Solution of System of Generalized Abel’s Integral Equation using Gegenbauer Wavelets

Ashish Pathak; Rajeev K Singh

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Reseach Article

Solution of System of Generalized Abel’s Integral Equation using Gegenbauer Wavelets

by Ashish Pathak, Rajeev K Singh

International Journal of Computer Applications

Foundation of Computer Science (FCS), NY, USA

Volume 95 - Number 1

Year of Publication: 2014

Authors: Ashish Pathak, Rajeev K Singh

10.5120/16555-6224

Ashish Pathak, Rajeev K Singh . Solution of System of Generalized Abel’s Integral Equation using Gegenbauer Wavelets. International Journal of Computer Applications. 95, 1 ( June 2014), 1-4. DOI=10.5120/16555-6224

@article{ 10.5120/16555-6224,

author = { Ashish Pathak, Rajeev K Singh },

title = { Solution of System of Generalized Abel’s Integral Equation using Gegenbauer Wavelets },

journal = { International Journal of Computer Applications },

issue_date = { June 2014 },

volume = { 95 },

number = { 1 },

month = { June },

year = { 2014 },

issn = { 0975-8887 },

pages = { 1-4 },

numpages = {9},

url = { https://ijcaonline.org/archives/volume95/number1/16555-6224/ },

doi = { 10.5120/16555-6224 },

publisher = {Foundation of Computer Science (FCS), NY, USA},

address = {New York, USA}

}

%0 Journal Article

%1 2024-02-06T22:20:33.024042+05:30

%A Ashish Pathak

%A Rajeev K Singh

%T Solution of System of Generalized Abel’s Integral Equation using Gegenbauer Wavelets

%J International Journal of Computer Applications

%@ 0975-8887

%V 95

%N 1

%P 1-4

%D 2014

%I Foundation of Computer Science (FCS), NY, USA

Abstract

This has been seen that in some application for finding the analytical solution of mathematical problem is too complicated , so in recent years researcher has devoted lots of afforts to find the numerical solution of the equation. In this paper an application of the Gegenbauer wavelet method is applied to solve system of generalized Abel's integral equation. This wavelet reduces the system of generalized Abel's integral equation to a system of linear equation in generalized case such that the solution of the resulting system gives the unknown Gegenbauer wavelet coefficient of the solutions. Illustrative examples have been provided to demonstrate the validity and applicability of the proposed method and result has been compaired with the exact solution. Lastly we have shown the error analysis to the proposed method and found that it is an quite efficient and has high accuracy.

References

M. Lowengrub , J. Waltson. System of generalizd Abel's integral equation. SIAM J. Math. Anal. , 1979,10(4) : 794-807.
J. Waltson. System of generalizd Abel's integral equation. SIAM J. Math. Anal. , 1979,10(4) : 794-807.
B. N. Mandal, A. Chakrabarti . Applied singular integral equations CRC Press, 2011.
N. Mandal,A. Chakrabarti,B. N. Mandal Numerical solution of a system of generalized Abel's integral equation using fractional calculus. Appl. Math. Lett. ,1996,9(5):1-4.
Ashish Pathak , M. M. Dixit , P. S. Upreti ,Numerical solution of system of generalized Abel's integral equation using Legendre multiwavelet,J. Adv. Res. Rese. in Sci. comp. ,2013, 5(1):28-36.
Ashish Pathak , Rajeev Kr. Singh , B. N. Mandal, Solution of Abel's integral equation by using Gegenbauer wavelets, Investigation in mathematical sciences, 2014,4(1), 43-52.
I. Daubechies. Ten lectures on Wavelet . SIAM, Philadelphia, 1992.
T. Fang, Li JQ, MN Sun. A universal solution for evolutionary random response problem. Journal of Sound Vibration 253(2002) 909-916.

Index Terms

Computer Science

Information Sciences

Keywords

Generalized Abel's integral equation Gegenbauer polynomial Gegenbauer wavelets.