A priori estimates and large population limits for some nonsymmetric Nash systems with semimonotonicity

Abstract

We address the problem of regularity of solutions ui(t, x1, …, xN) to a family of semilinear parabolic systems of N equations, which describe closed-loop equilibria of some N-player differential games with Lagrangian having quadratic behaviour in the velocity variable, running costs fi(x) and final costs gi(x). By global (semi)monotonicity assumptions on the data f=(fi)1 ≤ i ≤ N and g=(gi)1 ≤ i ≤ N, and assuming that derivatives of fi, gi in directions xj are of order 1/N for j ≠ i, we prove that derivatives of ui enjoy the same property. The estimates are uniform in the number of players N. Such a behaviour of the derivatives of fi, gi arise in the theory of Mean Field Games, though here we do not make any symmetry assumption on the data. Then, by the estimates obtained we address the convergence problem N ∞ in a "heterogeneous'' Mean Field framework, where players all observe the empirical measure of the whole population, but may react differently from one another. We also discuss some results on the joint N ∞ and vanishing viscosity limit.