On the rate of convergence in superquadratic Hamilton--Jacobi equations with state constraints
Abstract
In this paper, we investigate the convergence rate in the vanishing viscosity limit for solutions to superquadratic Hamilton--Jacobi equations with state constraints. For every p>2, we establish the rate of convergence for nonnegative Lipschitz data vanishing on the boundary to be of order O(1/2) and obtain an improved upper rate of order O(p2(p-1)) for semiconcave data.
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