Convergence rates of the front tracking method for conservation laws in the Wasserstein distances
Abstract
We prove that front tracking approximations to entropy solutions of scalar conservation laws with convex fluxes converge at a rate of Δx2 in the 1-Wasserstein distance W1. Assuming positive initial data, we also show that the approximations converge at a rate of Δx in the ∞-Wasserstein distance W∞. Moreover, from a simple interpolation inequality between W1 and W∞ we obtain convergence rates in all the p-Wasserstein distances: Δx1+1/p, p ∈ [1,∞].
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