Numerical Solution and Stability Analysis of Huxley Equation

Numerical Solution and Stability Analysis of Huxley Equation

The numerical solution of Huxley equation by the use of two finite difference methods is done. The first one is the explicit scheme and the second one is the Crank-Nicholson scheme. The comparison between the two methods showed that the explicit scheme is easier and has faster convergence while the...

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Bibliographic Details
Main Authors: Saad Manaa, Mohammad Sabawi
Format: Article
Language:Arabic
Published: Mosul University 2005-06-01
Series:Al-Rafidain Journal of Computer Sciences and Mathematics
Subjects:
finite difference methods
explicit scheme
crank-nicholson
huxley equation
stability analysis
Online Access:https://csmj.mosuljournals.com/article_164070_d97edc769a0b078def8b940e4083e899.pdf
Description
Summary:The numerical solution of Huxley equation by the use of two finite difference methods is done. The first one is the explicit scheme and the second one is the Crank-Nicholson scheme. The comparison between the two methods showed that the explicit scheme is easier and has faster convergence while the Crank-Nicholson scheme is more accurate. In addition, the stability analysis using Fourier (von Neumann) method of two schemes is investigated. The resulting analysis showed that the first scheme is conditionally stable if  and the second scheme is unconditionally stable.
ISSN:1815-4816
2311-7990

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