在薄的无限阶梯状域中的捕获模式。第1部分:存在性结果

Asymptot. Anal. Pub Date : 2017-09-19 DOI:10.3233/ASY-171422
B. Delourme, S. Fliss, P. Joly, E. Vasilevskaya
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引用次数: 9

摘要

本文讨论由参考周期介质的局域扰动得到的波在特定二维结构中的传播。这个参考介质是一个阶梯状域,即一个薄周期结构(厚度由一个小参数$\epsilon > 0$表征),其极限(当$\epsilon$趋于0时)是一个周期图。局域扰动包括通过改变阶梯的一个横档的厚度来改变参考介质的几何形状。考虑到该域中具有Neumann边界条件的标量亥姆霍兹方程,我们想知道这样的几何扰动是否能够产生局域本征模态。为了解决这个问题,我们使用一个标准的渐近分析方法,它由三个主要步骤组成。我们首先找到特征值问题在$\epsilon$趋于0时的形式极限。在这种情况下,它对应于沿周期图定义的二阶微分算子的特征值问题。然后,我们进行了极限算子谱的显式计算。最后,证明了初始算子的谱接近极限算子的谱。特别地,我们证明了局域模态的存在,前提是几何扰动存在于周期性薄结构的一个阶的宽度减小。此外,在这种情况下,只要e足够小,就可以创建任意多的特征值。数值实验验证了理论结果。
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Trapped modes in thin and infinite ladder like domains. Part 1: Existence results
The present paper deals with the wave propagation in a particular two dimensional structure, obtained from a localized perturbation of a reference periodic medium. This reference medium is a ladder like domain, namely a thin periodic structure (the thickness being characterized by a small parameter $\epsilon > 0$) whose limit (as $\epsilon$ tends to 0) is a periodic graph. The localized perturbation consists in changing the geometry of the reference medium by modifying the thickness of one rung of the ladder. Considering the scalar Helmholtz equation with Neumann boundary conditions in this domain, we wonder whether such a geometrical perturbation is able to produce localized eigenmodes. To address this question, we use a standard approach of asymptotic analysis that consists of three main steps. We first find the formal limit of the eigenvalue problem as the $\epsilon$ tends to 0. In the present case, it corresponds to an eigenvalue problem for a second order differential operator defined along the periodic graph. Then, we proceed to an explicit calculation of the spectrum of the limit operator. Finally, we prove that the spectrum of the initial operator is close to the spectrum of the limit operator. In particular, we prove the existence of localized modes provided that the geometrical perturbation consists in diminishing the width of one rung of the periodic thin structure. Moreover, in that case, it is possible to create as many eigenvalues as one wants, provided that e is small enough. Numerical experiments illustrate the theoretical results.
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