A modern analytic method to solve singular and non-singular linear and non-linear differential equations

El-Ajou, Ahmad; Al-ghananeem, Haneen; Saadeh, Rania; Qazza, Ahmad; Oqielat, Moa’ath N.

doi:10.3389/fphy.2023.1167797

Front. Phys.

2023

DOI: 10.3389/fphy.2023.1167797

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A modern analytic method to solve singular and non-singular linear and non-linear differential equations

Ahmad El-Ajou,

Haneen Al-ghananeem,

Rania Saadeh

et al.

Abstract: This article circumvents the Laplace transform to provide an analytical solution in a power series form for singular, non-singular, linear, and non-linear ordinary differential equations. It introduces a new analytical approach, the Laplace residual power series, which provides a powerful tool for obtaining accurate analytical and numerical solutions to these equations. It demonstrates the new approach’s effectiveness, accuracy, and applicability in several ordinary differential equations problem. The proposed… Show more

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Cited by 3 publications

References 44 publications

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A professional semi-analytical method to construct series solution to singular and nonsingular differential equations

Burqan,

El-Ajou

2025

Alexandria Engineering Journal

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A professional semi-analytical method to construct series solution to singular and nonsingular differential equations

Burqan,

El-Ajou

2025

Alexandria Engineering Journal

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A new approach in handling one-dimensional time-fractional Schrödinger equations

El-Ajou,

Saadeh,

Dunia

et al. 2024

MATH

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<abstract> <p>Our aim of this paper was to present the accurate analytical approximate series solutions to the time-fractional Schrödinger equations via the Caputo fractional operator using the Laplace residual power series technique. Furthermore, three important and interesting applications were given, tested, and compared with four well-known methods (Adomian decomposition, homotopy perturbation, homotopy analysis, and variational iteration methods) to show that the proposed technique was simple, accurate, efficient, and applicable. When there was a pattern between the terms of the series, we could obtain the exact solutions; otherwise, we provided the approximate series solutions. Finally, graphical results were presented and analyzed. Mathematica software was used to calculate numerical and symbolic quantities.</p> </abstract>

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About Solution of Singular Bilinear Stochastic Systems on the Base Smagulov`s Condition

Zhadraeva,

Shuakayev,

Yessenova

2024

BULLETIN Series of Physics &Amp; Mathematical Sciences

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This work considered class singular bilinear stochastic systems in Langevin's form. The authors presented the definition and application of apparatus, a class of pseudo-semi-inverse matrices, and, for the first time, includedSh.S.Smagulov's initial condition for the class of singular nonlinear stochastic systems in bilinear case. The article considers a system in the form Map «Input –Output» for a class with several inputs in the Langevin's form.On the base of connection between Langevin's form and Volterra's form are proved the theorem about the construction of Volterra`s model for a class of singular nonlinear stochastic systems in bilinear case. Also, authors proved theorems about uniqueness, convergence and finitely (on the base class of nilpotent matrices of S. Li) for this Volterra's model in Ito`s form in conception of describing the system in form Map «Input –Output» for the above class of systems, but with several inputs.As well known in the problem statement for solving the singular system, in other investigations, initial condition stated, in our view, is incorrect, or this condition is absent. Therefor due to Sh.S. Smagulov's initial condition and on the base apparatus R.S. Sudakov's class of pseudo-semi-inverse matrices and using Sh.L.Sobolev'sannulator can build solutions above named of a class of singular nonlinear stochastic systems in bilinear case.

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A modern analytic method to solve singular and non-singular linear and non-linear differential equations

Cited by 3 publications

References 44 publications

A professional semi-analytical method to construct series solution to singular and nonsingular differential equations

A professional semi-analytical method to construct series solution to singular and nonsingular differential equations

A new approach in handling one-dimensional time-fractional Schrödinger equations

About Solution of Singular Bilinear Stochastic Systems on the Base Smagulov`s Condition

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