A representation formula of the viscosity solution of the contact Hamilton-Jacobi equation and its applications
Abstract
Assume M is a closed, connected and smooth Riemannian manifold. We consider the evolutionary Hamilton-Jacobi equation equation* \ aligned &∂t u(x,t)+H(x,u(x,t),∂xu(x,t))=0, (x,t)∈ M×(0,+∞), \\ &u(x,0)=(x), aligned . equation* where ∈ C(M) and the stationary one equation* H(x,u(x),∂x u(x))=0, equation* where H(x,u,p) is continuous, convex and coercive in p, uniformly Lipschitz in u. By introducing a solution semigroup, we provide a representation formula of the viscosity solution of the evolutionary equation. As its applications, we obtain a necessary and sufficient condition for the existence of the viscosity solutions of the stationary equations. Moreover, we prove a new comparison theorem depending on the neighborhood of the projected Aubry set essentially, which is different from the one for the Hamilton-Jacobi equation independent of u.
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