求解空间分数阶fitzhuh - nagumo模型的降阶Jacobi谱配置方法及其在心肌中的应用

IF 1.5 4区 工程技术 Q3 COMPUTER SCIENCE, INTERDISCIPLINARY APPLICATIONS Engineering Computations Pub Date : 2023-11-14 DOI:10.1108/ec-06-2023-0254
Mostafa Abbaszadeh, AliReza Bagheri Salec, Shurooq Kamel Abd Al-Khafaji
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引用次数: 0

摘要

目的空间分数阶偏微分方程(SFPDEs)在分数阶微积分领域中占有重要地位。提出一种高阶、稳定和灵活的求解SFPDEs的数值方法是大多数研究者的主要目标。本文研究了一种新的求解空间分数阶导数FitzHugh-Nagumo模型的谱算法。分数阶导数是基于Riesz导数定义的。首先,使用二阶有限差分公式来近似时间导数。然后,采用雅可比谱配置法对空间变量进行离散。另一方面,假定近似解是由Jacobi多项式得到的特殊多项式的线性组合,并且存在基于Jacobi多项式的Riesz分数阶导数。此外,还采用了适当正交分解(POD)法等降阶方案。结果建立了求解空间分数阶偏微分方程系统的快速高阶数值方法,减少了CPU时间消耗。将谱配点法与POD思想相结合,求解空间分数阶偏微分方程系统。对于主要的数学模型,数值结果是可以接受的和有效的。
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A reduced-order Jacobi spectral collocation method for solving the space-fractional FitzHugh–Nagumo models with application in myocardium
Purpose The space fractional PDEs (SFPDEs) play an important role in the fractional calculus field. Proposing a high-order, stable and flexible numerical procedure for solving SFPDEs is the main aim of most researchers. This paper devotes to developing a novel spectral algorithm to solve the FitzHugh–Nagumo models with space fractional derivatives. Design/methodology/approach The fractional derivative is defined based upon the Riesz derivative. First, a second-order finite difference formulation is used to approximate the time derivative. Then, the Jacobi spectral collocation method is employed to discrete the spatial variables. On the other hand, authors assume that the approximate solution is a linear combination of special polynomials which are obtained from the Jacobi polynomials, and also there exists Riesz fractional derivative based on the Jacobi polynomials. Also, a reduced order plan, such as proper orthogonal decomposition (POD) method, has been utilized. Findings A fast high-order numerical method to decrease the elapsed CPU time has been constructed for solving systems of space fractional PDEs. Originality/value The spectral collocation method is combined with the POD idea to solve the system of space-fractional PDEs. The numerical results are acceptable and efficient for the main mathematical model.
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来源期刊
Engineering Computations
Engineering Computations 工程技术-工程:综合
CiteScore
3.40
自引率
6.20%
发文量
61
审稿时长
5 months
期刊介绍: The journal presents its readers with broad coverage across all branches of engineering and science of the latest development and application of new solution algorithms, innovative numerical methods and/or solution techniques directed at the utilization of computational methods in engineering analysis, engineering design and practice. For more information visit: http://www.emeraldgrouppublishing.com/ec.htm
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