Vanishing discount problem and the additive eigenvalues on changing domains

Abstract

We study the asymptotic behavior, as λ→ 0+, of the state-constraint Hamilton--Jacobi equation φ(λ) uλ(x) + H(x,Duλ(x)) = 0 in (1+r(λ)) and the corresponding additive eigenvalues, or ergodic constant H(x,Dv(x)) = c(λ) in (1+r(λ)) with state-constraint. Here, is a bounded domain of Rn, φ(λ), r(λ):(0,∞)→ R are continuous functions such that φ is nonnegative and λ→ 0+ φ(λ) = λ→ 0+ r(λ) = 0. We obtain both convergence and non-convergence results in the convex setting. Moreover, we provide a very first result on the asymptotic expansion of the additive eigenvalue c(λ) as λ→ 0+. The main tool we use is a duality representation of solution with viscosity Mather measures.