On mathematical modelling of measles disease via collocation approach.

IF 3.1 Q2 HEALTH CARE SCIENCES & SERVICES AIMS Public Health Pub Date : 2024-05-06 eCollection Date: 2024-01-01 DOI:10.3934/publichealth.2024032
Shahid Ahmed, Shah Jahan, Kamal Shah, Thabet Abdeljawad
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Abstract

Measles, a highly contagious viral disease, spreads primarily through respiratory droplets and can result in severe complications, often proving fatal, especially in children. In this article, we propose an algorithm to solve a system of fractional nonlinear equations that model the measles disease. We employ a fractional approach by using the Caputo operator and validate the model's by applying the Schauder and Banach fixed-point theory. The fractional derivatives, which constitute an essential part of the model can be treated precisely by using the Broyden and Haar wavelet collocation methods (HWCM). Furthermore, we evaluate the system's stability by implementing the Ulam-Hyers approach. The model takes into account multiple factors that influence virus transmission, and the HWCM offers an effective and precise solution for understanding insights into transmission dynamics through the use of fractional derivatives. We present the graphical results, which offer a comprehensive and invaluable perspective on how various parameters and fractional orders influence the behaviours of these compartments within the model. The study emphasizes the importance of modern techniques in understanding measles outbreaks, suggesting the methodology's applicability to various mathematical models. Simulations conducted by using MATLAB R2022a software demonstrate practical implementation, with the potential for extension to higher degrees with minor modifications. The simulation's findings clearly show the efficiency of the proposed approach and its application to further extend the field of mathematical modelling for infectious illnesses.

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通过搭配法建立麻疹疾病的数学模型。
麻疹是一种传染性极强的病毒性疾病,主要通过呼吸道飞沫传播,可导致严重的并发症,尤其是对儿童而言,往往是致命的。在本文中,我们提出了一种解决麻疹疾病模型分式非线性方程组的算法。我们通过使用卡普托算子来采用分式方法,并应用 Schauder 和 Banach 定点理论来验证模型。分式导数是模型的重要组成部分,可通过布洛伊登和哈小波配位法(HWCM)精确处理。此外,我们还采用了 Ulam-Hyers 方法来评估系统的稳定性。该模型考虑了影响病毒传播的多种因素,HWCM 提供了一种有效而精确的解决方案,通过使用分数导数来深入了解传播动态。我们展示了图形结果,这些结果提供了一个全面而宝贵的视角,让我们了解各种参数和分数阶数如何影响模型中这些分区的行为。这项研究强调了现代技术在理解麻疹爆发方面的重要性,表明该方法适用于各种数学模型。使用 MATLAB R2022a 软件进行的模拟证明了该方法的实用性,并有可能在稍作修改后扩展到更高的程度。模拟结果清楚地表明了所提方法的效率及其在进一步扩展传染病数学建模领域的应用。
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来源期刊
AIMS Public Health
AIMS Public Health HEALTH CARE SCIENCES & SERVICES-
CiteScore
4.80
自引率
0.00%
发文量
31
审稿时长
4 weeks
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