On the inhomogeneous discounted Hamilton-Jacobi equations

Abstract

In this paper, we study the family of inhomogeneous discounted Hamilton-Jacobi equations equationhjs1 λ(x)u+h(x,dx u)=c equation on a closed manifold M with a non-identically vanishing discount factor λ(x). There is a critical value c0∈[-∞,∞) such that hjs1 admits a viscosity solution if c>c0 and no solution if c<c0. Inspired by the recent development [34] on the stability theory of viscosity solution, we show that the equation admits an asymptotically stable solution if and only if c>c0. In this case, we determine the basin of the stable solution and investigate the long time behavior of the solution semigroup associated to hjs1. In particular, we relate the lowest convergence rate to the integral of λ over Mather measures, which leads to an asymptotic behavior of Mather measures when c goes to infinity. Assume c≥slant c0 and the equation admits a solution, we classify ergodic Mather measures and locate their distribution in the phase space.