Variational principle for contact Hamiltonian systems and its applications

Abstract

In WWY, the authors provided an implicit variational principle for the contact Hamilton's equations align* \ arrayl x=∂ H∂ p(x,u,p),\\ p=-∂ H∂ x(x,u,p)-∂ H∂ u(x,u,p)p, (x,p,u)∈ T*M×R,\\ u=∂ H∂ p(x,u,p)· p-H(x,u,p), array . align* where M is a closed, connected and smooth manifold and H=H(x,u,p) is strictly convex, superlinear in p and Lipschitz in u. In the present paper, we focus on two applications of the variational principle: 1. We provide a representation formula for the solution semigroup of the evolutionary equation \[ wt(x,t)+H(x,w(x,t),wx(x,t))=0; \] 2. We study the ergodic problem of the stationary equation via the solution semigroup. More precisely, we find pairs (u,c) with u∈ C(M,R) and c∈R which, in the viscosity sense, satisfy the stationary partial differential equation \[ H(x,u(x),ux(x))=c. \]