An inverse problem for a double phase implicit obstacle problem with multivalued terms

článek v časopise ve Web of Science, Jimp

angličtina

In this paper, we study an inverse problem of estimating three discontinuous parameters in a double phase implicit obstacle problem with multivalued terms and mixed boundary conditions which is formulated by a regularized optimal control problem. Under very general assumptions, we introduce a multivalued function called a parameter-to-solution map which admits weakly compact values. Then, by employing the Aubin-Cellina convergence theorem and the theory of nonsmooth analysis, we prove that the parameter-to-solution map is bounded and continuous in the sense of Kuratowski. Finally, a generalized regularization framework for the inverse problem is developed and a new existence theorem is provided.

Clarke subdifferential;discontinuous parameter;double phase operator;implicit obstacle problem;inverse problem;optimal control;Steklov eigenvalue

RADULESCU, V.; ZENG, S.; BAI, Y.; WINKERT, P.

27. 4. 2023

1262-3377

ESAIM-CONTROL OPTIMISATION AND CALCULUS OF VARIATIONS

29

30

Francouzská republika

1

30

30

https://www-webofscience-com.ezproxy.lib.vutbr.cz/wos/woscc/full-record/WOS:000977790200001

http://hdl.handle.net/11012/244331