Stability in determination of states for the mean field game equations

Abstract

We consider solutions satisfying the Neumann zero boundary condition and a linearized mean field game system in × (0,T), where is a bounded domain in Rd and (0,T) is the time interval. We prove two kinds of stability results in determining the solutions. The first is H\"older stability in time interval (ε, T) with arbitrarily fixed ε>0 by data of solutions in × \T\. The second is the Lipschitz stability in × (ε, T-ε) by data of solutions in arbitrarily given subdomain of over (0,T).