Bibliographie du GDR MoMaS

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120 references, last updated Tue May 4 12:30:17 2004

[1]: Y. Achdou and F. Nataf. An iterated tangential filtering decomposition. Num. Lin. Alg. and Appl., 10(5-6):511-539, July/September 2003.
[2]: Adimurthi, J. Jaffré, and Veerappa Gowda. Godunov-type methods for conservation laws with a flux function discontinuous in space. SIAM Journal in Numerical Analysis, pages 179-208, 2004.
[3]: P.M. Adler and V. Mityushev. Effective medium approximation and exact formulas for electrokinetic phenomena in porous media. J. Phys. A, 36, 2003.
[4]: P.M. Adler, J.-F. Thovert, and S. Bekri. Electrokinetics in porous media. In A. Delgado, editor, Interfacial electrokinetics and electrophoresis, volume 106. Marcel Dekker, New-York, 2002.
[5]: P.M. Adler, J.-F. Thovert, S. Bekri, and F. Yousefian. Real porous media: geometry and transports. J. Engineering Mechanics (ASCE), 128, 2002.
[6]: P. M. Adler. Electroosmosis in porous solids. In A. Hubbard and P. Somasundaran, editors, Encyclopedia of Surface and Colloid Sci.. M. Dekker, 2002.
[7]: M. Afif and B. Amaziane. Convergence of finite volume schemes for a degenerate convection-diffusion equation arising in flow in porous media. Computer Methods in Applied Mechanics and Engineering, 191(46):5265-5286, 2002.
[8]: M. Afif and B. Amaziane. On convergence of finite volume schemes for one-dimensional two-phase flow in porous media. Journal of Computational and Applied Mathematics, 145(1):31-48, 2002.
[9]: M. Afif and B. Amaziane. Numerical simulation of two-phase flow through heterogeneous porous media. Accepted for Publication in Numerical Algorithms, 2003.
[10]: C. Alboin, J. Jaffré, P. Joly, J. E. Roberts, and C. Serres. A comparison of methods for calculating the matrix block source term in a double porosity model for contaminant transport. Computational Geosciences, 6:523-543, 2002.
[11]: C. Alboin, J. Jaffré, J. E. Roberts, and C. Serres. Modeling fractures as interfaces for flow and transport in porous media. In Z. Chen and R.E. Ewing, editors, Fluid flow and transport in porous media: mathematical and numerical treatment, number 295 in Contemporary mathematics, pages 13-24. American Mathematical Society, 2002.
[12]: G. Allaire and Y. Capdeboscq. Homogenization and localization for a 1-d eigenvalue problem in a periodic medium with an interface. Annali di Matematica, 181:247-282, 2002.
[13]: G. Allaire and A. Piatnitski. Uniform spectral asymptotics for singularly perturbed locally periodic operators. Comm. in PDE, 27:705-725, 2002.
[14]: G. Allaire, Y. Capdeboscq, and A. Piatnistki. Homogenization and localization with an interface. à paraitre dans Indiana University Mathematics Journal, 2003.
[15]: B. Amaziane and B. Ondami. A homogenization result for three-phase flow through periodic heterogeneous porous media. In Actas de Las VII Jornadas Zaragoza-Pau de Matematica Aplicada y Estadistica, Seminario Matematico Garcia De Galdeano. universidad De Zaragoza, 2002.
[16]: B. Amaziane and B. Ondami. Homogenization of a three-phase flow model in porous media. Accepted for Publication in Applicable Analysis, 2003.
[17]: B. Amaziane, A. Bourgeat, M. Goncharenko, and L. Pankratov. Characterization of the flow for a single fluid in excavation damaged zone. C. R. Acad. Sci. Paris, Série II b, t. 332:79-84, 2004.
[18]: B. Amaziane. Numerical simulation of multiphase flows in heterogeneous porous media. In J.-L. Auriault et al, editor, Proceedings of the Second Biot Conference on Poromechanics, Poromechanics II, pages 321-326. A. A. Balkema, 2002.
[19]: Ph. Angot. A model of fracture for elliptic problems with flux and solution jumps. Soumis à C. R. Acad. Sci. Paris, version longue dans [20], 2003.
[20]: Ph. Angot. A model of fracture for elliptic problems with flux and solution jumps. Technical report, L.A.T.P, UMR CNRS 6632, 2003.
