One-sided stability and convergence of the Nessyahu-Tadmor scheme

abstract

Non-oscillatory schemes are widely used in numerical approximations of nonlinear conservation laws. The Nessyahu-Tadmor (NT) scheme is an example of a second order scheme that is both robust and simple. In this paper, we prove a new stability property of the NT scheme based on the standard minmod reconstruction in the case of a scalar strictly convex conservation law. This property is similar to the One-sided Lipschitz condition for first order schemes. Using this new stability, we derive the convergence of the NT scheme to the exact entropy solution without imposing any nonhomogeneous limitations on the method. We also derive an error estimate for monotone initial data. Springer-Verlag 2006.

authors

Popov, Bojan

published proceedings

NUMERISCHE MATHEMATIK

author list (cited authors)

Popov, B., & Trifonov, O.

citation count

5

complete list of authors

Popov, Bojan||Trifonov, Ognian

publication date

October 2006

publisher

Springer Nature Publisher

published in

Numerische Mathematik Journal

keywords

49 Mathematical Sciences
4901 Applied Mathematics
4903 Numerical And Computational Mathematics

Digital Object Identifier (DOI)

10.1007/s00211-006-0015-4

start page

539

end page

559

volume

104

issue

4

URL

http://dx.doi.org/10.1007/s00211-006-0015-4

One-sided stability and convergence of the Nessyahu-Tadmor scheme Academic Article

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abstract

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published proceedings

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complete list of authors

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