Remarks on the vanishing viscosity process of state-constraint Hamilton-Jacobi equations

Abstract

We investigate the convergence rate in the vanishing viscosity process of the solutions to the subquadratic state-constraint Hamilton-Jacobi equations. We give two different proofs of the fact that, for nonnegative Lipschitz data that vanish on the boundary, the rate of convergence is O() in the interior. Moreover, the one-sided rate can be improved to O() for nonnegative compactly supported data and O(1/(p-12)) (where 1<p≤ 2 is the exponent of the gradient term) for nonnegative data f∈ C2() such that f = 0 and Df = 0 on the boundary. Our approach relies on deep understanding of the blow-up behavior near the boundary and semiconcavity of the solutions.