A New Piecewise-Spectral Homotopy Analysis Method for Solving Chaotic Systems of Initial Value Problems
An accurate algorithm for solving initial value problems (IVPs) which are highly oscillatory is proposed. The proposed method is based on a novel technique of extending the standard spectral homotopy analysis method (SHAM) and adapting it to a sequence of multiple intervals. In this new application...
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Hindawi Limited
2013-01-01
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| Series: | Mathematical Problems in Engineering |
| Online Access: | http://dx.doi.org/10.1155/2013/583193 |
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doaj-e9f8b239665f4e34a65d80dc3d843d792020-11-24T23:52:32ZengHindawi LimitedMathematical Problems in Engineering1024-123X1563-51472013-01-01201310.1155/2013/583193583193A New Piecewise-Spectral Homotopy Analysis Method for Solving Chaotic Systems of Initial Value ProblemsH. Saberi Nik0Sohrab Effati1Sandile S. Motsa2Stanford Shateyi3Department of Applied Mathematics, Ferdowsi University of Mashhad, Mashhad, IranDepartment of Applied Mathematics, Ferdowsi University of Mashhad, Mashhad, IranSchool of Mathematics, Computer Science and Statistics, University of KwaZulu-Natal, Private Bag X01, Scottsville, Pietermaritzburg 3209, South AfricaDepartment of Mathematics, University of Venda, P Bag X5050, Thohoyandou 0950, South AfricaAn accurate algorithm for solving initial value problems (IVPs) which are highly oscillatory is proposed. The proposed method is based on a novel technique of extending the standard spectral homotopy analysis method (SHAM) and adapting it to a sequence of multiple intervals. In this new application the method is referred to as the piecewise spectral homotopy analysis method (PSHAM). The applicability of the proposed method is examined on the differential equation system modeling HIV infection of CD4+ T cells and the Genesio-Tesi system which is known to be chaotic and highly oscillatory. Also, for the first time, we present here a convergence proof for SHAM. We treat in detail Legendre collocation and Chebyshev collocation. The method is compared to MATLAB’s ode45 inbuilt solver as a measure of accuracy and efficiency.http://dx.doi.org/10.1155/2013/583193 |
| collection |
DOAJ |
| language |
English |
| format |
Article |
| sources |
DOAJ |
| author |
H. Saberi Nik Sohrab Effati Sandile S. Motsa Stanford Shateyi |
| spellingShingle |
H. Saberi Nik Sohrab Effati Sandile S. Motsa Stanford Shateyi A New Piecewise-Spectral Homotopy Analysis Method for Solving Chaotic Systems of Initial Value Problems Mathematical Problems in Engineering |
| author_facet |
H. Saberi Nik Sohrab Effati Sandile S. Motsa Stanford Shateyi |
| author_sort |
H. Saberi Nik |
| title |
A New Piecewise-Spectral Homotopy Analysis Method for Solving Chaotic Systems of Initial Value Problems |
| title_short |
A New Piecewise-Spectral Homotopy Analysis Method for Solving Chaotic Systems of Initial Value Problems |
| title_full |
A New Piecewise-Spectral Homotopy Analysis Method for Solving Chaotic Systems of Initial Value Problems |
| title_fullStr |
A New Piecewise-Spectral Homotopy Analysis Method for Solving Chaotic Systems of Initial Value Problems |
| title_full_unstemmed |
A New Piecewise-Spectral Homotopy Analysis Method for Solving Chaotic Systems of Initial Value Problems |
| title_sort |
new piecewise-spectral homotopy analysis method for solving chaotic systems of initial value problems |
| publisher |
Hindawi Limited |
| series |
Mathematical Problems in Engineering |
| issn |
1024-123X 1563-5147 |
| publishDate |
2013-01-01 |
| description |
An accurate algorithm for solving initial value problems (IVPs) which are highly oscillatory is proposed. The proposed method is based on a novel technique of extending the standard spectral homotopy analysis method (SHAM) and adapting it to a sequence of multiple intervals. In this new application the method is referred to as the piecewise spectral homotopy analysis method (PSHAM). The applicability of the proposed method is examined on the differential equation system modeling HIV infection of CD4+ T cells and the Genesio-Tesi system which is known to be chaotic and highly oscillatory. Also, for the first time, we present here a convergence proof for SHAM. We treat in detail Legendre collocation and Chebyshev collocation. The method is compared to MATLAB’s ode45 inbuilt solver as a measure of accuracy and efficiency. |
| url |
http://dx.doi.org/10.1155/2013/583193 |
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