A HYBRIDIZABLE DISCONTINUOUS GALERKIN METHOD FOR THE HELMHOLTZ EQUATION WITH HIGH WAVE NUMBER?

HUANGXIN CHEN; PEIPEI LU; XUEJUN XU

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A HYBRIDIZABLE DISCONTINUOUS GALERKIN METHOD FOR THE HELMHOLTZ EQUATION WITH HIGH WAVE NUMBER?

机译：高波数的亥姆霍兹方程的一种可混合的不连续伽勒金方法？

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This paper analyzes the error estimates of the hybridizable discontinuous Galerkin (HDG) method for the Helmholtz equation with high wave number in two and three dimensions. The approximation piecewise polynomial spaces we deal with are of order p ≥ 1. Through choosing a specific parameter and using the duality argument, it is proved that the HDG method is stable without any mesh constraint for any wave number κ. By exploiting the stability estimates, the dependence of convergence of the HDG method on κ, h, and p is obtained. Numerical experiments are given to verify the theoretical results.

机译：本文针对二维和三维高波数的Helmholtz方程，分析了可混合的不连续Galerkin（HDG）方法的误差估计。我们处理的近似分段多项式空间的阶数为p≥1。通过选择特定参数并使用对偶参数，证明了HDG方法是稳定的，对任何波数κ都没有任何网格约束。通过利用稳定性估计，获得了HDG方法收敛对κ，h和p的依赖性。通过数值实验验证了理论结果。

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来源
《SIAM Journal on Numerical Analysis》 |2013年第4期|共23页
作者
HUANGXIN CHEN; PEIPEI LU; XUEJUN XU;
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原文格式 PDF
正文语种 eng
中图分类 51.81;
关键词
hybridizable discontinuous Galerkin method; Helmholtz equation; high wave number; error estimates;

机译：可混合不连续Galerkin方法;Helmholtz方程;高波数;误差估计;

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A HYBRIDIZABLE DISCONTINUOUS GALERKIN METHOD FOR THE HELMHOLTZ EQUATION WITH HIGH WAVE NUMBER?

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