Journal of Siberian Federal University. Mathematics & Physics: On the Stability of the Solutions of Inverse Problems for Elliptic Equations

Journal of Siberian Federal University. Mathematics & Physics / On the Stability of the Solutions of Inverse Problems for Elliptic Equations

Issue: Journal of Siberian Federal University. Mathematics & Physics. Prepublication
Authors: Velisevich, Alexander V.; Lyubanova, Anna Sh.
Contact information: Velisevich, Alexander V. : Siberian Federal University Krasnoyarsk, Russian Federation; ; Lyubanova, Anna Sh. : Siberian Federal University Krasnoyarsk, Russian Federation;
Keywords: inverse problem; elliptic equation; integral overdetermination; continuous dependence on input data
Abstract: The inverse problems on finding the unknown lower coefficient in linear and nonlinear second- order elliptic equations with integral overdetermination conditions are considered. The conditions of overdetermination are given on the boundary of the domain. The continuous dependence of the strong solution on the input data of the inverse problem for the linear equation is proved in the case of the mixed boundary condition. As to the nonlinear equation, the continuous dependence of the strong solution on the overdetermination data is established for the inverse problem with the Dirichlet boundary condition
Pages: 398–407
EDN: VUWGFQ
Paper at repository of SibFU: https://elib.sfu-kras.ru/handle/2311/152855