Decentralized Strategies for Backward Linear-Quadratic Mean Field Games and Teams
Abstract
This paper studies a new class of linear-quadratic mean field games and teams problem, where the large-population system satisfies a class of N weakly coupled linear backward stochastic differential equations (BSDEs), and zi (a part of solution of BSDE) enter the state equations and cost functionals. By virtue of stochastic maximum principle and optimal filter technique, we obtain a Hamiltonian system first, which is a fully coupled forward-backward stochastic differential equation (FBSDE). Decoupling the Hamiltonian system, we derive a feedback form optimal strategy by introducing Riccati equations, stochastic differential equation (SDE) and BSDE. Finally, we provide a numerical example to simulate our results.
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