SPECTRAL PROBLEM IN A DOMAIN PERFORATED ALONG THE BOUNDARY. PERTURBATION OF A MULTIPLE EIGENVALUE

R. R. Gadylshin; D. V. Kozhevnikov; G. A. Chechkin

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SPECTRAL PROBLEM IN A DOMAIN PERFORATED ALONG THE BOUNDARY. PERTURBATION OF A MULTIPLE EIGENVALUE

机译：沿边界贯穿的域中的谱问题。多个特征值的摄动

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摘要

We consider the boundary value problem for the Laplace operator in a two-dimensional domain which is partially perforated along the boundary. The homogeneous Neumann condition is imposed on the outer boundary, whereas the homogeneous Dirichlet condition is stated on the boundary of small cavities. We construct two-term asymptotics with respect to a small parameter for eigenvalues of this boundary value problem converging to a multiple eigenvalue of the homogenized (limit) problem. We obtain conditions under which a multiple eigenvalue of the homogenized problem splits into simple ones. We also obtain the limit of the corresponding eigenfunctions. Bibliography: 35 titles. Illustrations: 2 figures.

机译：我们考虑了Laplace算子在二维域中的边界值问题，该问题沿边界部分穿孔。均匀的诺伊曼条件施加在外边界上，而均匀的狄里克雷条件表示在小空腔的边界上。我们针对该边界值问题的特征值的小参数构造了两个渐近项，收敛到均质（极限）问题的多个特征值。我们获得了均化问题的多个特征值分裂为简单特征的条件。我们还获得了相应特征函数的极限。参考书目：35种。插图：2个数字。

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《Journal of Mathematical Sciences》 |2014年第3期|276-292|共17页
作者
R. R. Gadylshin; D. V. Kozhevnikov; G. A. Chechkin;
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Bashkir State University, 32, Frunze st., Ufa 450074, Russia;

Bashkir State University, 32, Frunze st., Ufa 450074, Russia;

Moscow Lomonosov State University, Moscow 119991, Russia;

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SPECTRAL PROBLEM IN A DOMAIN PERFORATED ALONG THE BOUNDARY. PERTURBATION OF A MULTIPLE EIGENVALUE

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