On the existence of Rayleigh waves with full impedance boundary condition

IF 1.7 4区 工程技术 Q3 MATERIALS SCIENCE, MULTIDISCIPLINARY Mathematics and Mechanics of Solids Pub Date : 2024-08-14 DOI:10.1177/10812865241266809
Pham Thi Ha Giang, Pham Chi Vinh
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Abstract

The existence of Rayleigh waves (propagating in isotropic elastic half-spaces) with the tangential and normal impedance boundary conditions was investigated. It has been shown that for the tangential impedance boundary condition (TIBC), there always exists a unique Rayleigh wave, while for the normal impedance boundary condition (NIBC), there exists a domain (of impedance and material parameters) in which exactly one Rayleigh wave is possible and outside this domain a Rayleigh wave is impossible. In this paper, we consider the existence of Rayleigh waves with the full impedance boundary condition (FIBC) that contains both TIBC and NIBC. It is shown that the existence picture of Rayleigh waves for this general case is more complicated. It contains domain for which exactly one Rayleigh wave exists, domain where a Rayleigh wave is impossible, and domain for which all three possibilities may occur: two Rayleigh waves exist, one Rayleigh wave exists, and no Rayleigh wave exists at all. The obtained existence results recover the existence results established previously for the cases of TIBC and NIBC. The formulas for the Rayleigh wave velocity are derived. As these formulas are totally explicit, they are very useful in various practical applications, especially in the non-destructive evaluation of the mechanical properties of structures. In order to establish the existence results and derive formulas for the Rayleigh wave velocity, the complex function method, which is based on the Cauchy-type integrals, is employed.
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论具有全阻抗边界条件的瑞利波的存在性
研究了在切向和法向阻抗边界条件下存在雷利波(在各向同性弹性半空间中传播)的问题。研究表明,对于切向阻抗边界条件 (TIBC),总是存在唯一的瑞利波,而对于法向阻抗边界条件 (NIBC),存在一个(阻抗和材料参数)域,在该域内恰好可能存在一个瑞利波,而在该域外则不可能存在瑞利波。在本文中,我们考虑了全阻抗边界条件(FIBC)下的瑞利波存在问题,该边界条件同时包含 TIBC 和 NIBC。结果表明,在这种一般情况下,瑞利波的存在情况更为复杂。它包含恰好存在一个瑞利波的域、不可能存在瑞利波的域,以及三种可能性都可能发生的域:存在两个瑞利波、存在一个瑞利波,以及根本不存在瑞利波。所获得的存在性结果恢复了之前针对 TIBC 和 NIBC 情况建立的存在性结果。推导出了瑞利波速度公式。由于这些公式是完全显式的,因此在各种实际应用中都非常有用,特别是在对结构的机械性能进行无损评估时。为了确定雷利波速度的存在结果并推导出雷利波速度公式,采用了基于 Cauchy 型积分的复变函数法。
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来源期刊
Mathematics and Mechanics of Solids
Mathematics and Mechanics of Solids 工程技术-材料科学:综合
CiteScore
4.80
自引率
19.20%
发文量
159
审稿时长
1 months
期刊介绍: Mathematics and Mechanics of Solids is an international peer-reviewed journal that publishes the highest quality original innovative research in solid mechanics and materials science. The central aim of MMS is to publish original, well-written and self-contained research that elucidates the mechanical behaviour of solids with particular emphasis on mathematical principles. This journal is a member of the Committee on Publication Ethics (COPE).
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