References
- Allaire G, Hutridurga H. Upscaling nonlinear adsorption in periodic porous media homogenization approach. Appl. Anal. Forthcoming 2015. doi:10.1080/00036811.2015.1038254.
- Chourabi I, Donato P. Homogenization and correctors of a class of elliptic problems in perforated domains. Asymptot. Anal. 2015;92:1–43. doi:10.3233/ASY-151288.
- Timofte C. Homogenization results for enzyme catalyzed reactions through porous media. Acta Math. Sci. 2009;29B:74–82.
- Gómez D, Lobo M, Pérez ME, et al. Averaging of variational inequalities for the Laplacian with nonlinear restrictions along manifolds. Appl. Anal. 2013;92:218–237.
- Gómez D, Lobo M, Pérez ME, et al. On critical parameters in homogenization of perforated domains by thin tubes with nonlinear flux and related spectral problems. Math. Methods Appl. Sci. 2015;38:2606–2629.
- Gómez D, Lobo M, Pérez ME, et al. Homogenization of a variational inequality for the p-Laplacian in perforated media with nonlinear restrictions for the fux on the boundary of isoperimetric perforations: p equal to the dimension of the space. Dokl. Math. Forthcoming 2016;467:18–22. doi:10.7868/S0869565216070069.
- Gómez D, Pérez ME, Shaposhnikova TA. On homogenization of nonlinear Robin type boundary conditions for cavities along manifolds and associated spectral problems. Asympot. Anal. 2012;80:289–322.
- Cioranescu D, Murat F. Un terme étrange venu d’ailleurs I & II [A strange term coming from nowhere I & II]. In Brezis H, Lions JL, editors. Nonlinear partial differential equations and their applications, Collège de France Séminar Vols. II and III, Vols. 60, 70, Pitman research notes in mathematics. London: Pitman; 1982. p. 98–138, 154–178.
- Marchenko VA, Khruslov EYa. Boundary value problems in domains with a fine-grained boundary. Kiev: Naukova Dumka; 1974. Russian.
- Sanchez-Palencia E. Boundary value problems in domains containing perforated wall. In: Brezis H, Lions JL, editors. Nonlinear partial differential equations and their applications, Collège de France Seminar Volume III. Vol. 70, Pitman research notes in mathematics. Boston (MA): Pitman; 1982. p. 309–325.
- Goncharenko M. The asymptotic behaviour of the third boundary-value problem solutions in domains with fine-grained boundaries. In Cioranescu D, Damlamian A and Donato P, editors. Homogenization and applications to material sciences, Vol. 9, GAKUTO international series mathematical science and applications. Tokyo: Gakkotosho; 1995. p. 203–213.
- Kaizu S. The Poisson equation with semilinear boundary conditions in domains with many tiny holes. J. Fac. Sci. Univ. Tokyo Sect. IA Math. 1989;36:43–86.
- Cioranescu D, Donato P, Ene H. Homogenization of the Stokes problem with non homogeneous slip boundary conditions. Math. Methods Appl. Sci. 1996;19:857–881.
- Conca C. On the application of the homogenization theory to a class of problems arising in fluid mechanics. J. Math. Pures Appl. 1985;64:31–75.
- Conca C, Díaz JI, Timofte C. Effective chemical processes in porous media. Math. Models Methods Appl. Sci. 2003;13:1437–1462.
- Hornung U. Homogenization and porous media. New York (NY): Springer-Velag; 1997.
- Marpeau F, Saad M. Mathematical analysis of radionuclides displacement in porous media with nonlinear adsorption. J. Differ. Equ. 2006;228:412–439.
- Allaire G. Homogenization of the Naviers--Stokes equations in open sets perforated with tiny holes II. Non critical size of the holes for a volume distribution of holes and a surface distribution of holes. Arch. Ration. Mech. Anal. 1983;113:261–298.
- Conca C. The Stokes sieve problem. Commun. Appl. Numer. Methods. 1988;4:113–121.
- Sanchez-Palencia E. Un problème d’ecoulement lent d’un fluide incompressible au travers d’une paroi finement perfore [Slow incompressible fluid flow through a finely perforated wall]. In: Homogenization methods: theory and applications in physics (Brau-sans-Nappe, 1983). Vol. 57, Collect. Dir. Études Rech. Élec. France. Paris: Eyrolles; 1985. p. 371–400.
- Sanchez-Hubert J, Sanchez-Palencia E. Acoustic fluid flow through holes and permeability of perforated walls. J. Math. Anal. Appl. 1982;87:427–453.
- Jagër W, Hornung U. Diffusion, convection, adsorption and reaction of chemicals in porous media. J. Differ. Equ. 1991;92:199–225.
- Ladyzhenskaya OA. The mathematical theory of viscous incompressible flow. Vol. 2, Mathematics and its applications. New York (NY): Gordon and Breach; 1969.
- Temam R. Navier–Stokes equations. Theory and numerical analysis. Vol. 2, Studies in mathematics and its applications. Amsterdam: North-Holland; 1979.
- Lions JL. Quelques Méthodes de Résolution des Problémes aux Limites non Linéaires [On certain methods for solving nonlinear boundary value problems]. Paris: Dunod; 1969.
- Brezis H. Problèmes unilatéraux [Unilateral problems]. J. Math. Pures Appl. 1972;51:1–168.
- Cioranescu D, Donato P, Zaki R. Asymptotic behavior of elliptic problems in perforated domain with nonlinear boundary condition. Asymptot. Anal. 2007;53:209–235.
- Brillard A. Asymptotic of a viscous and incompressible fluid through a plane sieve. In Bandle C, Bemelmans J, Chipot M, Grüter M, Saint Jean Paulin J, editors. Progress in partial differential equations: calculus of variations, applications (Pont-Mousson, 1991). Vol. 267, Pitman research notes in mathematics series. Harlow: Longman Science and Technology; 1992. p. 158–172.
- Lobo M, Pérez ME, Sukharev VV, et al. Averaging of boundary-value problem in domain perforated along (n-1) -- dimensional manifold with nonlinear third type boundary conditions on the boundary of cavities. Dokl. Math. 2011;83:34–38.
- Oleinik OA, Shamaev AS, Yosifian GA. Mathematical problems in elasticity and homogenization. Amsterdam: North-Holland; 1992.
- Lobo M, Oleinik OA, Pérez ME, et al. On homogenization of solutions of boundary value problem in domains perforated along manifolds. Ann. Scuola Norm. Sup. Pisa Cl. Sci. Ser 4. 1997;25:611–629.
- Pérez E, Shaposhnikova TA, Zubova MN. A homogenization problem in a domain perforated by tiny isoperimetric holes with nonlinear Robin type boundary conditions. Dokl. Math. 2014;90:489–494.
- Shahbeig H, Bagheri N, Ghorbanian SA, et al. A new adsorption isotherm model of aqueous solutions on granular activated carbon. World J. Model. Simul. 2013;9:243–254.
- Tosun I. Ammonium removal from aqueous solutions by clinoptilolite: determination of isotherm and thermodynamic parameters and comparison of knetics by the double exponential model and conventional kinetic models. Int. J. Environ. Res. Public Health. 2012;9:970–984.