English

Second order local minimal-time Mean Field Games

Analysis of PDEs 2022-12-23 v3

Abstract

The paper considers a forward-backward system of parabolic PDEs arising in a Mean Field Game (MFG) model where every agent controls the drift of a trajectory subject to Brownian diffusion, trying to escape a given bounded domain Ω\Omega in minimal expected time. Agents are constrained by a bound on the drift depending on the density of other agents at their location. Existence for a finite time horizon TT is proven via a fixed point argument, but the natural setting for this problem is in infinite time horizon. Estimates are needed to treat the limit TT\to\infty, and the asymptotic behavior of the solution obtained in this way is also studied. This passes through classical parabolic arguments and specific computations for MFGs. Both the Fokker--Planck equation on the density of agents and the Hamilton--Jacobi--Bellman equation on the value function display Dirichlet boundary conditions as a consequence of the fact that agents stop as soon as they reach Ω\partial\Omega. The initial datum for the density is given, and the long-time limit of the value function is characterized as the solution of a stationary problem.

Keywords

Cite

@article{arxiv.2005.11928,
  title  = {Second order local minimal-time Mean Field Games},
  author = {Romain Ducasse and Guilherme Mazanti and Filippo Santambrogio},
  journal= {arXiv preprint arXiv:2005.11928},
  year   = {2022}
}
R2 v1 2026-06-23T15:46:53.531Z