A least-squares fem-bem coupling method for linear elasticity

M. Maischak; S. Oestmann; E.P. Stephan

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A least-squares fem-bem coupling method for linear elasticity

机译：线性弹性的最小二乘fem-bem耦合方法

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This paper deals with a least-squares formulation of a second order transmission problem for linear elasticity. The problem in the unbounded exterior domain is rewritten with boundary integral equations on the boundary of the inner domain. In the interior domain we treat a linear elastic material which can also be nearly incompressible. The least-squares functional is given in terms of the H~(-1)(Ω) and H~(1/2)(Γ) norms. These norms are realized by solution operators of corresponding dual norm problems which are approximated using multilevel preconditioners.

机译：本文讨论了线性弹性的二阶传递问题的最小二乘公式。无边界外部域中的问题用内部域边界上的边界积分方程重写。在内部领域，我们处理几乎不能压缩的线性弹性材料。最小二乘函数是根据H〜（-1）（Ω）和H〜（1/2）（Γ）范数给出的。这些规范是由对应的双重规范问题的求解算子实现的，该对偶规范问题使用多级预处理器进行了近似。

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来源
《Applied numerical mathematics 》 |2012年第4期| p.457-472| 共16页
作者
M. Maischak; S. Oestmann; E.P. Stephan;
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作者单位

B1C0M, Brunei University, Uxbridge, UB8 3PH, UK;

Institut fur Angewandte Mathematik, Leibniz Universitat Hannover, Welfengarten 1,30167 Hannover, Germany;

Institut fur Angewandte Mathematik, Leibniz Universitat Hannover, Welfengarten 1,30167 Hannover, Germany;

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收录信息美国《科学引文索引》(SCI);美国《工程索引》(EI);
原文格式 PDF
正文语种 eng
中图分类
关键词
fem-bem coupling; least-squares method; transmission problems;

机译：fem-bem耦合;最小二乘法传播问题;

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3. Least-squares methods for linear elasticity [J] . Cai ZQ, Starke G SIAM Journal on Numerical Analysis . 2004 ,第2期

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A least-squares fem-bem coupling method for linear elasticity

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