裂纹周期性分布削弱正交各向异性固体的有效反平面弹性特性

IF 0.8 4区 工程技术 Q3 MATHEMATICS, APPLIED Quarterly Journal of Mechanics and Applied Mathematics Pub Date : 2014-05-01 DOI:10.1093/QJMAM/HBU008
T. Williams, W. Parnell
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引用次数: 5

摘要

利用低频波传播域的渐近均匀化方法,导出了裂纹固体在无裂纹情况下的有效反平面弹性性质。固体是一种周期性介质,由包含N个在z方向上无限延伸但在y平面上具有任意形状和方向的裂纹的周期单元所定义。有效属性是根据所谓的细胞问题的解决方案来定义的。我们提出了两种方便的解决单元问题的方案,一种是基于近周期格林函数,另一种是基于双周期多极展开。使用这些方法,我们将结果与现有的直线裂缝周期阵列近似表达式进行比较,并通过评估它们与本方法获得的精确结果的偏差来讨论它们的有效性。我们继续考虑更复杂的分布,如椭圆腔,非直裂缝和正交各向异性宿主相的影响。特别是,我们表明,在正交各向异性宿主介质中,特定类型的规则裂纹阵列可以诱导在xy平面上传播的反平面剪切波的宏观各向同性响应。
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EFFECTIVE ANTIPLANE ELASTIC PROPERTIES OF AN ORTHOTROPIC SOLID WEAKENED BY A PERIODIC DISTRIBUTION OF CRACKS
Summary Using the method of asymptotic homogenization in the low-frequency wave propagation regime we derive the effective antiplane elastic properties of a cracked solid which in the absence of cracks would be orthotropic. The solid is a periodic medium defined by a periodic cell containing N cracks of infinite extent in thez direction but with arbitrary shape and orientation in thexy plane. Effective properties are defined in terms of the solution to a so-called cell problem. We propose two convenient schemes by which the cell problem can be solved, one based on a nearly periodic Green’s function, the other based on doubly periodic multipole expansions. Using these methods we compare results with existing approximate expressions for periodic arrays of straight cracks and discuss their regimes of validity by assessing their departure from the exact results obtained by the present method. We go on to consider more complex distributions such as elliptical cavities, non-straight cracks and effects of an orthotropic host phase. In particular we show that specific types of regular arrays of cracks in an orthotropic host medium can induce a macroscopically isotropic response to antiplane shear waves propagating in the xy plane.
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来源期刊
CiteScore
1.90
自引率
11.10%
发文量
14
审稿时长
>12 weeks
期刊介绍: The Quarterly Journal of Mechanics and Applied Mathematics publishes original research articles on the application of mathematics to the field of mechanics interpreted in its widest sense. In addition to traditional areas, such as fluid and solid mechanics, the editors welcome submissions relating to any modern and emerging areas of applied mathematics.
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