Stochastic Runge–Kutta for numerical treatment of dengue epidemic model with Brownian uncertainty

IF 1.8 4区 物理与天体物理 Q3 PHYSICS, APPLIED Modern Physics Letters B Pub Date : 2024-05-30 DOI:10.1142/s0217984924504086
Nabeela Anwar, Iftikhar Ahmad, Hijab Javaid, Adiqa Kausar Kiani, Muhammad Shoaib, Muhammad Asif Zahoor Raja
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Abstract

The current challenge faced by the global research community is how to effectively address, manage, and control the spread of infectious diseases. This research focuses on conducting a dynamic system analysis of a stochastic epidemic model capable of predicting the persistence or extinction of the dengue disease. Numerical methodology on deterministic procedures, i.e. Adams method and stochastic/probabilistic schemes, i.e. stochastic Runge–Kutta method, is employed to simulate and forecast the spread of disease. This study specifically employs two nonlinear mathematical systems, namely the deterministic vector-borne dengue epidemic (DVBDE) and the stochastic vector-borne dengue epidemic (SVBDE) models, for numerical treatment. The objective is to simulate the dynamics of these models and ascertain their dynamic behavior. The VBDE model segmented the population into the following five classes: susceptible population, infected population, recovered population, susceptible mosquitoes, and the infected mosquitoes. The approximate solution for the dynamic evolution for each population is calculated by generating a significant number of scenarios varying the infected population’s recovery rate, human population birth rate, mosquitoes birth rate, contaminated people coming into contact with healthy people, the mortality rate of people, mosquitos population death rate and infected mosquito contact rate with population that is not infected. Comparative evaluations of the deterministic and stochastic models are presented, highlighting their unique characteristics and performance, through the execution of numerical simulations and analysis of the results.

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用随机 Runge-Kutta 对具有布朗不确定性的登革热流行病模型进行数值处理
如何有效应对、管理和控制传染病的传播是全球研究界当前面临的挑战。本研究的重点是对能够预测登革热病持续或消亡的随机流行病模型进行动态系统分析。采用确定性程序(即亚当斯方法)和随机/概率方案(即随机 Runge-Kutta 方法)的数值方法来模拟和预测疾病的传播。本研究特别采用了两个非线性数学系统,即确定性病媒传播登革热流行病(DVBDE)和随机病媒传播登革热流行病(SVBDE)模型进行数值处理。目的是模拟这些模型的动态并确定其动态行为。VBDE 模型将人群分为以下五类:易感人群、感染人群、康复人群、易感蚊子和感染蚊子。通过改变受感染人群的恢复率、人类出生率、蚊子出生率、受感染人群与健康人群的接触率、人类死亡率、蚊子死亡率以及受感染蚊子与未感染人群的接触率,产生大量情景,计算出每个人群动态演化的近似解。通过执行数值模拟和结果分析,对确定性模型和随机模型进行了比较评估,突出了它们的独特性和性能。
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来源期刊
Modern Physics Letters B
Modern Physics Letters B 物理-物理:凝聚态物理
CiteScore
3.70
自引率
10.50%
发文量
235
审稿时长
5.9 months
期刊介绍: MPLB opens a channel for the fast circulation of important and useful research findings in Condensed Matter Physics, Statistical Physics, as well as Atomic, Molecular and Optical Physics. A strong emphasis is placed on topics of current interest, such as cold atoms and molecules, new topological materials and phases, and novel low-dimensional materials. The journal also contains a Brief Reviews section with the purpose of publishing short reports on the latest experimental findings and urgent new theoretical developments.
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