References
- Douglas J Jr, Kischinhevsky M, Paes Leme PJ, et al. A multiple-porosity model for a single-phase flow through naturally-fractured porous media. Comput. Appl. Math. 1998;17:19–48.
- Flodén L, Olsson M. Reiterated homogenization of some linear and nonlinear monotone parabolic operators. Can. Appl. Math. Quat. 2006;14:149–183.
- Lions J-L, Lukassen D, Persson L-E, et al. Reiterated homogenization of monotone operators. CRAS, Série. 2000;I:675–680.
- Panfilov M, Rasoulzadeh M. Appearance of the nonlinearity from the nonlocality in diffusion through multiscale fractured porous media. Comput. Geosci. 2013;17:269–286.
- Panfilov M, Rasoulzadeh M, Kuchuk F. Effect of memory accumulation in three-scale fractured-porous media. Int. J. Heat Mass Transfer. 2014;76:171–183.
- Spagnuolo A, Wright S. Analysis of a multiple-porosity model for single-phase flow through naturally fractured porous media. J. Appl. Math. 2003;2003:327–364.
- Shi P, Spagnuolo A, Wright S. Reiterated homogenization and the double porosity model. Transport Porous Media. 2005;59:73–95.
- Donato P, Saint Jean Paulin J. Homogenization of the Poisson equation in a porous medium with double periodicity. Jpn. J. Ind. Appl. Math. 1993;10:333–349.
- Donato P, Saint Jean Paulin J. Stokes flow in a porous medium with double periodicity. Chipot M, Saint Jean Paulin J, Shafrir I, editors. Progress in partial differential equations: the Metz surveys. London: Pitman; 1994. pp. 116–129.
- Donato P, Picard C. Convergence of Dirichlet problems for monotone operators in a class of porous media. Ricerche di Matematica. 2000;XLIX:245–268.
- Lions J-L. Quelques méthodes de résolution des problèmes aux limites non linéaires. Paris: Dunod; 1969.
- Allaire G, Briane M. Multiscale convergence and reiterated homogenization. Proc. R. Soc. Edinburgh. 1996;126A:297–342.
- Bunoiu R. Sur quelques problèmes mathématiques en mécanique des fluides Ph.D. thesis. Metz: University of Metz; 1997.
- Bunoiu R, Saint Jean Paulin J. Linear flow in porous media with double periodicity. Portugaliae Math. 1999;56, Fasc 2:221–238.
- Bunoiu R, Cardone G. Bingham flow in porous media with obstacles of different size. submitted.
- Cioranescu D, Damlamian A, Griso G. Periodic unfolding and homogenization. C.R. Acad. Sci. Paris, Ser. I. 2002;335:99–104.
- Cioranescu D, Damlamian A, Griso G. The periodic unfolding method in homogenization. SIAM J. Math. Anal. 2008;40:1585–1620.
- Meunier N, Van Schaftingen J. Periodic reiterated homogenization for elliptic functions. J. Math. Pures Appl. 2005;84:1716–1743.
- Damlamian A, Meunier N, Van Schaftingen J. Periodic homogenization of monotone multivalued operators. Nonlinear Anal.: Theory Methods Appl. 2007;67:3217–3239.
- Tartar L. Convergence of the homogenization process. Appendix of E. Sanchez-Palencia, Non homogeneous media and vibration theory. Lecture notes in physics. Berlin: Springer-Verlag; 1980. Vol. 127, Lecture notes in physics.
- Amaziane B, Pankratov L, Piatnitski A. Homogenization of a class of quasilinear elliptic equations in high-contrast fissured media. Proc. R. Soc. Edinburgh. 2006;136A:1131–1155.
- Braides A, Chiadò V. Piat, A. Piatnitski, A variational approach to double-porosity problems, Asymptotic Anal. 2004;39:281–308.
- Amaziane B, Antontsev S, Pankratov L, et al. Homogenization of p-Laplacian in perforated domain. Annales de l’Institut Henri Poincaré - Analyse Nonlinéaire. 2009;26:2457–2479.
- Amaziane B, Pankratov L, Pritula VV. Homogenization of pε(x)-Laplacian in perforated domains with a nonlocal transmission condition. C.R. Méc. 2009;337:173–178.
- Amaziane B, Pankratov L. Homogenization in Sobolev spaces with nonstandard growth: brief review of methods and applications. Int. J. Differ. Equ. 2013;1–16, ID 693529.
- Cioranescu D, Girault V, Rajagopal KR. Mechanics and mathematics of a family of fluids of the differential type. Springer; Forthcoming.
- Bougeat A, Mikelić A. Homogenization of a polymer flow through a porous medium. Nonlinear Anal.: Theory Methods Appl. 1996;26:1221–1253.
- Bourgeat A, Mikelic A. A note on homogenization of Bingham flow through a porous medium. J. Math. Pures Appl. 1993;72:405–414.
- Mikelić A. Non-Newtonian flow. In: Hornung Ulrich, editor. Homogenization and porous media. Berlin: Springer; 1997.
- Bunoiu R, Cardone G, Perugia C. Unfolding method for the homogenization of bingham flow. Modelling and simulation in fluid dynamics in porous media. Vol. 28, Springer proceedings in mathematics and statistics. Berlin: Springer; 2013. pp. 107–122.
- Cioranescu D, Damlamian A, Griso G. The Stokes problem in perforated domains by the periodic unfolding method. In: Mihailescu-Suliciu M, editor. New trends in continuum mechanics. Bucarest: Theta; 2005.