Hamilton-Jacobi equations with their Hamiltonians depending Lipschitz continuously on the unknown

Abstract

We study the Hamilton-Jacobi equations H(x,Du,u)=0 in M and ∂ u/∂ t +H(x,Dxu,u)=0 in M×(0,∞), where the Hamiltonian H=H(x,p,u) depends Lipschitz continuously on the variable u. In the framework of the semicontinuous viscosity solutions due to Barron-Jensen, we establish the comparison principle, existence theorem, and representation formula as value functions for extended real-valued, lower semicontinuous solutions for the Cauchy problem. We also establish some results on the long-time behavior of solutions for the Cauchy problem and classification of solutions for the stationary problem.