English

Mean-Field Games with Differing Beliefs for Algorithmic Trading

Mathematical Finance 2019-12-13 v2

Abstract

Even when confronted with the same data, agents often disagree on a model of the real-world. Here, we address the question of how interacting heterogenous agents, who disagree on what model the real-world follows, optimize their trading actions. The market has latent factors that drive prices, and agents account for the permanent impact they have on prices. This leads to a large stochastic game, where each agents' performance criteria are computed under a different probability measure. We analyse the mean-field game (MFG) limit of the stochastic game and show that the Nash equilibrium is given by the solution to a non-standard vector-valued forward-backward stochastic differential equation. Under some mild assumptions, we construct the solution in terms of expectations of the filtered states. Furthermore, we prove the MFG strategy forms an ϵ\epsilon-Nash equilibrium for the finite player game. Lastly, we present a least-squares Monte Carlo based algorithm for computing the equilibria and show through simulations that increasing disagreement may increase price volatility and trading activity.

Keywords

Cite

@article{arxiv.1810.06101,
  title  = {Mean-Field Games with Differing Beliefs for Algorithmic Trading},
  author = {Philippe Casgrain and Sebastian Jaimungal},
  journal= {arXiv preprint arXiv:1810.06101},
  year   = {2019}
}

Comments

36 pages, 3 figures

R2 v1 2026-06-23T04:39:11.457Z