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B. Andreianov, M. Bendahmane, and F. Hubert, On 3D DDFV discretization of gradient and divergence operators. II. Discrete functional analysis tools and applications to degenerate parabolic problems, Preprint HAL, 2011.
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B. Andreianov, M. Bendahmane, and K. Karlsen, A gradient reconstruction formula for finite-volume schemes and discrete duality, Finite Volume For Complex Applications, Problems And Perspectives. 5th International Conference, pp.161-168, 2008.
URL : https://hal.archives-ouvertes.fr/hal-00475877

B. Andreianov, M. Bendahmane, and K. H. Karlsen, DISCRETE DUALITY FINITE VOLUME SCHEMES FOR DOUBLY NONLINEAR DEGENERATE HYPERBOLIC-PARABOLIC EQUATIONS, Journal of Hyperbolic Differential Equations, vol.07, issue.01, pp.1-67, 2010.
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B. Andreianov, F. Boyer, and F. Hubert, Discrete duality finite volume schemes for Leray???Lions???type elliptic problems on general 2D meshes, Numerical Methods for Partial Differential Equations, vol.152, issue.1, pp.145-195, 2007.
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F. Boyer and F. Hubert, Finite Volume Method for 2D Linear and Nonlinear Elliptic Problems with Discontinuities, SIAM Journal on Numerical Analysis, vol.46, issue.6, pp.463032-3070, 2008.
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F. Boyer and F. Hubert, Benchmark on anisotropic problems, the ddfv discrete duality finite volumes and m-ddfv schemes, Finite Volume For Complex Applications, Problems And Perspectives. 5th International Conference, pp.735-750, 2008.

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Y. Coudì-ere and C. Pierre, Benchmark 3D: CeVe-DDFV, a discrete duality scheme with cell/vertex unknowns, Proc. FVCA6 (Prague), 2011.

Y. Coudì-ere and F. Hubert, A 3D discrete duality finite volume method for nonlinear elliptic equation. preprint, 2009.

Y. Coudì-ere, F. Hubert, and G. Manzini, Benchmark 3D: CeVeFE-DDFV, a discrete duality scheme with cell/vertex/face+edge unknowns, Proc. FVCA6 (Prague), 2011.

Y. Coudì-ere, C. Pierre, O. Rousseau, and R. Turpault, A 2d/3d discrete duality finite volume scheme. Application to ecg simulation, Int. Journal on Finite Volumes, vol.6, issue.1, 2009.

K. Domelevo and P. Omnès, A finite volume method for the Laplace equation on almost arbitrary two-dimensional grids, ESAIM: Mathematical Modelling and Numerical Analysis, vol.39, issue.6, pp.391203-1249, 2005.
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R. Herbin and F. Hubert, Benchmark on discretization schemes for anisotropic diffusion problems on general grids, Finite Volume For Complex Applications, Problems And Perspectives. 5th International Conference, pp.659-692, 2008.
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F. Hermeline, A Finite Volume Method for the Approximation of Diffusion Operators on Distorted Meshes, Journal of Computational Physics, vol.160, issue.2, pp.481-499, 2000.
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F. Hermeline, Approximation of 2-D and 3-D diffusion operators with variable full tensor coefficients on arbitrary meshes, Computer Methods in Applied Mechanics and Engineering, vol.196, issue.21-24, pp.196-217, 2007.
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F. Hermeline, A finite volume method for approximating 3D diffusion operators on general meshes, Journal of Computational Physics, vol.228, issue.16, pp.2285763-5786, 2009.
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