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Homogenization of variational inequalities and equations defined by pseudomonotone operators

Journal Article · · Sbornik. Mathematics
 [1]
  1. T.G. Shevchenko Kiev National University, Kiev (Ukraine)
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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.
OSTI ID:
21096809
Journal Information:
Sbornik. Mathematics, Journal Name: Sbornik. Mathematics Journal Issue: 1 Vol. 199; ISSN 1064-5616
Country of Publication:
United States
Language:
English

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Related Subjects

71 CLASSICAL AND QUANTUM MECHANICS
GENERAL PHYSICS
BOUNDARY CONDITIONS
CONVERGENCE
EQUATIONS
FUNCTIONS
MATHEMATICAL SOLUTIONS
NONLINEAR PROBLEMS
PERIODICITY
VARIATIONAL METHODS