Inverse problems for coupled nonlocal nonlinear systems arising in mathematical biology

arXiv - QuanBio - Populations and Evolution Pub Date : 2024-07-22 DOI:arxiv-2407.15713

Ming-Hui Ding, Hongyu Liu, Catharine W. K. Lo

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Abstract

In this paper, we propose and study several inverse problems of determining unknown parameters in nonlocal nonlinear coupled PDE systems, including the potentials, nonlinear interaction functions and time-fractional orders. In these coupled systems, we enforce non-negativity of the solutions, aligning with realistic scenarios in biology and ecology. There are several salient features of our inverse problem study: the drastic reduction in measurement/observation data due to averaging effects, the nonlinear coupling between multiple equations, and the nonlocality arising from fractional-type derivatives. These factors present significant challenges to our inverse problem, and such inverse problems have never been explored in previous literature. To address these challenges, we develop new and effective schemes. Our approach involves properly controlling the injection of different source terms to obtain multiple sets of mean flux data. This allows us to achieve unique identifiability results and accurately determine the unknown parameters. Finally, we establish a connection between our study and practical applications in biology, further highlighting the relevance of our work in real-world contexts.

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数学生物学中出现的耦合非局部非线性系统的逆问题

本文提出并研究了在非局部非线性耦合 PDE 系统中确定未知参数的几个逆问题，包括势、非线性相互作用函数和时间分阶。在这些耦合系统中，我们强制要求解的非负性，以符合生物学和生态学中的实际情况。我们的逆问题研究有几个显著特点：平均效应导致测量/观测数据的急剧减少、多个方程之间的非线性耦合以及分数阶乘法产生的非局部性。这些因素对我们的逆问题提出了重大挑战，而此类逆问题在以往的文献中从未被探讨过。为了应对这些挑战，我们开发了新的有效方案。我们的方法包括适当控制不同源点的注入，以获得多组平均通量数据。最后，我们建立了我们的研究与生物学实际应用之间的联系，进一步突出了我们的工作在现实世界中的相关性。

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arXiv - QuanBio - Populations and Evolution

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