Analytical Treatment for Solving a Class of Non Linear Fractional Differential Equations

Deepanjan Das

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Analytical Treatment for Solving a Class of Non Linear Fractional Differential Equations

Deepanjan Das¹

Section:Research Paper, Product Type: Journal Paper
Volume-7 , Issue-6 , Page no. 249-254, Jun-2019

CrossRef-DOI: https://doi.org/10.26438/ijcse/v7i6.249254

Online published on Jun 30, 2019

Copyright © Deepanjan Das . This is an open access article distributed under the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.

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IEEE Style Citation: Deepanjan Das, “Analytical Treatment for Solving a Class of Non Linear Fractional Differential Equations,” International Journal of Computer Sciences and Engineering, Vol.7, Issue.6, pp.249-254, 2019.

MLA Style Citation: Deepanjan Das "Analytical Treatment for Solving a Class of Non Linear Fractional Differential Equations." International Journal of Computer Sciences and Engineering 7.6 (2019): 249-254.

APA Style Citation: Deepanjan Das, (2019). Analytical Treatment for Solving a Class of Non Linear Fractional Differential Equations. International Journal of Computer Sciences and Engineering, 7(6), 249-254.

BibTex Style Citation:
@article{Das_2019,
author = {Deepanjan Das},
title = {Analytical Treatment for Solving a Class of Non Linear Fractional Differential Equations},
journal = {International Journal of Computer Sciences and Engineering},
issue_date = {6 2019},
volume = {7},
Issue = {6},
month = {6},
year = {2019},
issn = {2347-2693},
pages = {249-254},
url = {https://www.ijcseonline.org/full_paper_view.php?paper_id=4538},
doi = {https://doi.org/10.26438/ijcse/v7i6.249254}
publisher = {IJCSE, Indore, INDIA},
}

RIS Style Citation:
TY - JOUR
DO = {https://doi.org/10.26438/ijcse/v7i6.249254}
UR - https://www.ijcseonline.org/full_paper_view.php?paper_id=4538
TI - Analytical Treatment for Solving a Class of Non Linear Fractional Differential Equations
T2 - International Journal of Computer Sciences and Engineering
AU - Deepanjan Das
PY - 2019
DA - 2019/06/30
PB - IJCSE, Indore, INDIA
SP - 249-254
IS - 6
VL - 7
SN - 2347-2693
ER -

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Abstract

In the present paper, generalized differential transform method is used for obtaining the approximate analytic solutions of non-linear partial differential equations of fractional order. The fractional derivatives are described in the Caputo sense.

Key-Words / Index Term

Fractional differential equations; Caputo fractional derivative; Generalized Differential transform method; Analytic solution

References

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[3] Z.Odibat,S.Momani,”A generalized differential transform method for linear partial Differential equations of fractional order”, Applied Mathematics Letters, Vol.21,Issue.2,pp.194–199,2008.
[4] Z.Odibat,S.Momani,V.S.Erturk,”Generalized differential Transform method: application to differentia equations of fractionalorder”,Applied Mathematics and Computation, Vol.197,Issue.2,pp.467–477,2008.
[5] S.Das,”Functional Fractional Calculus”, Springer,2008.
[6] K.S.Miller,B.Ross,”An Introduction to the Fractional Calculus and Fractional Diff. Equations”, John Wiley and Son,1993.
[7] M.Caputo,”Linear models of dissipation whose q is almost frequency independent-ii”, Geophys J. R. Astron. Soc,Vol.13,pp.529-539,1967.
[8] I,Podlubny,”Fractional differential equations: An introduction to fractional derivatives, fractional differential equations, to methods of their solution and some of their applications”,Academic Press,1999.
[9] R.Almeida,D.F.Torres,”Necessary and sufficient conditions for the fractional calculus of variations with caputo derivatives”, Communications in Nonlinear Science and Numerical Simulation,Vol.16,pp.1490-1500,2011.
[10] A.M.WazWaz,”Partial differential equations methods and applications”,Saint Xavier University,Chicago, Illinois, USA,2002.

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