Analytical approximation of solitary waves with compact support for fractional nonlinear dispersive k(m,n) equations

Che Haziqah Che Hussin and Arif Mandangan and Mohammed Said Souid Analytical approximation of solitary waves with compact support for fractional nonlinear dispersive k(m,n) equations. CDF Letters, 18. pp. 98-108. ISSN 2180-1363

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Abstract

The study of solitons and compactions plays a crucial role in nonlinear physics. In this paper, we introduce the Multistep Modified Reduced Differential Transform Method (MMRDTM), which integrates Adomian polynomials with a multistep approach. This novel technique efficiently generates analytical approximations in a rapidly converging sequence while requiring fewer computed terms. By modifying the Reduced Differential Transformation Method (RDTM) and incorporating Adomian polynomials to handle nonlinear terms, the MMRDTM simplifies the solution process for nonlinear initial value problems with reduced computational effort. Furthermore, the multistep approach extends the solution’s convergence over a wider time domain. To validate the effectiveness of MMRDTM, we apply the method in two examples of fractional nonlinear Kortewegde Vries equations (fNKdVEs) with compaction solutions. Graphical representations illustrate the precision and reliability of the technique. The results confirm that the MMRDTM can achieve better approximations to exact solutions efficiently.

Item Type:	Article
Keyword:	Adomian polynomials compaction, fractional KdV equations, liquid drop, multistep approach
Subjects:	Q Science > QA Mathematics > QA1-939 Mathematics > QA273-280 Probabilities. Mathematical statistics T Technology > TP Chemical technology > TP1-1185 Chemical technology > TP155-156 Chemical engineering
Department:	CENTRE > Preparation Centre for Science and Technology
Depositing User:	JUNAINE JASNI -
Date Deposited:	31 Oct 2025 16:33
Last Modified:	31 Oct 2025 16:33
URI:	https://eprints.ums.edu.my/id/eprint/45555

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