Philippe Bergault, Pierre Cardaliaguet, Catherine Rainer
Published 2023-11-09Version 1
We investigate a stochastic differential game in which a major player has a private information (the knowledge of a random variable), which she discloses through her control to a population of small players playing in a Nash Mean Field Game equilibrium. The major player's cost depends on the distribution of the population, while the cost of the population depends on the random variable known by the major player. We show that the game has a relaxed solution and that the optimal control of the major player is approximatively optimal in games with a large but finite number of small players.
The evolutionary game of pressure (or interference), resistance and collaboration
Multiagent based state transition algorithm for global optimization
Mean Field Control and Mean Field Game Models with Several Populations
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