Biquadric finite element method for parabolic integro-differential equations

机译：抛物线积分微分方程的二元有限元方法

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Biquadric finite element approximation is established for parabolic integro-differential equations. Based on high accuracy analysis of the element, the superclose property is derived for semi-discrete scheme. Moreover, optimal error estimate is obtained by the interpolation technique instead of the Ritz-Volterra projection which is necessary for classical error estimates of finite element method. Finally, optimal error estimate is deduced for backward Euler discrete scheme.

机译：为抛物线积分微分方程建立了二元有限元逼近。在对元素进行高精度分析的基础上，推导了半离散方案的超闭合特性。此外，通过插值技术可以获得最佳误差估计，而不是使用Ritz-Volterra投影，这对于有限元方法的经典误差估计是必需的。最后，推导了后向欧拉离散方案的最优误差估计。

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《2011 International Conference on Multimedia Technology》|2011年|p.5760-5762|共3页
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Liao Jingyu; Wang Fenling; Zhao Yanmin;
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中图分类多媒体技术与多媒体计算机;
关键词
Biquadric finite element; optimal error estimate; parabolic integro-differential equations; semi-discrete and backward Euler schemes; superclose property;

机译：双二阶有限元;最优误差估计;抛物积分微分方程;半离散和向后欧拉格式;超闭合性;

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Biquadric finite element method for parabolic integro-differential equations

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