[21]: N. Antonic, C.J. van Duijn, W. Jäger, and A. Mikelic. Multiscale Problems in Science and Technology. Challenges to Mathematical Analysis and Perspectives.. Springer-Verlag, Heidelberg, 2002.
[22]: S. Bekri and P. M. Adler. Dispersion in multiphase flow through porous media. Int. J. Multiphase Flow, 28, 2002.
[23]: S. Bekri, J. Howard, J. Muller, and P.M. Adler. Electrical resistivity index in multiphase flow through porous media. À paraître in Tranp. Porous Media, 2003.
[24]: M. Bendhamane, M. Langlais, and M. Saad. On some anisotropic reaction-diffusion systems with L1-data modeling the propagation of an epidemic disease. Nonlinear Analysis, Series A, Theory and Methods, 54:617-636, 2003.
[25]: I.I. Bogdanov, V.V. Mourzenko, J.-F. Thovert, and P.M. Adler. Effective permeability of fractured porous media in steady-state flow. Water Resources Research, 39, 2003.
[26]: I.I. Bogdanov, V.V. Mourzenko, J.-F. Thovert, and P.M. Adler. Pressure drawdown well tests in fractured porous medi. Water Resources Research, 39, 2003.
[27]: D. Bothe and D. Hilhorst. A reaction-diffusion system with fast reversible reaction. Soumis à JMAA, 2003.
[28]: A. Bourgeat and A. Piatnitski. Comparison of various approximation of the homogenized conductivity tensor and corresponding error estimates for stochastic media. Annales de l'Institut Henri Poincaré, 40(2):153-165, 2004.
[29]: A. Bourgeat, I. Boursier, O. Gipouloux, and E. Marusic-Paloka. Mathematical modelling of an array of nuclear waste containers. In Proceedings AMRTMA, pages 28-33. World Scientific Publisher, 2002.
[30]: A. Bourgeat, O. Gipouloux, and E. Marusic-Paloka. Mathematical modeling of an array of underground waste containers. C.R.A.S. Mécanique, 330(5):37-376, 2002.
[31]: A. Bourgeat, I. Boursier, and D.Tromeur-Dervout. Modelling of an underground waste disposal site by upscaling, simulation with domain decomposition method. In Proceeding de la 15 ème confèrence internationale de la technique des décompositions de domaine, DD15, 2003. à paraître.
[32]: A. Bourgeat, G. Chechkin, and A. Piatnitski. Singular double porosity model. Appl. Anal., 82:103-116, 2003.
[33]: A. Bourgeat, O. Gipouloux, and E. Marusic-Paloka. Filtration law for polymer flow through porous media. SIAM J. on Multiscale Modeling and Simulation, 1(3):432-457, 2003.
[34]: A. Bourgeat, M. Jurak, and A. Piatnitski. Averaging a transport equation with small diffusion and oscillating velocity. Math. Methods Appl. Sci., 26:95-117, 2003.
[35]: A. Bourgeat, A. Mikelic, and A. Piatnitski. On the double porosity model of a single phase flow in random media. Asymptotic Analysis, 34(3-4):311-332, 2003.
[36]: A. Bourgeat, O. Gipouloux, and E. Marusic-Paloka. Mathematical modeling of an underground waste disposal site by upscaling. Math. Meth. Appli. Sci, 27(4):381-403, 2004.
[37]: A. Bourgeat, M. Kern, R. Schumarer, and J. Talandier. The textsc Couplex models. dans " textsc Couplex, a Benchmark for the Advective Dispersive Transport of Radionucleides in Underground Waste Storage", numéro Spécial de Computational Geosciences en préparation, 2004.
[38]: A. Bourgeat, M. Panfilov, and L. Pankratov. Study of the double porosity model versus the fissures thickness. Asymptotic Analysis, 38(2):129-141, 2004. Á paraître dans Asymptotic Analysis.
[39]: M. Buès and M. Panfilov. Two-phase dispersion in porous media. In J.-L. Auriault et al, editor, Proceedings of the Second Biot Conference on Poromechanics, Poromechanics II, pages 353-358. A. A. Balkema, 2002.
[40]: F. Campillo and A. Piatnitski. Effective diffusion in vanishing viscosity. In D. Cioranescu and J.-L. Lions, editors, Nonlinear Partial Differential Equations and Their Applications. College de France Seminar Volume XIV, Studies in Mathematics and its Applications, 31, pages 133-145. Elsevier, North-Holland, 2002.
