Schéma volumes finis monotone pour des opérateurs de diffusion fortement anisotropes sur des maillages de triangles non structurés C Le Potier Comptes Rendus Mathematique 341 (12), 787-792, 2005 | 180 | 2005 |
Construction and convergence study of schemes preserving the elliptic local maximum principle J Droniou, CL Potier SIAM journal on numerical analysis 49 (2), 459-490, 2011 | 113 | 2011 |
A nonlinear finite volume scheme satisfying maximum and minimum principles for diffusion operators C Le Potier International Journal on Finite Volumes, 1-20, 2009 | 93 | 2009 |
Finite volume scheme for highly anisotropic diffusion operators on unstructured meshes C Le Potier Comptes Rendus Mathematique, 921-926, 2005 | 91 | 2005 |
Monotone corrections for generic cell-centered finite volume approximations of anisotropic diffusion equations C Cancès, M Cathala, C Le Potier Numerische Mathematik 125, 387-417, 2013 | 78 | 2013 |
Schéma volumes finis pour des opérateurs de diffusion fortement anisotropes sur des maillages non structurés C Le Potier Comptes Rendus Mathematique 340 (12), 921-926, 2005 | 75 | 2005 |
Correction non linéaire et principe du maximum pour la discrétisation d'opérateurs de diffusion avec des schémas volumes finis centrés sur les mailles C Le Potier Comptes Rendus. Mathématique 348 (11-12), 691-695, 2010 | 40* | 2010 |
The Andra Couplex 1 test case: comparisons between finite-element, mixed hybrid finite element and finite volume element discretizations G Bernard-Michel, C Le Potier, A Beccantini, S Gounand, M Chraibi Computational Geosciences 8 (2), 187-201, 2004 | 40 | 2004 |
A finite volume method for the approximation of highly anisotropic diffusion operators on unstructured meshes C Le Potier Finite Volumes for Complex Applications IV, Marrakesh, Marocco, 2005 | 37 | 2005 |
Finite volume scheme satisfying maximum and minimum principles for anisotropic diffusion operators C Le Potier Finite volumes for complex applications V, 103-118, 2008 | 33 | 2008 |
Un schéma linéaire vérifiant le principe du maximum pour des opérateurs de diffusion très anisotropes sur des maillages déformés C Le Potier Comptes Rendus Mathematique 347 (1-2), 105-110, 2009 | 27* | 2009 |
A cell-centered scheme for heterogeneous anisotropic diffusion problems on general meshes C Le Potier, H Thanh International Journal on Finite Volumes, 1-40, 2012 | 20 | 2012 |
Maximum and minimum principles for radionuclide transport calculations in geological radioactive waste repository: comparison between a mixed hybrid finite element method and … A Genty, C Le Potier Transport in porous media 88 (1), 65-85, 2011 | 20 | 2011 |
A nonlinear correction and maximum principle for diffusion operators with hybrid schemes C Le Potier, A Mahamane COMPTES RENDUS MATHEMATIQUE 350 (1-2), 101-106, 2012 | 17* | 2012 |
Correction non linéaire d'ordre 2 et principe du maximum pour la discrétisation d'opérateurs de diffusion C Le Potier Comptes Rendus. Mathématique 352 (11), 947-952, 2014 | 14* | 2014 |
A second order in space combination of methods verifying a maximum principle for the discretization of diffusion operators C Le Potier Comptes Rendus. Mathématique 358 (1), 89-95, 2020 | 12 | 2020 |
Mixed Hybrid Finite Element Formulation for water flow in unsaturated porous media C Le Potier, E Mouche, A Genty, LV Benet, F Plas WIT Transactions on Ecology and the Environment 23, 1998 | 9 | 1998 |
Numerical results with two cell-centered finite volume schemes for heterogeneous anisotropic diffusion operators. Finite Volumes for Complex Applications V (R. Eymard and JM … C Le Potier John Wiley & Sons, 2008 | 7 | 2008 |
Finite volume scheme in two or three dimensions for a diffusion-convection equation applied to porous media with CASTEM2000 C Le Potier Developments in Water Science 55, 1015-1026, 2004 | 7 | 2004 |
FINITE-VOLUME SOLUTION OF MAXWELLS EQUATIONS IN NONSTEADY MODE R LEMARTRET, C LEPOTIER RECHERCHE AEROSPATIALE, 329-342, 1994 | 7 | 1994 |