正交各向异性带型中裂纹诱导的温度场分析
Analysis of the Temperature Field Induced by a Crack in an Orthotropic Strip
摘要: 本文研究热荷载下正交各向异性带型中的裂纹问题。利用傅里叶变换,将热边值问题转化为奇异积分方程。采用Lobatto-Chebyshev公式得到线性代数方程系统。给出了裂纹诱导的温度场的数值解,通过数值计算分析了裂缝表面温度差的变化规律,采用图型表明了裂纹位置和裂纹尺寸对温度场的影响。
Abstract: This paper investigates the problem of a crack embedded in an orthotropic strip under a thermal loading. Using the Fourier transform, the thermal boundary value problem is transformed into a singular integral equation. The Lobatto-Chebyshev formula is used to further derive the linear system of algebraic equations. Through the numerical calculation, the temperature jump across the crack surface is obtained. Finally, the influence of crack position and crack size on the temperature field is reflected in the form of a graph.
文章引用:廖珊莉, 吴远波, 张利花. 正交各向异性带型中裂纹诱导的温度场分析[J]. 应用物理, 2018, 8(10): 439-447. https://doi.org/10.12677/APP.2018.810056

参考文献

[1] 赵建生. 断裂力学及断裂物理[M]. 华中科技大学出版社, 2003.
[2] 范天佑. 断裂理论基础[M]. 北京: 科学出版社, 2003.
[3] 余寿文. 断裂力学的历史发展与思考[J]. 力学与实践, 2015, 37(3): 390-394.
[4] Chen, B.X. and Zhang, X. (1988) Thermoelasticity Problem of an Orthotropic Plate with Two Collinear Cracks. International Journal of Fracture, 38, 161-192.
[5] Zhong, X.C. and Kang, Y.L. (2012) A Thermal-Medium Crack Model. Mechanics of Materials, 51, 110-117. [Google Scholar] [CrossRef
[6] Zhong, X.C., Wu, B. and Zhang, K.S. (2013) Thermally Conducting Col-linear Cracks Engulfed by Thermomechanical Field in a Material with Orthotropy. Theoretical and Applied Fracture Mechanics, 65, 61-68. [Google Scholar] [CrossRef
[7] Tsai, Y.M. (1984) Orthotropic Thermoelastic Problem of Uniform Heat Flow Disturbed by a Central Crack. Journal of Composite Materials, 18, 122-131. [Google Scholar] [CrossRef
[8] Chen, J., Soh, A.K., Liu, J., et al. (2004) Thermal Fracture Analysis of a Functionally Graded Orthotropic Strip with a Crack. International Journal of Mechanics & Materials in Design, 1, 131-141. [Google Scholar] [CrossRef
[9] Li, X.F. and Duan, X.Y. (2001) Closed-Form Solution for a Mode-III Crack at the Mid-Plane of a Piezoelectric Layer. Mechanics Research Communications, 28, 703-710. [Google Scholar] [CrossRef
[10] Itou, S. (2000) Thermal Stress Intensity Factors of an Infinite Orthotropic Layer with a Crack. International Journal of Fracture, 103, 279-291. [Google Scholar] [CrossRef
[11] 顾樵. 数学物理方法[M]. 北京: 科学出版社, 2012.
[12] Masjed-Jamei, M., et al. (2005) The First Kind Chebyshev CLobatto Quadrature Rule and Its Numerical Improvement. Applied Mathematics and Computation, 171, 1104-1118. [Google Scholar] [CrossRef
[13] Chen, J. (2005) Determination of Thermal Stress Intensity Factors for an Interface Crack in a Graded Orthotropic Coating-Substrate Structure. International Journal of Fracture, 133, 303-328. [Google Scholar] [CrossRef
[14] 路见可, 杜金元. 奇异积分方程的数值解法[J]. 数学进展, 1991(3): 278-293.
[15] Gradshteyn, I.S. and Ryzhik, I.M. (2007) In Table of Integrals, Series, and Products. Mathematics of Computation, 20, 1157-1160.

为你推荐