Analisis Model Stokastik Penularan Virus Hepatitis B

Jurnal Riset Mahasiswa Matematika Pub Date : 2022-11-01 DOI:10.18860/jrmm.v2i1.14467

A. Laila, Usman Pagalay, Heni Widayani

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Abstract

The spread of hepatitis B virus (HBV) infection has been widely studied using the deterministic SIR model, in which individuals who recover from acute infection have temporary immunity to the virus. However, this deterministic model uses a constant rate of viral infection over time. This is not in accordance with the fact that the infection rate is a random parameter that depends on time. This study discusses the analysis of the stochastic model of hepatitis B virus transmission. The purpose of this study is to construct the SIR stochastic model by dividing the infection rate into two, namely the rate of acute and chronic infection following the Wiener process. The model is then searched for an analytical solution referring to the Ito formula. The analytical solution and the Wiener process are described by substituting parameter values in the form of acute and chronic infection rates (β+α), cure rate (γ), and initial values (S(0) and I(0)) to obtain the mean value (μ). and the standard deviation (σ) of dS(t) and dI(t). The results of the simulation show that the number of infected individuals (I(t)) will decrease rapidly if (γ) is greater but will increase rapidly if (β+α) and (I(0)) are greater.

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Stokastik Penularan病毒乙型肝炎模型分析

乙型肝炎病毒(HBV)感染的传播已经使用确定性SIR模型进行了广泛的研究，其中从急性感染中恢复的个体对该病毒具有暂时的免疫力。然而，这种确定性模型使用了一个恒定的病毒感染率。这与感染率是一个随时间变化的随机参数这一事实不符。本研究讨论了乙型肝炎病毒传播的随机模型分析。本研究的目的是按照Wiener过程将感染率分为急性感染率和慢性感染率两部分，构建SIR随机模型。然后根据伊藤公式搜索模型的解析解。解析解和Wiener过程用急慢性感染率(β+α)、治愈率(γ)和初始值(S(0)和I(0))的形式来表示，得到平均值(μ)。dS(t)和dI(t)的标准差(σ)。模拟结果表明，当(γ)较大时，感染个体数(I(t))将迅速减少，而当(β+α)和(I(0))较大时，感染个体数(I(t))将迅速增加。

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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Jurnal Riset Mahasiswa Matematika

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