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A qualocation method for parabolic partial differential equations
DSpace at IIT Bombay
View Archive Info| Field | Value | |
| Title |
A qualocation method for parabolic partial differential equations
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| Creator |
PANI, AK
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| Subject |
galerkin methods
quadrature |
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| Description |
In this paper a qualocation method is analysed for parabolic partial differential equations in one space dimension. This method may be described as a discrete HI-Galerkin method in which the discretization is achieved by approximating the integrals by a composite Gauss quadrature rule. An O(h(4-i)) rate of convergence in the W-i,W-p norm for i = 0, 1 and 1 less than or equal to p less than or equal to infinity is derived for a semidiscrete scheme without any quasi-uniformity assumption on the finite element mesh. Further, an optimal error estimate in the H-2 norm is also proved. Finally, the linearized backward Euler method and extrapolated Crank-Nicolson scheme are examined and analysed.
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| Publisher |
OXFORD UNIV PRESS
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| Date |
2011-08-19T11:38:42Z
2011-12-26T12:56:13Z 2011-12-27T05:44:35Z 2011-08-19T11:38:42Z 2011-12-26T12:56:13Z 2011-12-27T05:44:35Z 1999 |
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| Type |
Article
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| Identifier |
IMA JOURNAL OF NUMERICAL ANALYSIS, 19(3), 473-495
0272-4979 http://dx.doi.org/10.1093/imanum/19.3.473 http://dspace.library.iitb.ac.in/xmlui/handle/10054/10339 http://hdl.handle.net/10054/10339 |
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| Language |
en
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