线性拟双曲型积分-微分方程有限元法的超收敛性

2011 Fourth International Conference on Information and Computing Pub Date : 2011-04-25 DOI:10.1109/ICIC.2011.120

W. Shen

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摘要

考虑一类拟双曲型积分微分方程的有限元方法。研究了近似解与精确解的Sobolev-Volterra投影之间的误差，其全局强超收敛性只要求分区是拟一致的。我们采用一种特殊的初始值选择方法来研究误差的超收敛性。给出了二阶超收敛的结果。

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Superconvergence of Finite Element Methods for Linear Quasi-hyperbolic Integro-differential Equations

We consider finite element methods applied to a class of quasi-hyperbolic integro-differential equations. Global strong super convergence, which only requires that partitions are quasi-uniform, is investigated for the error between the approximate solution and the Sobolev-Volterra projection of the exact solution. We employ a special method for initial value selection to study super convergence of the error. Two order super convergence results are demonstrated.

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2011 Fourth International Conference on Information and Computing

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