Start of Main Content
Author(s)

Justin Lenzo

Todd Sarver

We study a version of the multipopulation replicator dynamics, where each population is comprised of multiple subpopulations. We establish that correlated equilibrium is a natural solution concept in this setting. Specifically, we show that every correlated equilibrium is equivalent to a stationary state in the replicator dynamics of some subpopulation model. We also show that every interior stationary state, Lyapunov stable state, or limit of an interior solution is equivalent to a correlated equilibrium. We provide an example with a Lyapunov stable limit state whose equivalent correlated equilibrium lies outside the convex hull of the set of Nash equilibria. Finally, we prove that if the matching distribution is a product measure, a state satisfying any of the three conditions listed above is equivalent to a Nash equilibrium.
Date Published: 2006
Citations: Lenzo, Justin, Todd Sarver. 2006. Correlated Equilibrium in Evolutionary Models with Subpopulations. Games and Economic Behavior. (2)271-284.