A Numerical algorithm with residual error estimation for solution of high-order Pantograph-type functional differential equations using Fibonacci polynomials

A Numerical algorithm with residual error estimation for solution of high-order Pantograph-type functional differential equations using Fibonacci polynomials

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In this article a functional differential equation known as the high-order delay pantograph-type equation, which contains a linear functional argument, is considered and a new matrix method based on the Fibonacci polynomials and collocation points is presented to find the approximate solution of the...

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Bibliographic Details
Main Authors: Ayşe KURT BAHŞI, Niyazi ŞAHİN, Mehmet SEZER
Format: Article
Language:English
Published: BİSKA Bilisim Company 2015-06-01
Series:New Trends in Mathematical Sciences
Subjects:
Fibonacci polynomials
pantograph equations
matrix method
collocation method
residual error analysis.
Online Access:http://www.ntmsci.com/ajaxtool/GetArticleByPublishedArticleId?PublishedArticleId=85
Description
Summary:In this article a functional differential equation known as the high-order delay pantograph-type equation, which contains a linear functional argument, is considered and a new matrix method based on the Fibonacci polynomials and collocation points is presented to find the approximate solution of the pantograph equations under the initial conditions. Also, the numerical examples are given demonstrate the applicability of the technique. In addition, an error analysis technique based on residual function is developed and applied to some problems to demonstrate the validity of the method.
ISSN:2147-5520
2147-5520

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