dc.contributor.author Aruchunan, Elayaraja dc.contributor.author Sulaiman, J. dc.date.accessioned 2017-01-30T14:43:28Z dc.date.available 2017-01-30T14:43:28Z dc.date.created 2015-03-03T20:16:16Z dc.date.issued 2012 dc.identifier.citation Aruchunan, E. and Sulaiman, J. 2012. Comparison of Closed Repeated Newton-Cotes Quadrature Schemes with Half-Sweep Iteration Concept in Solving Linear Fredholm Integro-Differential Equations. International Journal of Science and Engineering Investigations. 1 (9): pp. 90-96. dc.identifier.uri http://hdl.handle.net/20.500.11937/40500 dc.description.abstract The purpose of this paper is to apply half-sweep iteration concept with Gauss-Seidel (GS) iterative method namely Half-Sweep Gauss-Seidel (HSGS) method for solving high order closed repeated Newton-Cotes (CRNC) quadrature approximation equations associated with numerical solution of linear Fredholm integro-differential equations. Two different order of CRNC i.e. repeated Simpson's 3 1 and repeated Simpson's 8 3 schemes are considered in this research work. The formulation the implementation the proposed methods are explained. In addition, several numerical simulations and computational complexity analysis were carried out to authenticate the performance of the methods. The findings show that the HSGS iteration method is superior to the standard GS method. As well the high order CRNC quadrature schemes produced more precise approximation solution compared to repeated trapezoidal scheme. dc.publisher IJSEI dc.subject Linear Fredholm integro-differential equations dc.subject central difference dc.subject Half-Sweep Gauss-Seidel dc.subject Newton-Cotes Closed Quadrature dc.title Comparison of Closed Repeated Newton-Cotes Quadrature Schemes with Half-Sweep Iteration Concept in Solving Linear Fredholm Integro-Differential Equations dc.type Journal Article dcterms.source.volume 1 dcterms.source.number 9 dcterms.source.startPage 90 dcterms.source.endPage 96 dcterms.source.issn 2251-8843 dcterms.source.title International Journal of Science and Engineering Investigations curtin.department Curtin Sarawak curtin.accessStatus Fulltext not available
﻿