A sixth-order finite volume method for multidomain convection–diffusion problem with discontinuous coefficients

A sixth-order finite volume method is proposed to solve the bidimensional linear steady- state convection–diffusion equation. A new class of polynomial reconstructions is proposed to provide accurate fluxes for the convective and the diffusive operators. The method is also designed to compute accura...

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Detalhes bibliográficos
Autor principal: Clain, Stéphane (author)
Outros Autores: Machado, Gaspar J. (author), Nóbrega, J. M. (author), Pereira, Rui M. S. (author)
Formato: article
Idioma:eng
Publicado em: 2013
Assuntos:
Finite volume
Convection–diffusion
Polynomial reconstruction
Heat transfer
Discontinuous coefficients
High-order
Science & Technology
Texto completo:http://hdl.handle.net/1822/26039
País:Portugal
Oai:oai:repositorium.sdum.uminho.pt:1822/26039
Descrição
Resumo:A sixth-order finite volume method is proposed to solve the bidimensional linear steady- state convection–diffusion equation. A new class of polynomial reconstructions is proposed to provide accurate fluxes for the convective and the diffusive operators. The method is also designed to compute accurate approximations even with discontinuous diffusion coeffi- cient or velocity and remains robust for large Peclet numbers. Discontinuous solutions deriving from the linear heat transfer Newton law are also considered where a decompo- sition domain technique is applied to maintain an effective sixth-order approximation. Numerical tests covering a large panel of situations are addressed to assess the perfor- mances of the method.

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