High-order reliable numerical methods for epidemic models with non-constant recruitment rate

arXiv - CS - Numerical Analysis Pub Date : 2024-02-16 DOI:arxiv-2402.10549
B. M. Takács, G. Svantnerné Sebestyén, I. Faragó
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Abstract

The mathematical modeling of the propagation of illnesses has an important role from both mathematical and biological points of view. In this article, we observe an SEIR-type model with a general incidence rate and a non-constant recruitment rate function. First, we observe the qualitative properties of different methods: first-order and higher-order strong stability preserving Runge-Kutta methods \cite{shu}. We give different conditions under which the numerical schemes behave as expected. Then, the theoretical results are demonstrated by some numerical experiments. \keywords{positivity preservation, general SEIR model, SSP Runge-Kutta methods}
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非恒定招募率流行病模型的高阶可靠数值方法
从数学和生物学的角度来看,疾病传播的数学模型都具有重要作用。在本文中,我们观察了一个具有一般发病率和非恒定招募率函数的 SEIR 型模型。首先,我们观察了不同方法的定性特性:一阶和高阶强稳定性保持 Runge-Kutta 方法(cite{shu})。我们给出了数值方案表现符合预期的不同条件。然后,通过一些数值实验来证明理论结果。\关键词{正性保持、一般 SEIR 模型、SSP Runge-Kutta 方法}
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arXiv - CS - Numerical Analysis
arXiv - CS - Numerical Analysis
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