A non-polynomial numerical scheme for fourth-order fractional diffusion-wave model
In this paper, we tackle the numerical treatment of a fourth-order fractional diffusion-wave problem. By using parametric quintic spline in the spatial dimension and an approximation of Caputo derivatives at half-points, we propose a numerical scheme and rigorously prove its solvability, convergence...
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sg-ntu-dr.10356-1413842020-06-08T04:15:01Z A non-polynomial numerical scheme for fourth-order fractional diffusion-wave model Li, Xuhao Wong, Patricia Jia Yiing School of Electrical and Electronic Engineering Engineering::Electrical and electronic engineering Parametric Spline Quintic Spline In this paper, we tackle the numerical treatment of a fourth-order fractional diffusion-wave problem. By using parametric quintic spline in the spatial dimension and an approximation of Caputo derivatives at half-points, we propose a numerical scheme and rigorously prove its solvability, convergence and stability in maximum norm. It is shown that the theoretical convergence order improves those of earlier work. To confirm, simulation is carried out to demonstrate the numerical efficiency of the proposed scheme as well as the better performance over other methods. 2020-06-08T04:15:01Z 2020-06-08T04:15:01Z 2018 Journal Article Li, X. & Wong, P. J. Y. (2018). A non-polynomial numerical scheme for fourth-order fractional diffusion-wave model. Applied Mathematics and Computation, 331, 80-95. doi:10.1016/j.amc.2018.02.044 0096-3003 https://hdl.handle.net/10356/141384 10.1016/j.amc.2018.02.044 2-s2.0-85044020854 331 80 95 en Applied Mathematics and Computation © 2018 Elsevier Inc. All rights reserved. |
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Engineering::Electrical and electronic engineering Parametric Spline Quintic Spline |
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Engineering::Electrical and electronic engineering Parametric Spline Quintic Spline Li, Xuhao Wong, Patricia Jia Yiing A non-polynomial numerical scheme for fourth-order fractional diffusion-wave model |
| description |
In this paper, we tackle the numerical treatment of a fourth-order fractional diffusion-wave problem. By using parametric quintic spline in the spatial dimension and an approximation of Caputo derivatives at half-points, we propose a numerical scheme and rigorously prove its solvability, convergence and stability in maximum norm. It is shown that the theoretical convergence order improves those of earlier work. To confirm, simulation is carried out to demonstrate the numerical efficiency of the proposed scheme as well as the better performance over other methods. |
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School of Electrical and Electronic Engineering |
| author_facet |
School of Electrical and Electronic Engineering Li, Xuhao Wong, Patricia Jia Yiing |
| format |
Article |
| author |
Li, Xuhao Wong, Patricia Jia Yiing |
| author_sort |
Li, Xuhao |
| title |
A non-polynomial numerical scheme for fourth-order fractional diffusion-wave model |
| title_short |
A non-polynomial numerical scheme for fourth-order fractional diffusion-wave model |
| title_full |
A non-polynomial numerical scheme for fourth-order fractional diffusion-wave model |
| title_fullStr |
A non-polynomial numerical scheme for fourth-order fractional diffusion-wave model |
| title_full_unstemmed |
A non-polynomial numerical scheme for fourth-order fractional diffusion-wave model |
| title_sort |
non-polynomial numerical scheme for fourth-order fractional diffusion-wave model |
| publishDate |
2020 |
| url |
https://hdl.handle.net/10356/141384 |
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1681059690919755776 |