A numerical approach for solving Volterra type functional integral equations with variable bounds and mixed delays

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dc.contributor.authorGokmen E.
dc.contributor.authorYuksel G.
dc.contributor.authorSezer M.
dc.date.accessioned2024-07-22T08:10:51Z
dc.date.available2024-07-22T08:10:51Z
dc.date.issued2017
dc.description.abstractIn this paper, the Taylor collocation method has been used the integro functional equation with variable bounds. This method is essentially based on the truncated Taylor series and its matrix representations with collocation points. We have introduced the method to solve the functional integral equations with variable bounds. We have also improved error analysis for this method by using the residual function to estimate the absolute errors. To illustrate the pertinent features of the method numeric examples are presented and results are compared with the other methods. All numerical computations have been performed on the computer algebraic system Maple 15. © 2016 Elsevier B.V.
dc.identifier.DOI-ID10.1016/j.cam.2016.08.004
dc.identifier.issn03770427
dc.identifier.urihttp://akademikarsiv.cbu.edu.tr:4000/handle/123456789/15405
dc.language.isoEnglish
dc.publisherElsevier B.V.
dc.rightsAll Open Access; Bronze Open Access
dc.subjectAlgebra
dc.subjectError analysis
dc.subjectFunctional analysis
dc.subjectPolynomials
dc.subjectTaylor series
dc.subjectApproximate solution
dc.subjectCollocation method
dc.subjectFunctional equation
dc.subjectFunctional integral equation
dc.subjectMatrix representation
dc.subjectNumerical approaches
dc.subjectNumerical computations
dc.subjectTaylor polynomials
dc.subjectIntegral equations
dc.titleA numerical approach for solving Volterra type functional integral equations with variable bounds and mixed delays
dc.typeArticle

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