A Posteriori Error Estimates for HDG Methods

Bernardo Cockburn; Wujun Zhang

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A Posteriori Error Estimates for HDG Methods

机译：HDG方法的后验误差估计

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摘要

We present the first a posteriori error analysis of the so-called hybridizable discontinuous Galerkin (HDG) methods for second-order elliptic problems. We show that the error in the flux can be controlled by only two terms. The first term captures the so-called data oscillation. The second solely depends on the difference between the trace of the scalar approximation and the corresponding numerical trace. Numerical experiments verifying the reliability and efficiency of the estimate in two-space dimensions are presented.

机译：我们提出了针对二阶椭圆问题的所谓可混合不连续伽勒金（HDG）方法的第一个后验误差分析。我们表明，通量误差只能由两个项控制。第一项捕获了所谓的数据振荡。第二个仅取决于标量近似曲线与相应数值曲线之间的差异。数值实验验证了二维空间估计的可靠性和有效性。

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来源
《Journal of Scientific Computing》 |2012年第3期|p.582-607|共26页
作者
Bernardo Cockburn; Wujun Zhang;
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作者单位

School of Mathematics, University of Minnesota. Minneapolis, MN, USA;

School of Mathematics, University of Minnesota. Minneapolis, MN, USA;

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原文格式 PDF
正文语种 eng
中图分类
关键词
discontinuous galerkin method; a posteriori error estimate; postprocessing solution;

机译：不连续伽勒金法后验误差估计;后处理解决方案;

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8. Feedback Finite Element Method with a Posteriori Error Estimation. Part 1. The Finite Element Method and Some Basic Properties of the A Posteriori Error Estimator. [R] . Babuska, I., Miller, A. 1984

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A Posteriori Error Estimates for HDG Methods

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