Existence of Solutions and Selection Problem for Quasi-stationary Contact Mean Field Games

Abstract

First, we study the existence of solutions for a class of first order mean field games systems equation* \aligned &H(x,u,Du)=F(x,m(t)), &&x∈ M,\ ∀\ t∈[0,T],\\ &∂t m-div(m∂ H∂ p(x,u,Du))=0, &&(x,t)∈ M×(0,T],\\ &m(0)=m0, aligned. equation* where the system comprises a stationary Hamilton-Jacobi equation in the contact case and an evolutionary continuity equation. Then, for any fixed λ>0, let (uλ,mλ) be a solution of the system equation* \ aligned &H(x,λ uλ,Duλ)=F(x,mλ(t))+c(mλ(t)), &&x∈ M,\ ∀ t∈[0,T],\\ &∂t mλ-div(mλ∂ H∂ p(x,λ uλ,Duλ))=0, &&(x,t)∈ M×(0,T],\\ &m(0)=m0, aligned. equation* where c(mλ(t)) is the Ma\~n\'e critical value of the Hamiltonian H(x,0,p)-F(x,mλ(t)). We investigate the selection problem for the limit of (uλ,mλ) as λ tends to 0.