Well-posedness and Tikhonov regularization of an inverse source problem for a parabolic equation with an integral constraint

IF 0.9 4区数学 Q2 MATHEMATICS

Journal of Inverse and Ill-Posed Problems Pub Date : 2024-04-02 DOI:10.1515/jiip-2023-0050

Sedar Ngoma

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引用次数: 0

Abstract

We investigate a time-dependent inverse source problem for a parabolic partial differential equation with an integral constraint and subject to Neumann boundary conditions in a domain of R d

\mathbb{R}^{d}

, d ≥ 1

d\geq 1

. We prove the well-posedness as well as higher regularity of solutions in Hölder spaces. We then develop and implement an algorithm that we use to approximate solutions of the inverse problem by means of a finite element discretization in space. Due to instability in inverse problems, we apply Tikhonov regularization combined with the discrepancy principle for selecting the regularization parameter in order to obtain a stable reconstruction. Our numerical results show that the proposed scheme is an accurate technique for approximating solutions of this inverse problem.

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具有积分约束条件的抛物方程的反源问题的良好拟合和 Tikhonov 正则化

我们研究了在 R d \mathbb{R}^{d}, d ≥ 1 d\geq 1 的域中，具有积分约束条件并受诺伊曼边界条件限制的抛物线偏微分方程的时变反源问题。我们证明了在赫尔德空间中解的可求性及高正则性。然后，我们开发并实现了一种算法，通过有限元空间离散化来近似求解逆问题。由于逆问题的不稳定性，我们采用提霍诺夫正则化结合差异原则来选择正则化参数，以获得稳定的重构。我们的数值结果表明，所提出的方案是近似求解该逆问题的精确技术。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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来源期刊

Journal of Inverse and Ill-Posed Problems MATHEMATICS, APPLIED-MATHEMATICS

CiteScore

2.60

自引率

9.10%

发文量

审稿时长

>12 weeks

期刊介绍： This journal aims to present original articles on the theory, numerics and applications of inverse and ill-posed problems. These inverse and ill-posed problems arise in mathematical physics and mathematical analysis, geophysics, acoustics, electrodynamics, tomography, medicine, ecology, financial mathematics etc. Articles on the construction and justification of new numerical algorithms of inverse problem solutions are also published. Issues of the Journal of Inverse and Ill-Posed Problems contain high quality papers which have an innovative approach and topical interest. The following topics are covered: Inverse problems existence and uniqueness theorems stability estimates optimization and identification problems numerical methods Ill-posed problems regularization theory operator equations integral geometry Applications inverse problems in geophysics, electrodynamics and acoustics inverse problems in ecology inverse and ill-posed problems in medicine mathematical problems of tomography