论文信息 - An Algorithm for Computing Stochastically Stable Distributions with Applications to Multiagent Learning in Repeated Games

An Algorithm for Computing Stochastically Stable Distributions with Applications to Multiagent Learning in Repeated Games

One of the proposed solutions to the equilibrium selection problem for agents learning in repeated games is obtained via the notion of stochastic stability. Learning algorithms are perturbed so that the Markov chain underlying the learning dynamics is necessarily irreducible and yields a unique stable distribution. The stochastically stable distribution is the limit of these stable distributions as the perturbation rate tends to zero. We present the first exact algorithm for computing the stochastically stable distribution of a Markov chain. We use our algorithm to predict the long-term dynamics of simple learning algorithms in sample repeated games.

Amy Greenwald | John R. Wicks

[1] Glenn Ellison. Basins of Attraction, Long-Run Stochastic Stability, and the Speed of Step-by-Step Evolution , 2000 .

[2] Charles R. Johnson,et al. Matrix analysis , 1985, Statistical Inference for Engineers and Data Scientists.

[3] H. Young,et al. The Evolution of Conventions , 1993 .

[4] M. Freidlin,et al. Random Perturbations of Dynamical Systems , 1984 .

[5] H. Peyton Young,et al. Stochastic Evolutionary Game Dynamics , 1990 .

[6] H. Peyton Young,et al. Individual Strategy and Social Structure , 2020 .

[7] O. H. Brownlee,et al. ACTIVITY ANALYSIS OF PRODUCTION AND ALLOCATION , 1952 .

[8] R. Rob,et al. Learning, Mutation, and Long Run Equilibria in Games , 1993 .

[9] S. Hart,et al. A simple adaptive procedure leading to correlated equilibrium , 2000 .