Advances in Difference Equations | |
An inverse problem of reconstructing the time-dependent coefficient in a one-dimensional hyperbolic equation | |
Dumitru Baleanu1  M. J. Huntul2  Muhammad Abbas3  | |
[1] Department of Mathematics, Faculty of Arts and Sciences, Çankaya University;Department of Mathematics, Faculty of Science, Jazan University;Department of Mathematics, University of Sargodha; | |
关键词: Hyperbolic equation; Inverse problem; Periodic boundary; Integral boundary; Tikhonov regularization; Optimization; | |
DOI : 10.1186/s13662-021-03608-1 | |
来源: DOAJ |
【 摘 要 】
Abstract In this paper, for the first time the inverse problem of reconstructing the time-dependent potential (TDP) and displacement distribution in the hyperbolic problem with periodic boundary conditions (BCs) and nonlocal initial supplemented by over-determination measurement is numerically investigated. Though the inverse problem under consideration is ill-posed by being unstable to noise in the input data, it has a unique solution. The Crank–Nicolson-finite difference method (CN-FDM) along with the Tikhonov regularization (TR) is applied for calculating an accurate and stable numerical solution. The programming language MATLAB built-in lsqnonlin is used to solve the obtained nonlinear minimization problem. The simulated noisy input data can be inverted by both analytical and numerically simulated. The obtained results show that they are accurate and stable. The stability analysis is performed by using Fourier series.
【 授权许可】
Unknown