Applied Mathematics

Volume 4, Issue 4 (April 2013)

ISSN Print: 2152-7385   ISSN Online: 2152-7393

Google-based Impact Factor: 0.96  Citations  

Numerical Solution of Troesch’s Problem by Sinc-Collocation Method

HTML  Download Download as PDF (Size: 191KB)  PP. 707-712  
DOI: 10.4236/am.2013.44098    4,973 Downloads   7,844 Views  Citations
Author(s)

ABSTRACT

A new algorithm is presented for solving Troeschs problem. The numerical scheme based on the sinc-collocation technique is deduced. The equation is reduced to systems of nonlinear algebraic equations. Some numerical experiments are made. Compared with the modified homotopy perturbation technique (MHP), the variational iteration method and the Adomian decomposition method. It is shown that the sinc-collocation method yields better results.

Share and Cite:

El-Gamel, M. (2013) Numerical Solution of Troesch’s Problem by Sinc-Collocation Method. Applied Mathematics, 4, 707-712. doi: 10.4236/am.2013.44098.

Cited by

[1] Troesch's problem: A numerical study with cubic trigonometric B-spline method
shenawy, M El-Gamel, D Reda - Partial Differential Equations in …, 2024
[2] Generalization of a class of uniformly optimized k-step hybrid block method for solving two-point boundary value problems
Results in Physics, 2023
[3] Numerical solutions of Troesch and Duffing equations by Taylor Wavelets
Hacettepe Journal of Mathematics & Statistics, 2023
[4] A Direct Relaxation-Iteration Technique for the Troesch Problem
WSEAS Transactions on Equations, 2022
[5] Numerical solution of two-point nonlinear boundary value problems via Legendre–Picard iteration method
… and Computers in …, 2022
[6] Highly Efficient Method for Solving Parabolic PDE with Nonlocal Boundary Conditions
Gamel, GI El-Baghdady, M Abd El-Hady - Applied Mathematics, 2022
[7] A hybrid numerical method based on the generalized pseudospectral method for solving nonlinear differential equations
Computational Mathematics and …, 2022
[8] On using sinc collocation approach for solving a parabolic PDE with nonlocal boundary conditions
2021
[9] On using sinc collocation approach for solving a parabolic PDE with nonlocal boundary conditions.
2020
[10] Novel efficient collocation method for Sturm–Liouville problems with nonlocal integral boundary conditions
2020
[11] Troesch's problem solved by Sinc methods
2019
[12] Generalized pseudospectral method: Theory and applications
2019
[13] Laguerre wavelet method for solving Troesch equation
2019
[14] A Logarithmic Finite Difference Method for Troesch's Problem
2018
[15] Solution of Troesche's problem by double exponential Sinc collocation method
2018
[16] Troesch Probleminin Perturbasyon İterasyon Yöntemi İle Analizi
2017
[17] Solution of Troesch's problem through double exponential Sinc-Galerkin method
2017
[18] Error analysis of sinc-Galerkin method for time-dependent partial differential equations
Numerical Algorithms, 2017
[19] Sinc-Galerkin solution to the clamped plate eigenvalue problem
SeMA Journal, 2016
[20] SOLVING TROESCH'S PROBLEM BY USING MODIFIED NONLINEAR SHOOTING METHOD
2016
[21] Iterated Defect Correction with B-Splines for a Class of Strongly Nonlinear Two-Point Boundary Value Problems
American Review of Mathematics and Statistics, 2016
[22] SOLVING TROESCH’ S PROBLEM BY USING MODIFIED NONLINEAR SHOOTING METHOD
2016
[23] Successive Complementary Expansion Method for Solving Troesch's Problem as a Singular Perturbation Problem
International Journal of Engineering Mathematics, 2015
[24] A JACOBI COLLOCATION METHOD FOR TROESCH'S PROBLEM IN PLASMA PHYSICS
EH DOHA, D BALEANU, AH BHRAWI, RM HAFEZ - acad.ro, 2014
[25] Sinc-Galerkin method for solving biharmonic problems
Applied Mathematics and Computation, 2014
[26] A chebychev collocation method for solving Troesch's problem
International Journal of Mathematics and Computer Applications Research, 2013
[27] On the solution of MHD Jeffery–Hamel problem involving flow between two nonparallel plates with a blood flow application
[28] Computation of Troesch Problem by a Modified Newton's Approach

Journals Menu
Follow SCIRP
Contact us
customer@scirp.org
WhatsApp +86 18163351462(WhatsApp)
Click here to send a message to me 1655362766
Paper Publishing WeChat

Copyright © 2025 by authors and Scientific Research Publishing Inc.

Creative Commons License

This work and the related PDF file are licensed under a Creative Commons Attribution 4.0 International License.