Numerical modelling of advection diffusion equation using Chebyshev spectral collocation method and Laplace transform

IF 1.4 Q2 MATHEMATICS, APPLIED Results in Applied Mathematics Pub Date : 2023-12-08 DOI:10.1016/j.rinam.2023.100420
Farman Ali Shah , Kamran , Kamal Shah , Thabet Abdeljawad
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Abstract

In this article a numerical method for numerical modelling of advection diffusion equation is developed. The proposed method is based on Laplace transform (LT) and Chebyshev spectral collocation method (CSCM). The LT is used for time-discretization and the CSCM is used for discretization of spatial derivatives. The LT is used to transform the time variable and avoid the finite difference time stepping method. In time stepping technique the accuracy is achieved for very small time step which results in a very high computational time. The spatial operators are discretized using CSCM to achieve high accuracy as compared to other methods. The method is composed of three primary stages: firstly the given problem is transformed into a corresponding inhomogeneous elliptic problem by using the LT; secondly the CSCM used to solve the transformed problem in LT domain; finally the solution obtained in LT domain is converted to time domain via numerical inverse LT. The inversion of LT is generally an ill-posed problem and due to this reason various numerical inversion methods have been developed. In this article we have utilized the contour integration method which is one of the most efficient methods. The most important feature of this approach is that it handles the time derivative with the Laplace transform rather than the finite difference time stepping approach, avoiding the untoward impact of time steps on stability and accuracy of the method. Five test problems are used to validate the efficiency and accuracy of the proposed numerical scheme.

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利用切比雪夫谱配位法和拉普拉斯变换建立平流扩散方程的数值模型
本文开发了一种用于平流扩散方程数值建模的数值方法。所提出的方法基于拉普拉斯变换(LT)和切比雪夫频谱配位法(CSCM)。LT 用于时间离散化,CSCM 用于空间导数的离散化。LT 用于转换时间变量,避免使用有限差分时间步进法。在时间步进技术中,只需很小的时间步长就能达到很高的精度,这就导致了很高的计算时间。与其他方法相比,使用 CSCM 对空间算子进行离散化,以实现高精度。该方法由三个主要阶段组成:首先,使用 LT 将给定问题转换为相应的非均质椭圆问题;其次,使用 CSCM 在 LT 域中求解转换后的问题;最后,通过数值反 LT 将 LT 域中获得的解转换为时域。LT 反演通常是一个难以解决的问题,因此人们开发了各种数值反演方法。在本文中,我们采用了等值线积分法,这是最有效的方法之一。这种方法的最大特点是用拉普拉斯变换而不是有限差分时间步进方法处理时间导数,避免了时间步进对方法稳定性和准确性的不利影响。五个测试问题用于验证所提出的数值方案的效率和准确性。
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来源期刊
Results in Applied Mathematics
Results in Applied Mathematics Mathematics-Applied Mathematics
CiteScore
3.20
自引率
10.00%
发文量
50
审稿时长
23 days
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