An efficient computer application of the sinc-Galerkin approximation for nonlinear boundary value problems

Aydin Secer*, Muhammet Kurulay, Mustafa Bayram, Mehmet Ali Akinlar

*Corresponding author for this work

Research output: Contribution to journalArticlepeer-review

7 Citations (Scopus)

Abstract

A powerful technique based on the sinc-Galerkin method is presented for obtaining numerical solutions of second-order nonlinear Dirichlet-type boundary value problems (BVPs). The method is based on approximating functions and their derivatives by using the Whittaker cardinal function. Without any numerical integration, the differential equation is reduced to a system of algebraic equations via new accurate explicit approximations of the inner products; therefore, the evaluation is based on solving a matrix system. The solution is obtained by constructing the nonlinear (or linear) matrix system using Maple and the accuracy is compared with the Newton method. The main aspect of the technique presented here is that the obtained solution is valid for various boundary conditions in both linear and nonlinear equations and it is not affected by any singularities that can occur in variable coefficients or a nonlinear part of the equation. This is a powerful side of the method when being compared to other models.

Original languageEnglish
Article number117
JournalBoundary Value Problems
Volume2012
DOIs
Publication statusPublished - Oct 2012
Externally publishedYes

Keywords

  • Maple
  • Newton method
  • Nonlinear matrix system
  • Sinc basis function
  • Sinc-Galerkin approximation

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