[41]: Y. Capdeboscq and M. Vogelius. Wavelet based numerical homogenization of a two dimensional elliptic problem. Accepté dans Appl. Comput. Harmon. Anal., 2002.
[42]: A. Cartalade, P. Montarnal, B. Cavanna, and J. Blum. Estimation de paramètres de transport d'un milieux poreux, approche par état adjoint. Technical Report SFME/MTMS/RT/02-018, CEA -- DM2S, 2002.
[43]: A. Cartalade, P. Montarnal, B. Cavanna, and J. Blum. Paramétrisation automatique des coefficients de transport d'un milieu poreux, approche par état adjoint. Technical Report SFME/MTMS/RT/03-002, CEA -- DM2S, 2003.
[44]: R. Cautrès, R. Herbin, and F. Hubert. Finite volume scheme on non matching grids. applications to domain decompostion methods. In R. Herbin and D. Kröner, editors, Finite volume for Complex Applications III: problems and perspectives, pages 155-162. Hermes Penton Science, 2002.
[45]: R. Cautrès, R. Herbin, and F. Hubert. The Lions domain decomposition algorithm on non matching cell-centered finite volume meshes. Preprint 02-27, LATP, 2002. Soumis à publication.
[46]: F. Clément, N. Khvoenkova, A. Cartalade, and P. Montarnal. Estimation de paramètres de transport et analyse de sensibilité pour une equation de diffusion, approche par état adjoint. Technical report, INRIA, Rocquencourt, France, 2003. en préparation.
[47]: F. Clément, A. Vodicka, V. Martin, R. Di Cosmo, and P. Weis. Domain decomposition with local refinement for flow simulation around a nuclear wast disposal site: direct computation versus code coupling with ocamlp3l. In Proceedings of the International Conference on Supercomputing in Nuclear Applications SNA'2003, Paris, 2003. soumis à publication.
[48]: T. Clopeau and A. Mikelic. Homogenizing a flow of an incompressible inviscid fluid through an elastic porous medium. In Armand Wirgin, editor, Acoustics, Mechanics and the Related Topics of Mathematical Analysis, Proceedings of the International Conference to Celebrate R.P. Gilbert's 70th birthday, pages 108 --115. World Scientific Pub. Co., 2003.
[49]: F. Clément, R. Di Cosmo, Z. Li, V. Martin, A. Vodicka, and P. Weis. Parallel programming with the OcamlP3l system, with applications to coupling numerical codes. J. Functional Programming, 2003. soumis.
[50]: J-P. Croisille and I. Greff. A box-scheme for convection-diffusion equations. In R. Herbin and D. Kröner, editors, Proc. of the 3rd. Int. Symp. on Finite Volume for Complex Applications, pages 325-332. Hermes-Penton Science, 2002.
[51]: J-P. Croisille and I. Greff. Some box-schemes for elliptic problems. Numer. Meth. Partial Diff. Equations, 18:355-373, 2002.
[52]: J.-P. Croisille, A. Ern, R. Luce, and J. Proft. A 1D test case for convection-diffusion problems in porous media with high contrasts in diffusion coefficients. en préparation, 2003.
[53]: J-P. Croisille. A high order accurate box scheme for the one-dimensional convection-diffusion equation. Technical report, Preprint Univ. de Metz, 2002.
[54]: J-P. Croisille. Keller's box-scheme for the one-dimensional stationary convection-diffusion equation. Computing, 68(1):37-63, 2002.
[55]: F.Z. Daim, R. Eymard, D. Hilhorst, M. Mainguy, and R. Masson. Comparison of coupling algorithms for geomechanical reservoir simulations. Oil & Gas Science and Technology, 57:515-523, 2002.
[56]: C. Dawson and J. Proft. Coupling of continuous and discontinuous galerkin methods for transport problems. Computer Methods in Applied Mechanics and Engineering, 191:3213-3231, 2002.
[57]: C. Dawson and J. Proft. Discontinuous and coupled continuous/discontinuous galerkin methods for the shallow water equations. Computer Methods in Applied Mechanics and Engineering, 191:4721-4746, 2002.
[58]: L. de Windt, A. Burnol, P. Montarnal, and J. van der Lee. Intercomparison of reactive transport models applied to UO2 oxidative disolution and uranium migration,. À para^itre in J. Cont. Hydro, 2003.
