Ricerc@Sapienza

We study the asymptotic behavior of the solutions to a family of discounted Hamilton-Jacobi equations, posed in RN, when the discount factor goes to zero. The ambient space being noncompact, we introduce an assumption implying that the Aubry set is compact and there is no degeneracy at infinity. Our approach is to deal not with a single Hamiltonian and Lagrangian but with the whole space of generalized Lagrangians, and then to define via duality minimizing measures associated with both the corresponding ergodic and discounted equations.

We consider radial solutions of the slightly subcritical problem (Formula presented.) either on (Formula presented.) ((Formula presented.)) or in a ball (Formula presented.) satisfying Dirichlet or Neumann boundary conditions. In particular, we provide sharp rates and constants describing the asymptotic behavior (as (Formula presented.)) of all local minima and maxima of (Formula presented.) and of the value of the derivative (Formula presented.) at the zeros of the solution.