On exact solutions of fractional differential-difference equations with ψ-Riemann-Liouville derivative

Rajagopalan Ramaswamy; Mohamed S.Abdel Latif; Amr Elsonbaty; Abas H.Abdel Kader

doi:10.1515/ijnsns-2021-0166

On exact solutions of fractional differential-difference equations with ψ-Riemann-Liouville derivative

Rajagopalan Ramaswamy, Mohamed S.Abdel Latif, Amr Elsonbaty, Abas H.Abdel Kader

Mathematics

Research output: Contribution to journal › Article › peer-review

Abstract

The aim of this work is to modify the invariant subspace method (ISM) in order to obtain closed form solutions of fractional differential-difference equations with ψ-Riemann-Liouville (ψ-RL) fractional derivative for first time. We have investigated the cases of two-dimensional and the three-dimensional invariant subspaces (ISs) in the suggested scheme. Using the modified ISM, new exact generalized solutions for the general fractional mKdV Lattice equation and the fractional Volterra lattice system are obtained. Compared with similar solution techniques in literature, the presented solution scheme is highly efficient and is capable to find new general exact solutions which cannot be attained by other methods.

Original language	English
Pages (from-to)	2749-2761
Number of pages	13
Journal	International Journal of Nonlinear Sciences and Numerical Simulation
Volume	24
Issue number	7
DOIs	https://doi.org/10.1515/ijnsns-2021-0166
State	Published - 1 Nov 2023

Keywords

differential difference equations
invariant subspace method
ψ-Riemann-Liouville fractional derivative

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10.1515/ijnsns-2021-0166

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title = "On exact solutions of fractional differential-difference equations with ψ-Riemann-Liouville derivative",

abstract = "The aim of this work is to modify the invariant subspace method (ISM) in order to obtain closed form solutions of fractional differential-difference equations with ψ-Riemann-Liouville (ψ-RL) fractional derivative for first time. We have investigated the cases of two-dimensional and the three-dimensional invariant subspaces (ISs) in the suggested scheme. Using the modified ISM, new exact generalized solutions for the general fractional mKdV Lattice equation and the fractional Volterra lattice system are obtained. Compared with similar solution techniques in literature, the presented solution scheme is highly efficient and is capable to find new general exact solutions which cannot be attained by other methods.",

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T1 - On exact solutions of fractional differential-difference equations with ψ-Riemann-Liouville derivative

AU - Ramaswamy, Rajagopalan

AU - Latif, Mohamed S.Abdel

AU - Elsonbaty, Amr

AU - Kader, Abas H.Abdel

PY - 2023/11/1

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N2 - The aim of this work is to modify the invariant subspace method (ISM) in order to obtain closed form solutions of fractional differential-difference equations with ψ-Riemann-Liouville (ψ-RL) fractional derivative for first time. We have investigated the cases of two-dimensional and the three-dimensional invariant subspaces (ISs) in the suggested scheme. Using the modified ISM, new exact generalized solutions for the general fractional mKdV Lattice equation and the fractional Volterra lattice system are obtained. Compared with similar solution techniques in literature, the presented solution scheme is highly efficient and is capable to find new general exact solutions which cannot be attained by other methods.

AB - The aim of this work is to modify the invariant subspace method (ISM) in order to obtain closed form solutions of fractional differential-difference equations with ψ-Riemann-Liouville (ψ-RL) fractional derivative for first time. We have investigated the cases of two-dimensional and the three-dimensional invariant subspaces (ISs) in the suggested scheme. Using the modified ISM, new exact generalized solutions for the general fractional mKdV Lattice equation and the fractional Volterra lattice system are obtained. Compared with similar solution techniques in literature, the presented solution scheme is highly efficient and is capable to find new general exact solutions which cannot be attained by other methods.

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KW - invariant subspace method

KW - ψ-Riemann-Liouville fractional derivative

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On exact solutions of fractional differential-difference equations with ψ-Riemann-Liouville derivative

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