Approxiamtion of Second Order Boundary Value Problems By Galerkin Method with Chebyshev Polynomial Basis

dc.contributor.author	Bello, K.A
dc.contributor.author	Taiwo, O.A
dc.contributor.author	Taiwo, A.I
dc.date.accessioned	2026-04-27T23:34:25Z
dc.date.available	2026-04-27T23:34:25Z
dc.date.issued	2018
dc.description.abstract	In this paper, the technique of Galerkin weighted residual method is used to obtain the numerical solution of second order linear boundary value problems. By the use of Linear transformation, the problem was first converted from its original form and interval to its equivalent form in the interval of the chebyshev polynomial used as basis of the trial solution. Then the converted form of the problem is solved using the Galerkin weighted residual method. Three numerical examples with Neumann boundary conditions were considered. The approximate solutions of the examples compared favourably with the exact solutions on using a very few Chebyshev polynomials.The method is very effective and accurate.
dc.identifier.citation	Neumann Boundary Condition, Galerkin Weighted Residual Method, Chebyshev Polynomials.
dc.identifier.issn	2141-3819
dc.identifier.uri	https://uilspace.unilorin.edu.ng/handle/123456789/17725
dc.language.iso	en
dc.publisher	Faculty of Physical Sciences, University of Ilorin
dc.relation.ispartofseries	Vol. 24, No: 1; 41-60
dc.title	Approxiamtion of Second Order Boundary Value Problems By Galerkin Method with Chebyshev Polynomial Basis
dc.title.alternative	Centrepoint Journal
dc.type	Article

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Name:: 1. Dr. K.A Bello Approximation of second Order boundary value problem by Galerki method with chebyshev polynomial basis.pdf
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