Convergence of solutions of Hamilton-Jacobi equations depending nonlinearly on the unknown function

Abstract

Motivated by the vanishing contact problem, we study in the present paper the convergence of solutions of Hamilton-Jacobi equations depending nonlinearly on the unknown function. Let H(x,p,u) be a continuous Hamiltonian which is strictly increasing in u, and is convex and coercive in p. For each parameter λ>0, we denote by uλ the unique viscosity solution of the H-J equation \[H( x,Du(x),λ u(x) )=c.\] Under quite general assumptions, we prove that uλ converges uniformly, as λ tends to zero, to a specific solution of the critical H-J equation H(x,Du(x),0)=c. We also characterize the limit solution in terms of Peierls barrier and Mather measures.