Second-order convergence of monotone schemes for conservation laws

Abstract

We prove that a class of monotone, W1-contractive schemes for scalar conservation laws converge at a rate of Δx2 in the Wasserstein distance (W1-distance), whenever the initial data is decreasing and consists of a finite number of piecewise constants. It is shown that the Lax--Friedrichs, Enquist--Osher and Godunov schemes are W1-contractive. Numerical experiments are presented to illustrate the main result. To the best of our knowledge, this is the first proof of second-order convergence of any numerical method for discontinuous solutions of nonlinear conservation laws.