[59]: J. Droniou, R. Eymard, D. Hilhorst, and X. D. Zhou. Convergence of a finite volume - mixed finite element method for a system of a hyperbolic and an elliptic equations. soumis à publication, 2003.
[60]: L El Alaoui and A. Ern. Residual based and hierarchical a posteriori error estimates for nonconforming mixed finite element methods. soumis à Math. Mod. Num. Anal. (M2AN), 2003.
[61]: J. Erhel and M. Kern. Développement de méthodes numériques pour le transport réactif. En préparation, 2003.
[62]: A. Ern and J. Proft. Adaptive coupling of continuous and discontinuous galerkin methods for convection-diffusion problems. en préparation, 2003.
[63]: A. Ern and J. Proft. Numerical analysis of a continuous/discontinuous galerkin method for coupled hyperbolic/parabolic problems. en préparation, 2003.
[64]: A. Ern and J. Proft. A posteriori error analysis by duality for a convection-diffusion equation discretized by DG methods. CRAS Série I, en préparation, 2003.
[65]: R. Eymard, T. Gallouët, and R. Herbin. Error estimate for approximate solutions of a nonlinear convection-diffusion problem. Advances in Differential Equations, 7(4):419-440, 2002.
[66]: R. Eymard, R. Herbin, and A. Michel. Mathematical study of a petroleum-engineering scheme. Technical Report 02-26, LATP, 2002.
[67]: A. Fasano and A. Mikelic. The 3d flow of a liquid through a porous medium with absorbing and swelling granules. Interfaces and Free Boundaries, 4:329-261, 2002.
[68]: Ch. Felder, C. Oltean, M. Panfilov, and M. A. Buès. Theoretical, experimental and numerical investigations in Hele- Shaw. change of miscible mixing zone with low density. Accepté pour publication dans Transport in Porous Media, 2003.
[69]: J. L. Ferrin and A. Mikelic. Homogenizing the acoustic properties of a porous matrix containing an incompressible inviscid fluid. Mathematical Methods in the Applied Sciences, 26:831-859, 2003.
[70]: W-E. Fitzgibbon, M. Langlais, and J-J. Morgan. A reaction-diffusion system modeling direct and indirect transmission of a disease. En révision, 23 pages, 2003.
[71]: E. Flauraud, F. Nataf, S. Pegaz-Fiornet, F. Schneider, and F. Willien. A new fault model in geological basin modelling. application of a finite volume scheme and domain decomposition methods. In R. Herbin and D. Kröner, editors, Finite Volumes for Complex Applications III: Problems and Perspectives, pages 543-550. Hermes Penton Science, 2002.
[72]: L. Gerardo-Giorda, P. Le Tallec, and F. Nataf. A Robin-Robin preconditioner for strongly heterogeneous advection-diffusion problems. Technical Report TR 492, École Polytechnique, 2002. À paraitre dans CMAM.
[73]: Luca Gerardo-Giorda, Patrick Le Tallec, and Frédéric Nataf. A robin-robin preconditioner for advection-diffusion equations with discontinuous coefficients. CMAME, to appear 2003.
[74]: I. Greff. Schémas boîte et applications aux écoulements en milieu poreux. Thèse, Université de Metz, 2003.
[75]: I. Greff. Some box-schemes on quadrangles. In Int. Conf. on Finite Elements, LUXFEM, novembre 2003.
[76]: R. Hellmann, P. Gaviglio, P. J.N. Renders, J.-P. Gratier, S. Bekri, and P.M. Adler. Experimental pressure solution compaction of chalk in aqueous solutions. part 2. deformation examined by sem, porosimetry, synthetic permeability, and x-ray computerized tomography. In Water-Rock interactions, Ore deposits, and Environmental Geochemistry: A tribute to D.A. Crerar, number 7 in Special publication. The Geochemical Society, 2002.
[77]: R. Herbin and R. Kröner, editors. Finite volume for Complex Applications III: problems and perspectives. Hermes Penton Science, 2002.
[78]: W. Hundsdorfer and J. Jaffré. Implicit-explicit time stepping with spatial discontinuous finite elements. Applied Numerical Mathematics, 45:231-254, 2003.
[79]: I. Greff J-P. Croisille. A box scheme for convection-diffusion equations with sharp contrasts in the diffusion coefficients. Preprint Univ. de Metz, soumis, 2002.
[80]: J. Jaffré, V. Martin, and J. Roberts. Generalized cell-centered finite volume methods for flow in porous media with faults. In R. Herbin and D. Kröner, editors, Finite Volumes for Complex Applications III, pages 357-364. Hermes Penton Science, 2002.
