基于应变梯度弹性理论的平面内表面波在涂层半空间中传播

IF 1.7 4区工程技术 Q3 MATERIALS SCIENCE, MULTIDISCIPLINARY

Mathematics and Mechanics of Solids Pub Date : 2024-03-11 DOI:10.1177/10812865241235117

Bowen Zhao, Jianmin Long

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引用次数: 0

摘要

通过采用应变梯度弹性理论，我们研究了平面内表面波在带有微结构的涂层半空间中的传播。我们首先研究了本问题的一般情况，即表面层和半空间都由应变梯度弹性理论描述。我们提出了一般情况下的边界和连续性条件，并推导出表面波的频散关系。然后我们研究了两种特殊情况：(1) 表层由应变梯度弹性理论描述，而半空间由经典弹性理论描述；(2) 表层由经典弹性理论描述，而半空间由应变梯度弹性理论描述。我们研究了所有情况下应变梯度特征长度对表面波频散曲线的影响。这项研究有助于进一步了解弹性波在具有微结构的材料中的传播特性。

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In-plane surface waves propagating in a coated half-space based on the strain-gradient elasticity theory

By employing the strain gradient elasticity theory, we investigate the propagation of in-plane surface waves in a coated half-space with microstructures. We first investigate the general case of the present problem, that is, both the surface layer and the half-space are described by the strain-gradient elasticity theory. We formulate the boundary and continuity conditions of the general case and derive the dispersion relations of the surface waves. Then we investigate two special cases: (1) the surface layer is described by the strain-gradient elasticity theory, while the half-space by the classical elasticity theory; (2) the surface layer is described by the classical elasticity theory while the half-space by the strain-gradient elasticity theory. We examine the effects of strain-gradient characteristic lengths on the dispersion curves of surface waves in all cases. This study helps to further understand the propagation characteristics of elastic waves in materials with microstructures.

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来源期刊

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).