An inverse problem for pseudoparabolic equation: existence, uniqueness, stability, and numerical analysis

Research Article

An inverse problem for pseudoparabolic equation: existence, uniqueness, stability, and numerical analysis

Published in: Quaestiones Mathematicae
Volume 47 , issue 10 , 2024 , pages: 1979–2001
DOI: 10.2989/16073606.2024.2347432
Author(s): Kh. Khompysh Al-Farabi Kazakh National University, Kazakhstan , M.J. Huntul Jazan University, Saudi Arabia , M.K. Shazyndayeva Al-Farabi Kazakh National University, Kazakhstan , M.K. Iqbal Government College University, Pakistan

Abstract

In this paper, we study an inverse problem for a linear third-order pseudoparabolic equation. The investigated inverse problem consists of determining a space-dependent coefficient of the right-hand side of a pseudoparabolic equation. As an additional information a final overdetermination condition is considered. Under the suitable conditions on the data of the problem, the unique solvability of the considered inverse problem is established. The stability of solutions is also proved. The established results are also true for inverse problems for parabolic equations, which could be obtained as a regularization of the studied pseudoparabolic equation. In addition, the pseudoparabolic problem is discretized using the cubic B-spline functions and recast as a nonlinear least-squares minimization of the Tikhonov regularization function. Numerically, this is effectively solved using the MATLAB subroutine lsqnonlin. Both exact and noisy data are inverted. Numerical results for three benchmark test examples are presented and discussed. Moreover, the von Neumann stability analysis is also discussed.

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