R. Adams and J. Fournier, Sobolev spaces, vol.140, 2003.

M. Anguiano, Existence, uniqueness and homogenization of nonlinear parabolic problems with dynamical boundary conditions in perforated media, Mediterr. J. Math, vol.17, p.18, 2020.
URL : https://hal.archives-ouvertes.fr/hal-01643317

M. Anguiano, Homogenization of parabolic problems with dynamical boundary conditions of reactive-diffusive type in perforated media, Z. Angew. Math. Mech, 2020.
URL : https://hal.archives-ouvertes.fr/hal-02394935

H. Brezis, Functional analysis, Sobolev spaces and partial differential equations, 2011.

D. Cioranescu, A. Damlamian, and G. Griso, The periodic Unfolding Method in Homogenization, SIAM Journal on Mathematical Analysis, vol.40, issue.4, pp.1585-1620, 2008.
URL : https://hal.archives-ouvertes.fr/hal-00693080

D. Cioranescu and P. Donato, Homogénéisation du problème de Neumann non homogène dans des ouverts perfores, Asymptotic Analysis, vol.1, pp.115-138, 1988.

D. Cioranescu and P. Donato, An Introduction to Homogenization, Oxford Lectures Series in Mathematics and its Applications, vol.17, 1999.

D. Cioranescu and F. Murat, Un termeétrange venu d'ailleurs, II, Nonlinear partial differential equations and their applications, Collége de France Seminar, vol.III, pp.154-178, 1980.

D. Cioranescu, J. , and S. Paulin, Homogenization in open sets with holes, J. Math. Anal. Appl, vol.71, pp.590-607, 1979.

C. Conca, J. I. Díaz, A. Liñán, and C. Timofte, Homogenization in chemical reactive flows, Electronic Journal of Differential Equations, vol.40, pp.1-22, 2004.

J. I. Díaz, D. Gómez-castro, A. V. , and T. A. Shaposhnikova, On the asymptotic limit of the effectiveness of reaction-diffusion equations in periodically structured media, J. Math. Anal. Appl, vol.455, pp.1597-1613, 2017.

J. I. Díaz, D. Gómez-castro, A. V. , and T. A. Shaposhnikova, Non existence of critical scales in the homogenization of the problem with p-Laplace diffusion and nonlinear reaction in the boundary of periodically distributed particles in n-dimensional domains when p > n, Rev. R. Acad. Cienc. Exactas Fís. Nat. Ser. A Math. RACSAM, vol.112, pp.331-340, 2018.

P. Donato and G. Moscariello, On the homogenization of some nonlinear problems in perforated domains, Rendiconti del Seminario Matematico della Università di Padova, vol.84, pp.91-108, 1990.

C. G. Gal and J. Shomberg, Coleman-Gurtin type equations with dynamic boundary conditions, Phys. D, vol.292, pp.29-45, 2015.

G. R. Goldstein, Derivation and physical interpretation of general boundary conditions, Adv. Differential Equations, vol.11, issue.4, pp.457-480, 2006.

D. Gómez, M. Lobo, E. Pérez, A. V. , and T. A. Shaposhnikova, Homogenization for the p-Laplace operator and nonlinear Robin boundary conditions in perforated media along (n?1)-dimensional manifolds, Doklady Mathematics, vol.89, issue.1, pp.11-15, 2014.

D. Gómez, M. Lobo, E. Pérez, A. V. , and T. A. Shaposhnikova, Unilateral problems for the p-Laplace operator in perforated media involving large parameters, ESAIM Control Opti. Calc. Var, vol.24, issue.3, pp.921-964, 2018.

D. Gómez, M. E. Pérez, A. V. , and T. A. Shaposhnikova, Homogenization for the p-Laplace operator in perforated media, Doklady Mathematics, vol.92, issue.1, pp.433-438, 2015.

N. Labani and C. Picard, Homogenization of a nonlinear Dirichlet problem in a periodically perforated domain, in Recent advances in nonlinear elliptic and parabolic problems, Pitman Res. Notes Math. Ser, vol.208, 1989.

J. L. Lions, Quelques Méthodes de Résolution des Problèmes aux Limites Non linèaires, Dunod, 1969.

J. Ne?as, Direct methods in the theory of elliptic equations, 2012.

J. C. Robinson, Infinite-dimensional dynamical systems, 2001.

T. A. Shaposhnikova and A. V. , Podol'skii, Homogenization limit for the boundary value problem with the p-Laplace operator and a nonlinear third boundary condition on the boundary of the holes in a perforated domain, Funct. Differ. Equ, vol.19, pp.351-370, 2012.

L. Tartar, Problèmes d'homogénéisation dans leséquations aux dérivées partielles, 1977.

M. Vanninathan, Homogenization of eigenvalues problems in perforated domains, Proc. Indian Acad. of Sciences, vol.90, pp.239-271, 1981.