Double Obstacle Problems with obstacles given by non-C2 Hamilton-Jacobi equations

Abstract

We prove optimal regularity for the double obstacle problem when obstacles are given by solutions to Hamilton-Jacobi equations that are not C2. When the Hamilton-Jacobi equation is not C2 then the standard Bernstein technique fails and we loose the usual semi-concavity estimates. Using a non-homogeneous scaling (different speed in different directions) we develop a new pointwise regularity theory for Hamilton-Jacobi equations at points where the solution touches the obstacle. A consequence of our result is that C1-solutions to the Hamilton-Jacobi equation |∇ h-a(x)|2= 1 in B1, h=f on ∂ B1, are in fact C1,α/2 provided that a ∈ Cα. This result is optimal and to the authors' best knowledge new.