Solving Troesch's problem by using modified nonlinear shooting method
In this research article, the non - linear shooting method is modified (MNLSM) and is considered to simulate Troesch’s sensitive problem (TSP) numerically. TSP is a 2nd order non - linear BVP with Dirichlet boundary conditions . In M NLSM , classical 4 th order Runge - Kutta method...
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my.utm.685462017-11-14T06:23:14Z http://eprints.utm.my/id/eprint/68546/ Solving Troesch's problem by using modified nonlinear shooting method Alias, Norma Manaf, Abdul Ali, Akhtar Habib, Mustafa Q Science In this research article, the non - linear shooting method is modified (MNLSM) and is considered to simulate Troesch’s sensitive problem (TSP) numerically. TSP is a 2nd order non - linear BVP with Dirichlet boundary conditions . In M NLSM , classical 4 th order Runge - Kutta method is replaced by Adams - Bashforth - Moulton method, both for systems of ODEs . MNLSM showed to be efficient and is easy for implementation. Numerical results are given to show the performance of MNLSM, compared to the exact solution and to the results by He’s polynomials. Also, discussion of results and the comparison with other applied techniques from the literature are given for TSP. Penerbit UTM Press 2016-01-02 Article PeerReviewed application/pdf en http://eprints.utm.my/id/eprint/68546/1/NormaAlias2016_SolvingTroeschsProblembyUsingModified.pdf Alias, Norma and Manaf, Abdul and Ali, Akhtar and Habib, Mustafa (2016) Solving Troesch's problem by using modified nonlinear shooting method. Jurnal Teknologi, 78 (4-4). pp. 45-52. ISSN 0127-9696 http://www.jurnalteknologi.utm.my/index.php/jurnalteknologi/article/view/8295/5013 |
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Q Science Alias, Norma Manaf, Abdul Ali, Akhtar Habib, Mustafa Solving Troesch's problem by using modified nonlinear shooting method |
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In this research article, the non - linear shooting method is modified (MNLSM) and is considered to simulate Troesch’s sensitive problem (TSP) numerically. TSP is a 2nd order non - linear BVP with Dirichlet boundary conditions . In M NLSM , classical 4 th order Runge - Kutta method is replaced by Adams - Bashforth - Moulton method, both for systems of ODEs . MNLSM showed to be efficient and is easy for implementation. Numerical results are given to show the performance of MNLSM, compared to the exact solution and to the results by He’s polynomials. Also, discussion of results and the comparison with other applied techniques from the literature are given for TSP. |
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Article |
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Alias, Norma Manaf, Abdul Ali, Akhtar Habib, Mustafa |
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Alias, Norma Manaf, Abdul Ali, Akhtar Habib, Mustafa |
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Alias, Norma |
title |
Solving Troesch's problem by using modified nonlinear shooting method |
title_short |
Solving Troesch's problem by using modified nonlinear shooting method |
title_full |
Solving Troesch's problem by using modified nonlinear shooting method |
title_fullStr |
Solving Troesch's problem by using modified nonlinear shooting method |
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Solving Troesch's problem by using modified nonlinear shooting method |
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solving troesch's problem by using modified nonlinear shooting method |
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Penerbit UTM Press |
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2016 |
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http://eprints.utm.my/id/eprint/68546/1/NormaAlias2016_SolvingTroeschsProblembyUsingModified.pdf http://eprints.utm.my/id/eprint/68546/ http://www.jurnalteknologi.utm.my/index.php/jurnalteknologi/article/view/8295/5013 |
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