[81]: J. Jaffré, V. Martin, and J. Roberts. Modeling fractures and barriers as interfaces for flow in porous media. Technical Report 4848, Inria, 2003.
[82]: J. Jaffré, V. Martin, and J. Roberts. Modeling fractures and barriers as interfaces for flow in porous media. accepté, 2004.
[83]: M. Kleptsyna and A. Piatnitski. Homogenization of random nonstationary convection-diffusion problem. Russian Math. Surveys, 57:729-751, 2002.
[84]: A. Lejay. Simulating a diffusion on a graph. application to reservoir engineering. Monte Carlo Methods Appl., 3, 2003.
[85]: Thibault Lemaire, Christian Moyne, and Didier Stemmelen. Infiltration experiment in a mx-80 bentonite in oedometric conditions. In International Meeting ``Clay in natural and engineered barriers for radioactive waste confinement'', Reims, France, 09-12 december 2002. soumis à ``Applied Clay Science''.
[86]: Thibault Lemaire, Christian Moyne, Didier Stemmelen, and Márcio A. Murad. Electro-chemo-mechanical couplings in swelling clays derived by homogenization: Electroviscous effects and onsager's relations. In Auriault et al Editors, editor, 2nd Biot Conference on Poromechanics, (Poromechanics II), pages 489-494, Grenoble, August 26-28 2002. Balkema Publishers.
[87]: R. Luce and S. Perez. A numerical upscaling method for an elliptic equation with heterogenous tensorial coefficients. International Journal for Numerical Methods in Engineering, 54:537-556, 2002.
[88]: V. Martin. Simulation multidomaine des écoulements en milieu poreux. Thèse, Université Paris Dauphine, 2004.
[89]: A. Mikelic and C. Rosier. Modeling solute transport through unsaturated porous media using homogenization I. À para^itre in Computational and Applied Mathematics, 2003.
[90]: A. Mikelic, A. Maazouz, J. Pousin, and E. Zeltz. Fluid injection model without surface tension for resins in thin molds. À paraître in Journal of Computational and Applied Mathematics, 2003.
[91]: A. Mikelic. Trends in Nonlinear Analysis, chapter Recent Developments in Multiscale Problems Coming from Fluid Mechanics, pages 225-267. Springer Verlag, Heidelberg, 2002. M. Kirkilionis and S. Krömker and R. Rannacher and F. Tomi, eds.
[92]: A. Mikelic. On an averaged model for the 2 fluid immiscible flow with surface tension in a thin domain. Computational Geosciences, 7:183-196, 2003.
[93]: V. Mityushev and P.M. Adler. Longitudinal permeability of spatially periodic rectangular arrays of circular cylinders, I. A single cylinder in the unit cell. ZAMM, 82, 2002.
[94]: V. Mityushev and P.M. Adler. Longitudinal permeability of spatially periodic rectangular arrays of circular cylinders, II. An arbitrary distribution of cylinders inside the unit cell. ZAMP, 53, 2002.
[95]: V. Mityushev and P.M. Adler. Schwarz problem for multiply connected domains and its application to diffusion around fractals. Complex variables: Theory and Application, 47, 2002.
[96]: A. Moctezuma-Berthier, O. Vizika, and P.M. Adler. Macroscopic conductivity of vugular porous media. Tranp. Porous Media, 49, 2002.
[97]: V.V. Mourzenko, F. Yousefian, B. Kolbah, J.-F. Thovert, and P.M. Adler. Solute transport at fracture intersections. Water Resources Research, 38, 2002.
[98]: Christian Moyne and Márcio Murad. Electro-chemo-mechanical couplings in swelling clays derived from micro/macro homogenization procedure. International Journal of Solids and Structures, 39:6159-6190, 2002.
[99]: Christian Moyne and Márcio A. Murad. Micromechanical computational modeling of hydratation swelling of montmorillonite. In Hueckel & Loret Di Maio, editor, Chemo-mechanical coupling in clays; from nanostructure to engineering applications, pages 121-147, Maratea (Italy), June 28-30 2002. Baklema. Volume II, 30 pages.
[100]: Christian Moyne and Márcio Murad. Macroscopic behaviour of swelling porous media derived from micromechanical analysis. Transport in Porous Media, 50:127-151, 2003.
