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Boole's strategy in multistep block method for Volterra integro-differential equation

This article presents a numerical approach for solving the second kind of Volterra integro- differential equation (VIDE). The multistep block-Boole's rule method will estimate the solutions for the linear and nonlinear problems of VIDE. The method computes two solutions for VIDE along the inter...

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Main Authors: Baharum, N. A., Majid, Z. A., Senu, N.
Format: Article
Language:English
Published: UPM Press 2022
Online Access:http://psasir.upm.edu.my/id/eprint/100561/1/Boole%27s%20strategy%20in%20multistep%20block%20method.pdf
http://psasir.upm.edu.my/id/eprint/100561/
https://mjms.upm.edu.my/lihatmakalah.php?kod=2022/May/16/2/237-256
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spelling my.upm.eprints.1005612023-10-10T02:07:32Z http://psasir.upm.edu.my/id/eprint/100561/ Boole's strategy in multistep block method for Volterra integro-differential equation Baharum, N. A. Majid, Z. A. Senu, N. This article presents a numerical approach for solving the second kind of Volterra integro- differential equation (VIDE). The multistep block-Boole's rule method will estimate the solutions for the linear and nonlinear problems of VIDE. The method computes two solutions for VIDE along the interval. The proposed method is developed by derivation of the Lagrange interpolating polynomial. The convergence and stability analysis of the derived method are discussed. From the perspective of total function calls and time-saving, the computation results explained that the derived method performs better than other existing methods. UPM Press 2022-04-29 Article PeerReviewed text en http://psasir.upm.edu.my/id/eprint/100561/1/Boole%27s%20strategy%20in%20multistep%20block%20method.pdf Baharum, N. A. and Majid, Z. A. and Senu, N. (2022) Boole's strategy in multistep block method for Volterra integro-differential equation. Malaysian Journal of Mathematical Sciences, 16 (2). 237 - 256. ISSN 1823-8343; ESSN: 2289-750X https://mjms.upm.edu.my/lihatmakalah.php?kod=2022/May/16/2/237-256 10.47836/mjms.16.2.05
institution Universiti Putra Malaysia
building UPM Library
collection Institutional Repository
continent Asia
country Malaysia
content_provider Universiti Putra Malaysia
content_source UPM Institutional Repository
url_provider http://psasir.upm.edu.my/
language English
description This article presents a numerical approach for solving the second kind of Volterra integro- differential equation (VIDE). The multistep block-Boole's rule method will estimate the solutions for the linear and nonlinear problems of VIDE. The method computes two solutions for VIDE along the interval. The proposed method is developed by derivation of the Lagrange interpolating polynomial. The convergence and stability analysis of the derived method are discussed. From the perspective of total function calls and time-saving, the computation results explained that the derived method performs better than other existing methods.
format Article
author Baharum, N. A.
Majid, Z. A.
Senu, N.
spellingShingle Baharum, N. A.
Majid, Z. A.
Senu, N.
Boole's strategy in multistep block method for Volterra integro-differential equation
author_facet Baharum, N. A.
Majid, Z. A.
Senu, N.
author_sort Baharum, N. A.
title Boole's strategy in multistep block method for Volterra integro-differential equation
title_short Boole's strategy in multistep block method for Volterra integro-differential equation
title_full Boole's strategy in multistep block method for Volterra integro-differential equation
title_fullStr Boole's strategy in multistep block method for Volterra integro-differential equation
title_full_unstemmed Boole's strategy in multistep block method for Volterra integro-differential equation
title_sort boole's strategy in multistep block method for volterra integro-differential equation
publisher UPM Press
publishDate 2022
url http://psasir.upm.edu.my/id/eprint/100561/1/Boole%27s%20strategy%20in%20multistep%20block%20method.pdf
http://psasir.upm.edu.my/id/eprint/100561/
https://mjms.upm.edu.my/lihatmakalah.php?kod=2022/May/16/2/237-256
_version_ 1781706660732993536
score 13.211869

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