Abstract
In this paper we consider the problem of identification of a discontinuous coefficient in elliptic hemivariational inequality. First we prove an existence theorem for an inverse problem and we establish the boundary homogenization result for the direct problem. Then we study the asymptotic behavior of the set of solutions to the inverse problem. We show that the solution set to the inverse problem for homogenized hemivariational inequality has the upper semicontinuity property with respect to the solution set of the original identification problem.KeywordsInverse ProblemDirect ProblemHemivariational InequalitySemicontinuity PropertyLipschitz Continuous BoundaryThese keywords were added by machine and not by the authors. This process is experimental and the keywords may be updated as the learning algorithm improves.
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