Metastability in Stochastic Replicator Dynamics
Probability
2018-05-09 v2 Computer Science and Game Theory
Dynamical Systems
Optimization and Control
Abstract
We consider a novel model of stochastic replicator dynamics for potential games that converts to a Langevin equation on a sphere after a change of variables. This is distinct from the models studied earlier. In particular, it is ill-posed due to non-uniqueness of solutions, but is amenable to a natural selection principle that picks a unique solution. The model allows us to make specific statements regarding metastable states such as small noise asymptotics for mean exit times from their domain of attraction, and quasi-stationary measures. We illustrate the general results by specializing them to replicator dynamics on graphs and demonstrate that the numerical experiments support theoretical predictions.
Cite
@article{arxiv.1801.02161,
title = {Metastability in Stochastic Replicator Dynamics},
author = {Konstantin Avrachenkov and Vivek S. Borkar},
journal= {arXiv preprint arXiv:1801.02161},
year = {2018}
}
Comments
39 pages, 7 figures