On kirchhoff's model of parabolic type
© 2016, Taylor & Francis. In this article, the existence of a global strong solution for all finite time is derived for the Kirchhoff's model of parabolic type. Based on exponential weight function, some new regularity results which reflect the exponential decay property are obtained for...
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th-cmuir.6653943832-418102017-09-28T04:23:33Z On kirchhoff's model of parabolic type Kundu S. Pani A. Khebchareon M. © 2016, Taylor & Francis. In this article, the existence of a global strong solution for all finite time is derived for the Kirchhoff's model of parabolic type. Based on exponential weight function, some new regularity results which reflect the exponential decay property are obtained for the exact solution. For the related dynamics, the existence of a global attractor is shown to hold for the problem when the non-homogeneous forcing function is either independent of time or in L ∞ (L 2 ). With the finite element Galerkin method applied in spatial direction keeping time variable continuous, a semidiscrete scheme is analyzed, and it is also established that the semidiscrete system has a global discrete attractor. Optimal error estimates in L ∞ (H 1 ) norm are derived which are valid uniformly in time. Further, based on a backward Euler method, a completely discrete scheme is analyzed and error estimates are derived. It is also further, observed that in cases where f�=�0 or f�=�O(e −γ 0 t ) with γ 0 � > �0, the discrete solutions and error estimates decay exponentially in time. Finally, some numerical experiments are discussed which confirm our theoretical findings. 2017-09-28T04:23:33Z 2017-09-28T04:23:33Z 2016-06-02 Journal 01630563 2-s2.0-84975789228 10.1080/01630563.2016.1176930 https://www.scopus.com/inward/record.uri?partnerID=HzOxMe3b&scp=84975789228&origin=inward http://cmuir.cmu.ac.th/jspui/handle/6653943832/41810 |
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© 2016, Taylor & Francis. In this article, the existence of a global strong solution for all finite time is derived for the Kirchhoff's model of parabolic type. Based on exponential weight function, some new regularity results which reflect the exponential decay property are obtained for the exact solution. For the related dynamics, the existence of a global attractor is shown to hold for the problem when the non-homogeneous forcing function is either independent of time or in L ∞ (L 2 ). With the finite element Galerkin method applied in spatial direction keeping time variable continuous, a semidiscrete scheme is analyzed, and it is also established that the semidiscrete system has a global discrete attractor. Optimal error estimates in L ∞ (H 1 ) norm are derived which are valid uniformly in time. Further, based on a backward Euler method, a completely discrete scheme is analyzed and error estimates are derived. It is also further, observed that in cases where f�=�0 or f�=�O(e −γ 0 t ) with γ 0 � > �0, the discrete solutions and error estimates decay exponentially in time. Finally, some numerical experiments are discussed which confirm our theoretical findings. |
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Journal |
| author |
Kundu S. Pani A. Khebchareon M. |
| spellingShingle |
Kundu S. Pani A. Khebchareon M. On kirchhoff's model of parabolic type |
| author_facet |
Kundu S. Pani A. Khebchareon M. |
| author_sort |
Kundu S. |
| title |
On kirchhoff's model of parabolic type |
| title_short |
On kirchhoff's model of parabolic type |
| title_full |
On kirchhoff's model of parabolic type |
| title_fullStr |
On kirchhoff's model of parabolic type |
| title_full_unstemmed |
On kirchhoff's model of parabolic type |
| title_sort |
on kirchhoff's model of parabolic type |
| publishDate |
2017 |
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https://www.scopus.com/inward/record.uri?partnerID=HzOxMe3b&scp=84975789228&origin=inward http://cmuir.cmu.ac.th/jspui/handle/6653943832/41810 |
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