Second Kind Chebyshev Wavelet Analysis of Abel’s  Integral Equations

Harish Chandra Yadav; Abhilasha Yadav; Susheel Kumar

doi:10.23755/rm.v51i0.1044

Ratio Mathematica (Apr 2024)

Second Kind Chebyshev Wavelet Analysis of Abel’s Integral Equations

Harish Chandra Yadav,
Abhilasha Yadav,
Susheel Kumar

Affiliations

Harish Chandra Yadav: School of Basic Sciences, Galgotias University, Greater Noida
Abhilasha Yadav: Institute of Integrated and Honors Studies, Kurukshetra University, Kurukshetra
Susheel Kumar: Department of Mathematics TDPG College Jaunpur

DOI: https://doi.org/10.23755/rm.v51i0.1044
Journal volume & issue: Vol. 51, no. 0

Abstract

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This paper presents two approximations of the solution functions of Abel’s integral equations belong ing to classes Hα[0,1), Hϕ[0,1) by (λk+1 −1,M)th partial sums of their second kind Chebyshev wavelet expansion in the interval [0,1), for λ > 1. These approximations are E(1) λk+1−1,M (f), E(2) λk+1−1,M (f). Chebyshev wavelets of the second kind were used to solve Abel’s integral equations. The Chebyshev wavelet of the second kind leads to a solution that is almost identical to their exact solution. This research paper’s accomplishment in wavelet analysis is noteworthy.

hα[0, 1),hϕ [0, 1) class, chebyshev wavelet of the second kind, abel's integral equations

Published in Ratio Mathematica

ISSN: 1592-7415 (Print); 2282-8214 (Online)
Publisher: Accademia Piceno Aprutina dei Velati
Country of publisher: Italy
LCC subjects: Science: Mathematics: Probabilities. Mathematical statistics
Website: http://eiris.it/ojs/index.php/ratiomathematica/index

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