Numerical solution of singular integral equations using Haar wavelet

M. Ghanbari, M. Askaripour, Dariush Khezrimotlagh

Research output: Contribution to journalArticle

Abstract

A new computational method for solving Abel's integral equation as a singular Volterra integral equation is presented. The method is based on Haar wavelets approximation. Numerical examples show the validity and applicability of the method.

Original languageEnglish (US)
Pages (from-to)5852-5855
Number of pages4
JournalJournal of Applied Sciences Research
Volume6
Issue number12
StatePublished - Dec 1 2010

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Haar Wavelet
Singular Integral Equation
Abel Integral Equation
Numerical Solution
Volterra Integral Equations
Computational Methods
Numerical Examples
Approximation

All Science Journal Classification (ASJC) codes

  • General

Cite this

Ghanbari, M. ; Askaripour, M. ; Khezrimotlagh, Dariush. / Numerical solution of singular integral equations using Haar wavelet. In: Journal of Applied Sciences Research. 2010 ; Vol. 6, No. 12. pp. 5852-5855.
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Ghanbari, M, Askaripour, M & Khezrimotlagh, D 2010, 'Numerical solution of singular integral equations using Haar wavelet', Journal of Applied Sciences Research, vol. 6, no. 12, pp. 5852-5855.

Numerical solution of singular integral equations using Haar wavelet. / Ghanbari, M.; Askaripour, M.; Khezrimotlagh, Dariush.

In: Journal of Applied Sciences Research, Vol. 6, No. 12, 01.12.2010, p. 5852-5855.

Research output: Contribution to journalArticle

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AU - Askaripour, M.

AU - Khezrimotlagh, Dariush

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N2 - A new computational method for solving Abel's integral equation as a singular Volterra integral equation is presented. The method is based on Haar wavelets approximation. Numerical examples show the validity and applicability of the method.

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Ghanbari M, Askaripour M, Khezrimotlagh D. Numerical solution of singular integral equations using Haar wavelet. Journal of Applied Sciences Research. 2010 Dec 1;6(12):5852-5855.

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