In the context of simple finite-state discrete time systems, we introduce a generalization of mean field game solution, called correlated solution, which can be seen as the mean field game analogue of a correlated equilibrium. Our notion of solution is justified in two ways: We prove that correlated solutions arise as limits of exchangeable correlated equilibria in restricted (Markov open-loop) strategies for the underlying $N$-player games, and we show how to construct approximate $N$-player correlated equilibria starting from a correlated solution to the mean field game.
Correlated equilibria and mean field games: a simple model / L. Campi, M. Fischer. - In: MATHEMATICS OF OPERATIONS RESEARCH. - ISSN 0364-765X. - 47:3(2022 Aug), pp. C2.1-C2.20. [10.1287/moor.2021.1206]
Correlated equilibria and mean field games: a simple model
L. CampiPrimo
;
2022
Abstract
In the context of simple finite-state discrete time systems, we introduce a generalization of mean field game solution, called correlated solution, which can be seen as the mean field game analogue of a correlated equilibrium. Our notion of solution is justified in two ways: We prove that correlated solutions arise as limits of exchangeable correlated equilibria in restricted (Markov open-loop) strategies for the underlying $N$-player games, and we show how to construct approximate $N$-player correlated equilibria starting from a correlated solution to the mean field game.
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