Asymptotic analysis of the RS-IMEX scheme for the shallow water equations in one space dimension release_w2qa57nbp5fvzfqsevzb3vbbpu

by Hamed Zakerzadeh

Published in Mathematical Modelling and Numerical Analysis by EDP Sciences.

2019  

Abstract

We introduce and analyse the so-called \textit{Reference Solution IMplicit-EXplicit scheme} as a flux-splitting method for singularly-perturbed systems of balance laws. RS-IMEX scheme's bottom-line is to use the Taylor expansion of the flux function and the source term around a reference solution (typically the asymptotic limit or an equilibrium solution) to decompose the flux and the source into stiff and non-stiff parts so that the resulting IMEX scheme is Asymptotic Preserving (AP) w.r.t.\ the singular parameter $\eps$ tending to zero. We prove the asymptotic consistency, asymptotic stability, solvability and well-balancing of the scheme for the case of the one-dimensional shallow water equations when the singular parameter is the Froude number. We will also study several test cases to illustrate the quality of the computed solutions and confirm the analysis.
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