Please use this identifier to cite or link to this item: http://hdl.handle.net/1822/43613

TitleA well-balanced scheme for the shallow-water equations with topography
Author(s)Michel-Dansac, Victor
Berthon, Christophe
Clain, Stéphane
Foucher, Françoise
KeywordsShallow-water equations
Godunov-type schemes
Well-balanced schemes
Moving steady states
Issue dateJun-2016
PublisherElsevier
JournalComputers and Mathematics With Applications
Abstract(s)A non-negativity preserving and well-balanced scheme that exactly preserves all the smooth steady states of the shallow water system, including the moving ones, is proposed. In addition, the scheme must deal with vanishing water heights and transitions between wet and dry areas. A Godunov-type method is derived by using a relevant average of the source terms within the scheme, in order to enforce the required well-balance property. A second-order well-balanced MUSCL extension is also designed. Numerical experiments are carried out to check the properties of the scheme and assess the ability to exactly preserve all the steady states.
TypeArticle
URIhttp://hdl.handle.net/1822/43613
DOI10.1016/j.camwa.2016.05.015
ISSN0898-1221
Publisher versionwww.elsevier.com/locate/camwa
Peer-Reviewedyes
AccessRestricted access (UMinho)
Appears in Collections:CMAT - Artigos em revistas com arbitragem / Papers in peer review journals

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