A Highly Approximate Pseudo-Spectral Method for the Solution of Convection-Diffusion Equations

Magdi El-azab; Rabha El-ashwah; Maha Abbas; Galal El-baghdady

doi:10.33187/jmsm.634089

EN

A Highly Approximate Pseudo-Spectral Method for the Solution of Convection-Diffusion Equations

Abstract

The main purpose of this paper is to compute a highly accurate numerical solution of two dimensional convection--diffusion equations with variable coefficients by using Legendre pseudo-spectral method based on Legendre-Gauss-Lobatto nodes. The Kronecker product is used here to formulate a linear system of differentiation matrices; this system was reduced to be more accurate with less memory usage. Error analysis with test problems are introduced to show that the suggested scheme of the spectral method has high accuracy.

Keywords

Gauss-Legendre polynomials , Legendre differentiation matrices , Legendre pseudo-spectral method , Parabolic advection diffusion equations

References

[1] G.I. El-Baghdady, M.S. El-Azab, Numerical solution of one dimensional advection-diffusion equation with variable coefficients via Legendre-Gauss- Lobatto time-space pseudo spectral method, Electron. J. Math. Anal. Appl., 3(2) (2015), 1-14.
[2] G.I. El-Baghdady, M.S. El-Azab, Chebyshev-Gauss-Lobatto Pseudo-spectral method for one-dimensional advection-diffusion equation with variable coefficients, Sohag J. Math., 3(1) (2016), 1-8.
[3] C. Canuto, A. Quarteroni, Spectral and pseudo-spectral methods for parabolic problems with non periodic boundary conditions , Calcolo, 18(3) (1981), 197-217.
[4] J. Shen, T. Tang, L. Wang, Spectral Methods Algorithms Analysis and Applications, Springer Series in Computational Mathematics, 41, Springer-Verlag Berlin Heidelberg, Germany, 2011.
[5] L. N. Trefethen, Spectral Methods in MATLAB, SIAM, Philadelphia, 2000.
[6] R. Baltensperger, M. R. Trummer, Spectral differencing with a twist, SIAM J. Sci. Comput., 24(5) (2006), 1465-1487.
[7] A. Kufner, O. John, S. Fuˇcik, Function Spaces (Mechanics: Analysis), Noordhoff International Publishing, Netherlands, 1977.
[8] R. A. Horn, Ch. R. Johnson, Matrix Analysis, 2nd ed., Cambridge University Press, UK, 2013.
[9] D. S1. Tracy, R. P. Singh, A new matrix product and its applications in matrix differentiation, Stat. Neerl., 26(4) (1972),143-157.
[10] T. Tang, X. Xu, J. Cheng, On spectral methods for Volterra integral equations and the convergence analysis, J. Comput. Math., 26(6) (2008), 825-837.

Details

Primary Language

English

Subjects

Mathematical Sciences

Journal Section

Research Article

Authors

Magdi El-azab This is me
0000-0003-2885-107X
Egypt

Rabha El-ashwah This is me
0000-0002-5490-3745
Egypt

Maha Abbas ^*
0000-0003-1549-9302
Egypt

Galal El-baghdady This is me
0000-0001-5317-5195
Egypt

Publication Date

August 31, 2020

Submission Date

October 16, 2019

Acceptance Date

July 21, 2020

Published in Issue

Year 2020 Volume: 3 Number: 2

DOI

https://doi.org/10.33187/jmsm.634089

IZ

https://izlik.org/JA69UR67ZY

APA

El-azab, M., El-ashwah, R., Abbas, M., & El-baghdady, G. (2020). A Highly Approximate Pseudo-Spectral Method for the Solution of Convection-Diffusion Equations. Journal of Mathematical Sciences and Modelling, 3(2), 86-94. https://doi.org/10.33187/jmsm.634089

AMA

1.El-azab M, El-ashwah R, Abbas M, El-baghdady G. A Highly Approximate Pseudo-Spectral Method for the Solution of Convection-Diffusion Equations. Journal of Mathematical Sciences and Modelling. 2020;3(2):86-94. doi:10.33187/jmsm.634089

Chicago

El-azab, Magdi, Rabha El-ashwah, Maha Abbas, and Galal El-baghdady. 2020. “A Highly Approximate Pseudo-Spectral Method for the Solution of Convection-Diffusion Equations”. Journal of Mathematical Sciences and Modelling 3 (2): 86-94. https://doi.org/10.33187/jmsm.634089.

EndNote

El-azab M, El-ashwah R, Abbas M, El-baghdady G (August 1, 2020) A Highly Approximate Pseudo-Spectral Method for the Solution of Convection-Diffusion Equations. Journal of Mathematical Sciences and Modelling 3 2 86–94.

IEEE

[1]M. El-azab, R. El-ashwah, M. Abbas, and G. El-baghdady, “A Highly Approximate Pseudo-Spectral Method for the Solution of Convection-Diffusion Equations”, Journal of Mathematical Sciences and Modelling, vol. 3, no. 2, pp. 86–94, Aug. 2020, doi: 10.33187/jmsm.634089.

ISNAD

El-azab, Magdi - El-ashwah, Rabha - Abbas, Maha - El-baghdady, Galal. “A Highly Approximate Pseudo-Spectral Method for the Solution of Convection-Diffusion Equations”. Journal of Mathematical Sciences and Modelling 3/2 (August 1, 2020): 86-94. https://doi.org/10.33187/jmsm.634089.

JAMA

1.El-azab M, El-ashwah R, Abbas M, El-baghdady G. A Highly Approximate Pseudo-Spectral Method for the Solution of Convection-Diffusion Equations. Journal of Mathematical Sciences and Modelling. 2020;3:86–94.

MLA

El-azab, Magdi, et al. “A Highly Approximate Pseudo-Spectral Method for the Solution of Convection-Diffusion Equations”. Journal of Mathematical Sciences and Modelling, vol. 3, no. 2, Aug. 2020, pp. 86-94, doi:10.33187/jmsm.634089.

Vancouver

1.Magdi El-azab, Rabha El-ashwah, Maha Abbas, Galal El-baghdady. A Highly Approximate Pseudo-Spectral Method for the Solution of Convection-Diffusion Equations. Journal of Mathematical Sciences and Modelling. 2020 Aug. 1;3(2):86-94. doi:10.33187/jmsm.634089