Finite volume methods R Eymard, T Gallouët, R Herbin Handbook of numerical analysis 7, 713-1018, 2000 | 3483 | 2000 |
Discretization of heterogeneous and anisotropic diffusion problems on general nonconforming meshes SUSHI: a scheme using stabilization and hybrid interfaces R Eymard, T Gallouët, R Herbin IMA Journal of Numerical Analysis 30 (4), 1009-1043, 2010 | 472 | 2010 |
3D benchmark on discretization schemes for anisotropic diffusion problems on general grids R Eymard, G Henry, R Herbin, F Hubert, R Klöfkorn, G Manzini Finite Volumes for Complex Applications VI Problems & Perspectives: FVCA 6 …, 2011 | 390 | 2011 |
A unified approach to mimetic finite difference, hybrid finite volume and mixed finite volume methods J Droniou, R Eymard, T Gallouët, R Herbin Mathematical Models and Methods in Applied Sciences 20 (02), 265-295, 2010 | 305 | 2010 |
Use of parameter gradients for reservoir history matching F Anterion, R Eymard, B Karcher SPE Reservoir Simulation Conference?, SPE-18433-MS, 1989 | 249 | 1989 |
A mixed finite volume scheme for anisotropic diffusion problems on any grid J Droniou, R Eymard Numerische Mathematik 105, 35-71, 2006 | 246 | 2006 |
Convergence of a finite volume scheme for nonlinear degenerate parabolic equations R Eymard, T Gallouït, R Herbin, A Michel Numerische Mathematik 92 (1), 41-82, 2002 | 237 | 2002 |
The gradient discretisation method J Droniou, R Eymard, T Gallouët, C Guichard, R Herbin Springer, 2018 | 193 | 2018 |
Error estimates for the approximate solutions of a nonlinear hyperbolic equation given by finite volume schemes R Eymard, T Gallouët, M Ghilani, R Herbin IMA Journal of Numerical Analysis 18 (4), 563-594, 1998 | 193 | 1998 |
Small-stencil 3D schemes for diffusive flows in porous media R Eymard, C Guichard, R Herbin ESAIM: Mathematical Modelling and Numerical Analysis 46 (2), 265-290, 2012 | 190 | 2012 |
The finite volume method for Richards equation R Eymard, M Gutnic, D Hilhorst Computational Geosciences 3, 259-294, 1999 | 183 | 1999 |
Constitutive modeling of unsaturated drying deformable materials O Coussy, R Eymard, T Lassabatère Journal of Engineering Mechanics 124 (6), 658-667, 1998 | 176 | 1998 |
Gradient schemes: a generic framework for the discretisation of linear, nonlinear and nonlocal elliptic and parabolic equations J Droniou, R Eymard, T Gallouet, R Herbin Mathematical Models and Methods in Applied Sciences 23 (13), 2395-2432, 2013 | 162 | 2013 |
A cell-centred finite-volume approximation for anisotropic diffusion operators on unstructured meshes in any space dimension R Eymard, T Gallouët, R Herbin IMA Journal of Numerical Analysis 26 (2), 326-353, 2006 | 157 | 2006 |
A combined finite volume–nonconforming/mixed-hybrid finite element scheme for degenerate parabolic problems R Eymard, D Hilhorst, M Vohralík Numerische Mathematik 105 (1), 73-131, 2006 | 154 | 2006 |
Mathematical study of a petroleum-engineering scheme R Eymard, R Herbin, A Michel ESAIM: Mathematical Modelling and Numerical Analysis 37 (6), 937-972, 2003 | 154 | 2003 |
Existence and uniqueness of the entropy solution to a nonlinear hyperbolic equation R EYMARD, T Gallouёt, R Herbin 数学年刊: B 辑英文版 16 (1), 1-14, 1995 | 112 | 1995 |
Convergence of finite volume schemes for semilinear convection diffusion equations R Eymard, T Gallouët, R Herbin Numerische Mathematik 82, 91-116, 1999 | 105 | 1999 |
Finite volumes and nonlinear diffusion equations R Eymard, T Gallouët, D Hilhorst, YN Slimane ESAIM: Mathematical Modelling and Numerical Analysis 32 (6), 747-761, 1998 | 103 | 1998 |
A new finite volume scheme for anisotropic diffusion problems on general grids: convergence analysis R Eymard, T Gallouët, R Herbin Comptes rendus. Mathématique 344 (6), 403-406, 2007 | 102 | 2007 |