Convergence of viscosity solutions of generalized contact Hamilton-Jacobi equations

Abstract

For any compact connected manifold M, we consider the generalized contact Hamiltonian H(x,p,u) defined on T*M× R which is conex in p and monotonically increasing in u. Let uε-:M→ R be the viscosity solution of the parametrized contact Hamilton-Jacobi equation \[ H(x,∂x uε-(x),ε uε-(x))=c(H) \] with c(H) being the Ma\~n\'e Critical Value. We prove that uε- converges uniformly, as ε→ 0+, to a specfic viscosity solution u0- of the critical equation \[ H(x,∂x u0-(x),0)=c(H) \] which can be characterized as a minimal combination of associated Peierls barrier functions.