Approximate Analytic Solution of Newell-Whitehead-Segel Equation using Ara Transform Decomposition Method
Abstract
This study applied the newly developed integral transform known as the ARA transform of order $n$ coupled with the Adomian Decomposition Method (AADM) employing Adomian polynomials to decompose the nonlinear component easily to obtain an approximation of the solution to Newell-Whitehead-Segel equation (NWSE). \begin{equation*} \frac{\partial \varphi(\mu,t)}{\partial t}=\ell^2\frac{\partial^2\varphi(\mu,t)}{\partial \mu^2}+\lambda_1\varphi(\mu,t)-\lambda_2\varphi^w(\mu,t)\label{e1} \end{equation*} A recurrence relation was obtained after combining this powerful method and was used to get each successive term which led to the formation of a series solution. About solving nonlinear differential equations, AADM is a potent technique as seen by the approximate and exact solution attained. The effectiveness of the suggested approach is demonstrated by solving three instances. The worthwhile conclusion reveals that the suggested approach is quite practical, uncomplicated, and applicable to linear and nonlinear real-world issues.
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References
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Details
Primary Language
English
Subjects
Applied Mathematics (Other)
Journal Section
Research Article
Publication Date
April 28, 2026
Submission Date
January 10, 2024
Acceptance Date
July 2, 2025
Published in Issue
Year 2026 Volume: 8 Number: 1
