On eigenelements of a two-dimensional Steklov-type boundary value problem for the Lamé operator

IF 0.6 Q3 MATHEMATICS
D. B. Davletov, O. B. Davletov, R.R. Davletova, A. Ershov
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引用次数: 0

Abstract

In this paper, we study a two-dimensional Steklov-type boundary value problem for the Lamé operator in a half-strip, which is the limiting problem for a singularly perturbed boundary-value problem in a half-strip with a small hole. A theorem on the existence of eigenelements of the boundary value problem under study is proved. In particular, we obtain estimates for the eigenvalues expressed in terms of the Lamé constants and a parameter that determines the width of the half-strip, and refine the structure of the corresponding eigenfunctions, which determines their behavior as their argument move away from the base of the half-strip. Moreover, explicit expressions for the eigenvalues of the limiting boundary value problem are found up to the solution of a system of algebraic equations. The results obtained in this paper will make it possible to construct and rigorously justify an asymptotic expansion of the eigenvalue of a singularly perturbed boundary value problem in a half-strip with a small round hole in powers of a small parameter that determines the diameter of the hole.
lam算子的二维steklov型边值问题的特征元
本文研究了半带上lam算子的二维steklov型边值问题,该问题是带小孔的半带上奇摄动边值问题的极限问题。证明了所研究的边值问题特征元存在性的一个定理。特别是,我们获得了用lam常数和一个决定半带宽度的参数表示的特征值的估计,并改进了相应的特征函数的结构,这决定了它们的参数离开半带基部时的行为。此外,还得到了极限边值问题的特征值的显式表达式,直至代数方程组的解。本文所得到的结果将有可能构造并严格证明具有小圆孔的半条形奇异摄动边值问题的特征值在决定孔直径的小参数的幂次上的渐近展开式。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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来源期刊
CiteScore
1.20
自引率
40.00%
发文量
27
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