-Paper-Scissors, have only mixed equilibria, some of which are "stable" in the sense that sequential best replies lead to them; yet, even these games are prone to stable cycles under discrete-time simultaneous best replies, giving an unusual equilibrium-selection problem. This article analyzes such games in a random-utility setting where changing strategies is costly, and the speed of the dynamic is, thus, endogenous. The stochastically stable outcome is determined by the cost of switching strategies; when switching costs are high, mixed equilibria are selected, whereas when switching costs are low, cycles are selected
The aim of this thesis is to investigate experimentally the reliability of the predictions of evolut...
We consider a simple model of stochastic evolution in population games. In our model, each agent occ...
By applying a technique previously developed to study ecosystem assembly [Capitán et al., Phys. Rev....
Evolution, Switching costs, Mixed-strategy equilibrium, Cycles, Stochastic stability,
We consider stability properties of equilibria in stochastic evolutionary dynamics. In particular, w...
Traditional game theory studies strategic interactions in which the agents make rational decisions. ...
The object of game theory is to choose a strategy that will resolve conflicts, with the highest payo...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Economics, 2003.Includes bibliograp...
Evolutionary game theory is a formal framework which enables one to model how behaviour in large pop...
We investigate evolutionary adaptation in a repeated coordination game with strategic uncertainty. ...
Abstract: This paper investigates stability properties of evolutionary selection dynamics in normal ...
Standard evolutionary game models select the risk-dominant equilibrium, even if it is not efficient....
This paper models stochastic evolutionary coordination games with inertia driven by switching costs....
Abstract: We investigate the equilibrium selection problem in n-person binary coordina-tion games by...
We study the evolutionary dynamics of strategies in finite populations which are homogeneous and wel...
The aim of this thesis is to investigate experimentally the reliability of the predictions of evolut...
We consider a simple model of stochastic evolution in population games. In our model, each agent occ...
By applying a technique previously developed to study ecosystem assembly [Capitán et al., Phys. Rev....
Evolution, Switching costs, Mixed-strategy equilibrium, Cycles, Stochastic stability,
We consider stability properties of equilibria in stochastic evolutionary dynamics. In particular, w...
Traditional game theory studies strategic interactions in which the agents make rational decisions. ...
The object of game theory is to choose a strategy that will resolve conflicts, with the highest payo...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Economics, 2003.Includes bibliograp...
Evolutionary game theory is a formal framework which enables one to model how behaviour in large pop...
We investigate evolutionary adaptation in a repeated coordination game with strategic uncertainty. ...
Abstract: This paper investigates stability properties of evolutionary selection dynamics in normal ...
Standard evolutionary game models select the risk-dominant equilibrium, even if it is not efficient....
This paper models stochastic evolutionary coordination games with inertia driven by switching costs....
Abstract: We investigate the equilibrium selection problem in n-person binary coordina-tion games by...
We study the evolutionary dynamics of strategies in finite populations which are homogeneous and wel...
The aim of this thesis is to investigate experimentally the reliability of the predictions of evolut...
We consider a simple model of stochastic evolution in population games. In our model, each agent occ...
By applying a technique previously developed to study ecosystem assembly [Capitán et al., Phys. Rev....