The higher accuracy fourth-order IADE algorithm
This study develops the novel fourth-order iterative alternating decomposition explicit (IADE) method of Mitchell and Fairweather (IADEMF4) algorithm for the solution of the one-dimensional linear heat equation with Dirichlet boundary conditions. The higher-order finite difference scheme is develope...
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my.uniten.dspace-299932023-12-29T15:43:54Z The higher accuracy fourth-order IADE algorithm Abu Mansor N. Zulkifle A.K. Alias N. Hasan M.K. Boyce M.J.N. 55880849100 7801341335 22733403000 9633140400 55881107400 This study develops the novel fourth-order iterative alternating decomposition explicit (IADE) method of Mitchell and Fairweather (IADEMF4) algorithm for the solution of the one-dimensional linear heat equation with Dirichlet boundary conditions. The higher-order finite difference scheme is developed by representing the spatial derivative in the heat equation with the fourth-order finite difference Crank-Nicolson approximation. This leads to the formation of pentadiagonal matrices in the systems of linear equations. The algorithm also employs the higher accuracy of the Mitchell and Fairweather variant. Despite the scheme's higher computational complexity, experimental results show that it is not only capable of enhancing the accuracy of the original corresponding method of second-order (IADEMF2), but its solutions are also in very much agreement with the exact solutions. Besides, it is unconditionally stable and has proven to be convergent. The IADEMF4 is also found to be more accurate, more efficient, and has better rate of convergence than the benchmarked fourth-order classical iterative methods, namely, the Jacobi (JAC4), the Gauss-Seidel (GS4), and the successive over-relaxation (SOR4) methods. � 2013 N. Abu Mansor et al. Final 2023-12-29T07:43:54Z 2023-12-29T07:43:54Z 2013 Article 10.1155/2013/236548 2-s2.0-84885449372 https://www.scopus.com/inward/record.uri?eid=2-s2.0-84885449372&doi=10.1155%2f2013%2f236548&partnerID=40&md5=9718bbf118de653be4d3bfafe1de6a9a https://irepository.uniten.edu.my/handle/123456789/29993 2013 236548 All Open Access; Gold Open Access; Green Open Access Scopus |
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This study develops the novel fourth-order iterative alternating decomposition explicit (IADE) method of Mitchell and Fairweather (IADEMF4) algorithm for the solution of the one-dimensional linear heat equation with Dirichlet boundary conditions. The higher-order finite difference scheme is developed by representing the spatial derivative in the heat equation with the fourth-order finite difference Crank-Nicolson approximation. This leads to the formation of pentadiagonal matrices in the systems of linear equations. The algorithm also employs the higher accuracy of the Mitchell and Fairweather variant. Despite the scheme's higher computational complexity, experimental results show that it is not only capable of enhancing the accuracy of the original corresponding method of second-order (IADEMF2), but its solutions are also in very much agreement with the exact solutions. Besides, it is unconditionally stable and has proven to be convergent. The IADEMF4 is also found to be more accurate, more efficient, and has better rate of convergence than the benchmarked fourth-order classical iterative methods, namely, the Jacobi (JAC4), the Gauss-Seidel (GS4), and the successive over-relaxation (SOR4) methods. � 2013 N. Abu Mansor et al. |
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55880849100 |
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55880849100 Abu Mansor N. Zulkifle A.K. Alias N. Hasan M.K. Boyce M.J.N. |
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Article |
| author |
Abu Mansor N. Zulkifle A.K. Alias N. Hasan M.K. Boyce M.J.N. |
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Abu Mansor N. Zulkifle A.K. Alias N. Hasan M.K. Boyce M.J.N. The higher accuracy fourth-order IADE algorithm |
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Abu Mansor N. |
| title |
The higher accuracy fourth-order IADE algorithm |
| title_short |
The higher accuracy fourth-order IADE algorithm |
| title_full |
The higher accuracy fourth-order IADE algorithm |
| title_fullStr |
The higher accuracy fourth-order IADE algorithm |
| title_full_unstemmed |
The higher accuracy fourth-order IADE algorithm |
| title_sort |
higher accuracy fourth-order iade algorithm |
| publishDate |
2023 |
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1806424504624218112 |
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13.214268 |