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MOC
2000

Convergence rates to the discrete travelling wave for relaxation schemes

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Convergence rates to the discrete travelling wave for relaxation schemes
Abstract. This paper is concerned with the asymptotic convergence of numerical solutions toward discrete travelling waves for a class of relaxation numerical schemes, approximating the scalar conservation law. It is shown that if the initial perturbations possess some algebraic decay in space, then the numerical solutions converge to the discrete travelling wave at a corresponding algebraic rate in time, provided the sums of the initial perturbations for the u-component equal zero. A polynomially weighted l2 norm on the perturbation of the discrete travelling wave and a technical energy method are applied to obtain the asymptotic convergence rate.
Hailiang Liu
Added 19 Dec 2010
Updated 19 Dec 2010
Type Journal
Year 2000
Where MOC
Authors Hailiang Liu
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