| Article ID: | iaor20172975 |
| Volume: | 7 |
| Issue: | 3 |
| Start Page Number: | 360 |
| End Page Number: | 385 |
| Publication Date: | Sep 2017 |
| Journal: | Dynamic Games and Applications |
| Authors: | Bernhard Pierre, Deschamps Marc |
| Keywords: | simulation |
We consider a dynamic game where additional players (assumed identical, even if there will be a mild departure from that hypothesis) join the game randomly according to a Bernoulli process. The problem solved here is that of computing their expected payoff as a function of time and the number of players present when they arrive, if the strategies are given. We consider both a finite horizon game and an infinite horizon, discounted game. As illustrations, we discuss some examples relating to oligopoly theory (Cournot, Stackelberg, cartel).