2014
DOI: 10.1137/12090143x
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High-Order Preserving Residual Distribution Schemes for Advection-Diffusion Scalar Problems on Arbitrary Grids

Abstract: This paper deals with the construction of a class of high-order accurate residual distribution schemes for advection-diffusion problems using conformal meshes. The problems considered range from pure diffusion to pure advection. The approximation of the solution is obtained using standard Lagrangian finite elements and the total residual of the problem is constructed taking into account both the advective and the diffusive terms in order to discretize with the same scheme both parts of the governing equation. … Show more

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Cited by 32 publications
(39 citation statements)
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References 24 publications
(31 reference statements)
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“…The numerical method used to discretize the system of equations follows from the scheme already proposed by the authors in [3] to discretize the scalar advection-diffusion problem.…”
Section: Rd Space Discretizationmentioning
confidence: 99%
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“…The numerical method used to discretize the system of equations follows from the scheme already proposed by the authors in [3] to discretize the scalar advection-diffusion problem.…”
Section: Rd Space Discretizationmentioning
confidence: 99%
“…The linear scheme proposed in this work is the extension to the integral formulation of the classical Ni's LaxWendroff scheme [23], this scheme has been also successfully used in the context of the RD schemes to discretize the advection-diffusion scalar equation, see [3]. The nodal residual, for the DOF i of the element e, can be written as follows…”
Section: Linear Schemementioning
confidence: 99%
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