Asymptotic Model of a Piezoelectric Composite Beam

IF 0.5 4区 工程技术 Q4 MECHANICS
I. V. Andrianov, A. A. Kolpakov, L. Faella
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引用次数: 0

Abstract

This paper presents a method of transforming from the three-dimensional piezoelastic problem for a composite material to the one-dimensional problem for a piezoelastic beam. This is done using the asymptotic homogenization technique based on the separation of fast and slow variables in the solution. A special feature of the problem is the presence of two small parameters, one of which characterizes the microstructure of the composite material, and the other defines the cross-sectional size. Homogenized relations describing the piezoelastic beam and fast correctors were obtained. Their joint use makes it possible to correctly describe the total stress-strain state of the original three-dimensional body. The proposed method is suitable for solving the three-dimensional problem of deformation of an extended body with an arbitrary periodic structure as well as for solving new problems (e.g., the torsion problem) that have no analogues in the theory of piezoelastic plates.

压电复合梁的渐近模型
摘要 本文介绍了一种将复合材料的三维压弹性问题转换为压弹性梁的一维问题的方法。该方法采用基于求解中快变量和慢变量分离的渐近同质化技术。该问题的一个特点是存在两个小参数,其中一个描述复合材料的微观结构,另一个定义横截面尺寸。我们获得了描述压弹性梁和快速校正器的均质化关系。它们的共同使用使得正确描述原始三维体的总应力-应变状态成为可能。所提出的方法适用于解决具有任意周期结构的扩展体的三维变形问题,也适用于解决在压弹性板理论中没有类似方法的新问题(如扭转问题)。
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
16.70%
发文量
43
审稿时长
4-8 weeks
期刊介绍: Journal of Applied Mechanics and Technical Physics is a journal published in collaboration with the Siberian Branch of the Russian Academy of Sciences. The Journal presents papers on fluid mechanics and applied physics. Each issue contains valuable contributions on hypersonic flows; boundary layer theory; turbulence and hydrodynamic stability; free boundary flows; plasma physics; shock waves; explosives and detonation processes; combustion theory; multiphase flows; heat and mass transfer; composite materials and thermal properties of new materials, plasticity, creep, and failure.
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