Nonlocal ergodic control problem in Rd

Abstract

We study the existence-uniqueness of solution (u, λ) to the ergodic Hamilton-Jacobi equation (-)s u + H(x, ∇ u) = f-λ in\; Rd, and u≥ 0, where s∈ (12, 1). We show that the critical λ=λ*, defined as the infimum of all λ attaining a non-negative supersolution, attains a nonnegative solution u. Under suitable conditions, it is also shown that λ* is the supremum of all λ for which a non-positive subsolution is possible. Moreover, uniqueness of the solution u, corresponding to λ*, is also established. Furthermore, we provide a probabilistic characterization that determines the uniqueness of the pair (u, λ*) in the class of all solution pair (u, λ) with u≥ 0. Our proof technique involves both analytic and probabilistic methods in combination with a new local Lipschitz estimate obtained in this article.