Analytical solutions to Mode I penny-shaped crack problems in two-dimensional hexagonal quasicrystals with piezoelectric effect

IF 4.4 2区 工程技术 Q1 MECHANICS European Journal of Mechanics A-Solids Pub Date : 2024-08-28 DOI:10.1016/j.euromechsol.2024.105425
Yuan Li , Shuhang Tang , Jingli Ren , Shujie Yan , Minghao Zhao
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Abstract

The paper studies a penny-shaped crack in an infinite three-dimensional body of two-dimensional hexagonal quasicrystal media with piezoelectric effect. The crack surfaces are applied combined electric and normal phonon loadings. Such a Model I crack problem is transformed into a mixed boundary value problem in the upper half-space, which is analytically solved using Fabrikant's potential theory method. The boundary integral-differential equations governing Model I crack problems are presented for two-dimensional hexagonal piezoelectric quasicrystals. The normal phonon displacement discontinuity and electric potential discontinuity across crack surfaces are taken as the unknown variables of boundary governing equations. Analytical solutions of all field variables are derived not only for the crack plane but also for the full space. Solutions in integral form are provided for the penny-shaped crack under arbitrarily distributed electric and normal phonon loadings. Closed-form solutions in terms of elementary functions are given for concentrated point loadings and uniformly distributed loadings, respectively. Key fracture mechanics parameters, such as crack surface extended displacements (i.e., normal phonon displacement, electric potential), crack tip extended stresses (i.e., normal phonon stress, electric displacement) distribution, and corresponding extended stress intensity factors, are clearly derived. Numerical results are utilized to verify the present analytical solutions and graphically illustrate the distribution of phonon-phason-electric coupling fields around the crack. The present solution can serve as a benchmark for both experimental and numerical investigations.

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具有压电效应的二维六方准晶体中模式 I 笔形裂缝问题的解析解
本文研究了具有压电效应的二维六方准晶介质无限三维体中的一分钱形裂缝。裂缝表面施加了电和法向声子组合载荷。这种 I 型裂缝问题被转化为上半空间的混合边界值问题,并使用 Fabrikant 势理论方法进行分析求解。针对二维六方压电准晶体,提出了支配模型 I 裂纹问题的边界积分微分方程。裂缝表面的法向声子位移不连续和电势不连续被作为边界控制方程的未知变量。不仅对裂缝平面,而且对整个空间都得出了所有场变量的解析解。在任意分布的电荷和法向声子荷载作用下,以积分形式给出了一分钱形裂缝的解。对于集中点载荷和均匀分布载荷,分别给出了基本函数的闭式解。明确推导出了关键的断裂力学参数,如裂纹表面扩展位移(即法向声子位移、电势)、裂纹顶端扩展应力(即法向声子应力、电位移)分布以及相应的扩展应力强度因子。利用数值结果验证了本分析解,并以图形说明了裂纹周围声子-声子-电耦合场的分布。本解决方案可作为实验和数值研究的基准。
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
7.00
自引率
7.30%
发文量
275
审稿时长
48 days
期刊介绍: The European Journal of Mechanics endash; A/Solids continues to publish articles in English in all areas of Solid Mechanics from the physical and mathematical basis to materials engineering, technological applications and methods of modern computational mechanics, both pure and applied research.
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