Weak KAM theory for general Hamilton-Jacobi equations II: the fundamental solution under Lipschitz conditions

Abstract

We consider the following evolutionary Hamilton-Jacobi equation with initial condition: equation* cases ∂tu(x,t)+H(x,u(x,t),∂xu(x,t))=0,\\ u(x,0)=φ(x), cases equation* where φ(x)∈ C(M,R). Under some assumptions on the convexity of H(x,u,p) with respect to p and the uniform Lipschitz of H(x,u,p) with respect to u, we establish a variational principle and provide an intrinsic relation between viscosity solutions and certain minimal characteristics. By introducing an implicitly defined fundamental solution, we obtain a variational representation formula of the viscosity solution of the evolutionary Hamilton-Jacobi equation. Moreover, we discuss the large time behavior of the viscosity solution of the evolutionary Hamilton-Jacobi equation and provide a dynamical representation formula of the viscosity solution of the stationary Hamilton-Jacobi equation with strictly increasing H(x,u,p) with respect to u.