English

Entropic optimal planning for path-dependent mean field games

Optimization and Control 2023-05-19 v2

Abstract

In the context of mean field games, with possible control of the diffusion coefficient, we consider a path-dependent version of the planning problem introduced by P.L. Lions: given a pair of marginal distributions (μ0,μ1)(\mu_0, \mu_1), find a specification of the game problem starting from the initial distribution μ0\mu_0, and inducing the target distribution μ1\mu_1 at the mean field game equilibrium. Our main result reduces the path-dependent planning problem into an embedding problem, that is, constructing a McKean-Vlasov dynamics with given marginals (μ0,μ1)(\mu_0,\mu_1). Some sufficient conditions on (μ0,μ1)(\mu_0,\mu_1) are provided to guarantee the existence of solutions. We also characterize, up to integrability, the minimum entropy solution of the planning problem. In particular, as uniqueness does not hold anymore in our path-dependent setting, one can naturally introduce an optimal planning problem which would be reduced to an optimal transport problem along with controlled McKean-Vlasov dynamics.

Keywords

Cite

@article{arxiv.2203.07019,
  title  = {Entropic optimal planning for path-dependent mean field games},
  author = {Zhenjie Ren and Xiaolu Tan and Nizar Touzi and Junjian Yang},
  journal= {arXiv preprint arXiv:2203.07019},
  year   = {2023}
}
R2 v1 2026-06-24T10:12:13.044Z