Backward Linear-Quadratic Mean Field Stochastic Differential Games: A Direct Method

Abstract

This paper studies a linear-quadratic mean-field game of stochastic large-population system, where the large-population system satisfies a class of N weakly coupled linear backward stochastic differential equation. Different from the fixed-point approach commonly used to address large population problems, we first directly apply the maximum principle and decoupling techniques to solve a multi-agent problem, obtaining a centralized optimal strategy. Then, by letting N tend to infinity, we establish a decentralized optimal strategy. Subsequently, we prove that the decentralized optimal strategy constitutes an ε-Nash equilibrium for this game. Finally, we provide a numerical example to simulate our results.

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