[101]: M.A. Murad and C. Moyne. Micromechanical computational modeling of expansive porous media. C. R. Mecanique, 330:865-870, 2002.
[102]: F. Nataf. Quasi optimal interface conditions in domain decomposition methods. application to problems with extreme contrasts in the coefficients. Technical Report 518, CMAP École Polytechnique, 2003.
[103]: J. Niessner, R. Helmig, H. Jacobs, and J. Roberts. Interface condition and exact linearization in the newton iterations for two-phase flow in heterogeneous porous media. Technical Report 4903, INRIA, 2003.
[104]: JM. Palut, Ph. Montarnal, A. Gautschi, E. Tevissen, and E. Mouche. Characterisation of HTO diffusion properties by an in-situ tracer experiment in opalinus clay at Mont Terri. J. of Contaminant Hydrology, 61:203-218, mars 2003.
[105]: M. Panfilov and M. Buès. Delay model for a cycling transport through a porous medium. Soumis à Transport in Porous Media, 2002.
[106]: M. Panfilov and S. Floriat. Nonlinear mixing in two-phase flow through heterogeneous porous media. Soumis à Transport in Porous Media, 2003.
[107]: M. Panfilov. Macrosale models of two-phase flow with internal structure and dispersion in heterogeneous media. In S.M. Hassanizadeh and D.B. Das, editors, Proc. European Science Foundation Exploratory Workshop, Dordrecht, 2003. Kluwer Acedemic Publishers.
[108]: L. Pankratov and A. Piatnitski. Nonlinear "double porosity" type model. C. R. Acad. Sci. Paris Sir. I Math., 334:435-440, 2002.
[109]: L. Pankratov, A. Piatnitski, and V. Rybalko. Homogenized model of reaction-diffusion in a porous medium. Comptes Rendus Mecanique (CRAS), 331:253-258, 2003.
[110]: E. Pardoux and A. Piatnitski. Homogenization of a nonlinear random parabolic partial differential equation. Stochastic Process. Appl., 104:1-27, 2003.
[111]: C. Poutous. Etude d'une méthode de galerkin discontinue de type P^k+1-P^k. Rapport de stage, DEA de Mathématiques Appliquées (UPPA), 2002.
[112]: Sébastien Rolland, Didier Stemmelen, Farimah Masrouri, and Christian Moyne. Transferts hydriques dans un sol argileux gonflant non saturés : influence du confinement. À paraître dans Revue Française de Géotechnique, 2003.
[113]: M. Rosanne, M. Mammar, N.Koudina, B. Prunet-Foch, J.-F. Thovert, E. Tevissen, and P.M. Adler. Transport properties of compact clays. II Diffusion. À para^itre in J. Colloid Interf. Sci.,, 2003.
[114]: L. Saas, I. Faille, F. Nataf, and F. Willien. Domain decomposition with robin interface conditions on non-matching grids using finite volume method. In R. Herbin and D. Kröner, editors, Finite Volumes for Complex Applications III: Problems and Perspectives, pages 243-250. Hermes Penton Science, 2002.
[115]: F. Sauvage, M. Langlais, N-G. Yoccoz, and D. Pontier. Modelling hantavirus in cyclic bank voles: the role of indirect transmission on virus persistence. Journal of Animal Ecology, 72(1):1-13, 2003.
[116]: A. Sboui. Raffinement local en temps pour un problème de convection en milieu poreux. Technical report, Inria, 2003.
[117]: D. Talay and O. Vaillant. A stochastic particle method with random weights for the computation of statistical solutions of McKean-Vlasov equations. Ann. Appl. Probab., 13(1):140-180, 2003.
[118]: C.J. van Duijn, A.Mikelic, and I. S. Pop. Effective equations for two-phase flow including trapping on the micro scale. SIAM J. Appl. Math., 62:1531-1568, 2002.
[119]: C.J. van Duijn, A. Mikelic, and I.S. Pop. Effective Buckley-Leverett equations by homogenization. In A. Greco M. Anile, V. Capasso, editor, Progress in Industrial Mathematics at ECMI 2000, volume 1 of Mathematics in Industry, pages 42-51. Springer-Verlag Heidelberg, 2002.
[120]: C.J. van Duijn, A. Mikelic, and I. S. Pop. Upscaling of the crystal dissolution and precipitation in porous media for large Péclet and Damkohler's numbers. Technical report, TU Eindhoven, Pays-Bas, 2003.