反平面剪切波作用下无限长条中两条非相同边缘裂缝的解析解

Sourav Kumar Panja, Samim Alam, Subhas Chandra Mandal
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引用次数: 0

摘要

本文针对反面剪切波作用下无限正交带材中两条非相同边缘裂缝之间的相互作用,提出了一个广泛的分析解决方案。大多数研究假设带材中存在相同的裂缝或单边裂缝,但本研究考虑了不同尺寸的裂缝,从而开辟了新天地。通过结合混合型边界条件,研究得出了二元积分方程。然后,借助试解和等值线积分技术,将这些方程转化为柯西型奇异积分方程。奇异积分方程进一步转化为积分方程组,利用雅可比多项式对其进行数值求解。利用求得的解,利用克伦克插值公式推导出裂缝顶端的应力强度因子 (SIF) 和裂缝开口位移 (COD) 的表达式。得出的结果以图表形式展示,并与现有的静态情况下单边缘裂缝和对称边缘裂缝的解决方案进行了比较。
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Analytical solution of two non‐identical edge cracks in an infinite strip under anti‐plane shear wave
This article presents an extensive analytical solution addressing the interaction between two non‐identical edge cracks in an infinite orthotropic strip under anti‐plane shear waves. Most studies assume identical cracks or single edge crack in a strip, but this research breaks new ground by considering cracks of different sizes. By incorporating mixed‐type boundary conditions, the study derives dual integral equations. These equations are then transformed into a singular integral equation of Cauchy type with the aid of a trial solution and contour integration technique. The singular integral equation is further converted into a system of integral equations, which are solved numerically utilizing Jacobi polynomials. The obtained solutions are utilized to derive expressions for the stress intensity factor (SIF) and crack opening displacement (COD) at the crack tip using Krenk's interpolation formulae. The derived results are presented graphically and compared against existing solutions for single edge crack and symmetric edge cracks in static scenario.
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