根据两次观测结果数值重构扩散系数和电位系数:解耦恢复和误差估计

IF 2.8 2区 数学 Q1 MATHEMATICS, APPLIED
Siyu Cen, Zhi Zhou
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引用次数: 0

摘要

SIAM 数值分析期刊》第 62 卷第 5 期第 2276-2307 页,2024 年 10 月。 摘要本文的重点是利用解的两个内部测量值,同时重建椭圆/抛物方程中的扩散系数和势系数。本文构建了一种解耦算法来依次恢复这两个参数。第一步,我们采用直接的重述方法,从而解决识别扩散系数的标准问题。然后,利用输出最小二乘法与有限元离散化相结合的方法,以数值方法恢复该系数,而无需了解电势。在第二步中,采用与第一步类似的方法,利用先前恢复的扩散系数重建电势系数。我们的方法受到构造条件稳定性的启发,我们在[数学]中为恢复的扩散系数和势能系数提供了严格的先验误差估计。为了得出这些估计值,我们开发了一个加权能量论证和合适的正向条件。这些估计值为根据噪声水平选择正则化参数和离散化网格大小提供了有益的指导。我们还介绍了一些数值实验,以证明数值方案的准确性,并支持我们的理论结果。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Numerical Reconstruction of Diffusion and Potential Coefficients from Two Observations: Decoupled Recovery and Error Estimates
SIAM Journal on Numerical Analysis, Volume 62, Issue 5, Page 2276-2307, October 2024.
Abstract. The focus of this paper is on the concurrent reconstruction of both the diffusion and potential coefficients present in an elliptic/parabolic equation, utilizing two internal measurements of the solutions. A decoupled algorithm is constructed to sequentially recover these two parameters. In the first step, we implement a straightforward reformulation that results in a standard problem of identifying the diffusion coefficient. This coefficient is then numerically recovered, with no requirement for knowledge of the potential, by utilizing an output least-squares method coupled with finite element discretization. In the second step, the previously recovered diffusion coefficient is employed to reconstruct the potential coefficient, applying a method similar to the first step. Our approach is stimulated by a constructive conditional stability, and we provide rigorous a priori error estimates in [math] for the recovered diffusion and potential coefficients. To derive these estimates, we develop a weighted energy argument and suitable positivity conditions. These estimates offer a beneficial guide for choosing regularization parameters and discretization mesh sizes, in accordance with the noise level. Some numerical experiments are presented to demonstrate the accuracy of the numerical scheme and support our theoretical results.
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来源期刊
CiteScore
4.80
自引率
6.90%
发文量
110
审稿时长
4-8 weeks
期刊介绍: SIAM Journal on Numerical Analysis (SINUM) contains research articles on the development and analysis of numerical methods. Topics include the rigorous study of convergence of algorithms, their accuracy, their stability, and their computational complexity. Also included are results in mathematical analysis that contribute to algorithm analysis, and computational results that demonstrate algorithm behavior and applicability.
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