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This article is cited in 14 scientific papers (total in 14 papers)
Homogenization of variational inequalities and equations
defined by pseudomonotone operators
G. V. Sandrakov National Taras Shevchenko University of Kyiv
Abstract:
Results on the convergence of sequences of solutions of non-linear equations and variational inequalities for
obstacle problems are proved. The variational inequalities and equations
are defined by a non-linear, pseudomonotone operator of the second order with periodic, rapidly oscillating coefficients and by sequences of functions characterizing the obstacles and the boundary conditions. Two-scale and macroscale (homogenized) limiting problems for such variational inequalities and equations
are obtained. Results on the relationship between solutions of these limiting problems are established and sufficient conditions for the uniqueness of solutions are presented.
Bibliography: 25 titles.
Received: 28.06.2005 and 14.09.2007
Citation:
G. V. Sandrakov, “Homogenization of variational inequalities and equations
defined by pseudomonotone operators”, Mat. Sb., 199:1 (2008), 67–100; Sb. Math., 199:1 (2008), 67–98
Linking options:
https://www.mathnet.ru/eng/sm1116https://doi.org/10.1070/SM2008v199n01ABEH003911 https://www.mathnet.ru/eng/sm/v199/i1/p67
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Abstract page: | 582 | Russian version PDF: | 248 | English version PDF: | 29 | References: | 67 | First page: | 6 |
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