Crossref Citations
This article has been cited by the following publications. This list is generated based on data provided by
Crossref.
Podol’skii, A. V.
2010.
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.
Doklady Mathematics,
Vol. 82,
Issue. 3,
p.
942.
Piatnitski, A.
and
Rybalko, V.
2011.
Homogenization of boundary value problems for monotone operators in perforated domains with rapidly oscillating boundary conditions of fourier type.
Journal of Mathematical Sciences,
Vol. 177,
Issue. 1,
p.
109.
Lobo, M.
Perez, M. E.
Sukharev, V. V.
and
Shaposhnikova, T. A.
2011.
Averaging of boundary-value problem in domain perforated along (n − 1)-dimensional manifold with nonlinear third type boundary conditions on the boundary of cavities.
Doklady Mathematics,
Vol. 83,
Issue. 1,
p.
34.
Zubova, M. N.
and
Shaposhnikova, T. A.
2011.
Homogenization of boundary value problems in perforated domains with the third boundary condition and the resulting change in the character of the nonlinearity in the problem.
Differential Equations,
Vol. 47,
Issue. 1,
p.
78.
Chiado Piat, Valeria
S. Nazarov, Sergey
and
Piatnitski, Andrey
2012.
Steklov problems in perforated domains
with a coefficient of indefinite sign.
Networks & Heterogeneous Media,
Vol. 7,
Issue. 1,
p.
151.
Cioranescu, D.
Damlamian, A.
Donato, P.
Griso, G.
and
Zaki, R.
2012.
The Periodic Unfolding Method in Domains with Holes.
SIAM Journal on Mathematical Analysis,
Vol. 44,
Issue. 2,
p.
718.
Zubova, M. N.
and
Shaposhnikova, T. A.
2013.
Averaging of boundary-value problems for the Laplace operator in perforated domains with a nonlinear boundary condition of the third type on the boundary of cavities.
Journal of Mathematical Sciences,
Vol. 190,
Issue. 1,
p.
181.
Jäger, Willi
Neuss-Radu, Maria
and
Shaposhnikova, Tatiana A.
2014.
Homogenization of a variational inequality for the Laplace operator with nonlinear restriction for the flux on the interior boundary of a perforated domain.
Nonlinear Analysis: Real World Applications,
Vol. 15,
Issue. ,
p.
367.
Franchi, Bruno
and
Lorenzani, Silvia
2016.
From a Microscopic to a Macroscopic Model for Alzheimer Disease: Two-Scale Homogenization of the Smoluchowski Equation in Perforated Domains.
Journal of Nonlinear Science,
Vol. 26,
Issue. 3,
p.
717.
Desvillettes, Laurent
and
Lorenzani, Silvia
2018.
Homogenization of the discrete diffusive coagulation–fragmentation equations in perforated domains.
Journal of Mathematical Analysis and Applications,
Vol. 467,
Issue. 2,
p.
1100.