Inverse problems for multi-valued quasi variational inequalities and noncoercive variational inequalities with noisy data |
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| Authors: | Akhtar A Khan Stanislaw Migorski Miguel Sama |
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| Institution: | 1. Center for Applied and Computational Mathematics, School of Mathematical Sciences, Rochester Institute of Technology, Rochester, New York, USAaaksma@rit.edu;3. College of Applied Mathematics, Chengdu University of Information Technology, Chengdu, P.R. China;4. Chair of Optimization and Control, Jagiellonian University in Krakow, Krakow, Poland;5. Departamento de Matemática Aplicada, Universidad Nacional de Educación a Distancia, Madrid, Spain |
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| Abstract: | ABSTRACTWe study the inverse problem of identifying a variable parameter in variational and quasi-variational inequalities. We consider a quasi-variational inequality involving a multi-valued monotone map and give a new existence result. We then formulate the inverse problem as an optimization problem and prove its solvability. We also conduct a thorough study of the inverse problem of parameter identification in noncoercive variational inequalities which appear commonly in applied models. We study the inverse problem by posing optimization problems using the output least-squares and the modified output least-squares. Using regularization, penalization, and smoothing, we obtain a single-valued parameter-to-selection map and study its differentiability. We consider optimization problems using the output least-squares and the modified output least-squares for the regularized, penalized and smoothened variational inequality. We give existence results, convergence analysis, and optimality conditions. We provide applications and numerical examples to justify the proposed framework. |
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| Keywords: | Inverse problems variational inequalities quasi-variational inequalities regularization |
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