Convergence Rates of the Front Tracking Method for Conservation Laws in the Wasserstein Distances
Journal article, Peer reviewed
Accepted version
Åpne
Permanent lenke
http://hdl.handle.net/11250/2594032Utgivelsesdato
2018Metadata
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- Institutt for matematiske fag [2341]
- Publikasjoner fra CRIStin - NTNU [36890]
Originalversjon
SIAM Journal on Numerical Analysis. 2018, 56 (6), 3648-3666. https://doi.org/10.1137/18M1189488Sammendrag
We prove that front tracking approximations to scalar conservation laws with convex fluxes converge at a rate of $\Delta x^2$ in the 1-Wasserstein distance $W_1$. Assuming positive initial data, we also show that the approximations converge at a rate of $\Delta x$ in the $\infty$-Wasserstein distance $W_\infty$. Moreover, from a simple interpolation inequality between $W_1$ and $W_\infty$ we obtain convergence rates in all the $p$-Wasserstein distances: $\Delta x^{1+1/p}$, $p \in [1,\infty]$.