Lp Estimates for Numerical Approximation of Hamilton-Jacobi Equations
Abstract
We establish Lp error estimates for monotone numerical schemes approximating Hamilton-Jacobi equations on the d-dimensional torus. Using the adjoint method, we first prove a L1 error bound of order one for finite-difference and semi-Lagrangian schemes under standard convexity assumptions on the Hamiltonian. By interpolation, we also obtain Lp estimates for every finite p>1. Our analysis covers a broad class of schemes, improves several existing results, and provides a unified framework for discrete error estimates.
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