2013
DOI: 10.1137/130910555
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Study of Discrete Duality Finite Volume Schemes for the Peaceman Model

Abstract: In this paper, we are interested in the finite volume approximation of a system describing miscible displacement in porous media. This system is made of two coupled equations: an anisotropic diffusion equation on the pressure and a convection-diffusion-dispersion equation on the concentration of invading fluid. The anisotropic diffusion operators in both equations require a special care while discretizing by a finite volume method. We focus here on the numerical approximation by some Discrete Duality Finite Vo… Show more

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Cited by 10 publications
(26 citation statements)
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“…Lemma 3.1 gives a priori estimates on the pressure, the gradient of the pressure and the Darcy's velocity at the discrete level, while Lemma 3.2 gives a priori estimates on the approximate concentration and its approximate gradient. Thanks to these two lemmas, we get the existence and uniqueness of a solution to the scheme, as in [8]. Then, Lemma 3.3 shows that the reconstructions of the concentration on the primal and dual meshes will necessarily converge to the same limit (when convergence occurs).…”
Section: A Priori Estimatesmentioning
confidence: 88%
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“…Lemma 3.1 gives a priori estimates on the pressure, the gradient of the pressure and the Darcy's velocity at the discrete level, while Lemma 3.2 gives a priori estimates on the approximate concentration and its approximate gradient. Thanks to these two lemmas, we get the existence and uniqueness of a solution to the scheme, as in [8]. Then, Lemma 3.3 shows that the reconstructions of the concentration on the primal and dual meshes will necessarily converge to the same limit (when convergence occurs).…”
Section: A Priori Estimatesmentioning
confidence: 88%
“…Thanks to Lemma 3.1 and 3.2, we have the existence and uniqueness of a solution (p h,δt , U h,δt , c h,δt ) ∈ H T ,δt × H D,δt × H T ,δt to the scheme (18)- (19) as in [8]. …”
Section: A Priori Estimatesmentioning
confidence: 92%
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