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Dynamic Games and Applications

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01-06-2014

Mean Field Games Models—A Brief Survey

Authors: Diogo A. Gomes, João Saúde

Published in: Dynamic Games and Applications | Issue 2/2014

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Abstract

The mean-field framework was developed to study systems with an infinite number of rational agents in competition, which arise naturally in many applications. The systematic study of these problems was started, in the mathematical community by Lasry and Lions, and independently around the same time in the engineering community by P. Caines, Minyi Huang, and Roland Malhamé. Since these seminal contributions, the research in mean-field games has grown exponentially, and in this paper we present a brief survey of mean-field models as well as recent results and techniques.

In the first part of this paper, we study reduced mean-field games, that is, mean-field games, which are written as a system of a Hamilton–Jacobi equation and a transport or Fokker–Planck equation. We start by the derivation of the models and by describing some of the existence results available in the literature. Then we discuss the uniqueness of a solution and propose a definition of relaxed solution for mean-field games that allows to establish uniqueness under minimal regularity hypothesis. A special class of mean-field games that we discuss in some detail is equivalent to the Euler–Lagrange equation of suitable functionals. We present in detail various additional examples, including extensions to population dynamics models. This section ends with a brief overview of the random variables point of view as well as some applications to extended mean-field games models. These extended models arise in problems where the costs incurred by the agents depend not only on the distribution of the other agents, but also on their actions.

The second part of the paper concerns mean-field games in master form. These mean-field games can be modeled as a partial differential equation in an infinite dimensional space. We discuss both deterministic models as well as problems where the agents are correlated. We end the paper with a mean-field model for price impact.

previous article Preface: DGAA 2nd Special Issue on Mean Field Games

next article Mean-Field Games and Dynamic Demand Management in Power Grids

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Title: Mean Field Games Models—A Brief Survey
Authors: Diogo A. Gomes
João Saúde
Publication date: 01-06-2014
Publisher: Springer US
Published in: Dynamic Games and Applications / Issue 2/2014
Print ISSN: 2153-0785
Electronic ISSN: 2153-0793
DOI: https://doi.org/10.1007/s13235-013-0099-2

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Other articles of this Issue 2/2014

On the Efficiency of Equilibria in Mean-Field Oscillator Games

Mean-Field Games and Dynamic Demand Management in Power Grids

Preface: DGAA 2nd Special Issue on Mean Field Games

On the Rate of Convergence for the Mean-Field Approximation of Controlled Diffusions with Large Number of Players

On the Planning Problem for the Mean Field Games System

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