Равномерная сходимость и асимптотики для задач в областях с мелкой перфорацией вдоль заданного многообразия в случае усредненного условия Дирихле
- 26 July 2021
- journal article
- Published by Steklov Mathematical Institute
- Vol. 212 (8), 33-88
- https://doi.org/10.4213/sm9435
Abstract
No abstract availableFunding Information
- Russian Science Foundation (20-11-19995)
This publication has 27 references indexed in Scilit:
- Averaging of variational inequalities for the Laplacian with nonlinear restrictions along manifoldsApplicable Analysis, 2011
- Averaging of boundary-value problem in domain perforated along (n − 1)-dimensional manifold with nonlinear third type boundary conditions on the boundary of cavitiesDoklady Mathematics, 2011
- On a waveguide with an infinite number of small windowsComptes Rendus Mathematique, 2011
- Homogenization of the planar waveguide with frequently alternating boundary conditionsJournal of Physics A: Mathematical and Theoretical, 2009
- On the Friedrichs inequality in a domain perforated aperiodically along the boundary. Homogenization procedure. Asymptotics for parabolic problemsRussian Journal of Mathematical Physics, 2009
- Homogenization in domains randomly perforated along the boundaryDiscrete & Continuous Dynamical Systems - B, 2009
- Operator estimates in nonlinear problems of reiterated homogenizationProceedings of the Steklov Institute of Mathematics, 2008
- Discrete spectrum of an asymmetric pair of waveguides coupled through a windowSbornik: Mathematics, 2006
- Дискретный спектр пары несимметричных волноводов, соединенных окномМатематический сборник, 2006
- Joint sessions of the Petrovskii Seminar on differential equations and mathematical problems of physics and the Moscow Mathematical Society (Thirteenth session, 2-5 February 1990)Russian Mathematical Surveys, 1990