含裂縫異向性彈性板受彎矩作用之破壞力學分析

Yu-Yun Lee; 李侑昀

請用此 Handle URI 來引用此文件： http://tdr.lib.ntu.edu.tw/jspui/handle/123456789/53675

完整後設資料紀錄

DC 欄位	值	語言
dc.contributor.advisor	吳光鐘(Kuang-Chong Wu)
dc.contributor.author	Yu-Yun Lee	en
dc.contributor.author	李侑昀	zh_TW
dc.date.accessioned	2021-06-16T02:27:24Z	-
dc.date.available	2020-08-16
dc.date.copyright	2015-08-16
dc.date.issued	2015
dc.date.submitted	2015-08-04
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Rice, Slightly curved or kinked cracks, International Journal of Fracture 16, 155-169, 1980. [13] A. Frangi, Regularized BE formulations for the analysis of fracture in thin plates International Journal of Fracture, 84: 351–366, 1997. [14] Bing-Hua. Wu, F. Erdogan, The surface and through crack problems in orthotropic plates, International Journal of Solids and Structures, Volume 25, Issue 2, pp.167-188, 1989. [15] Binghua Wu, F. Erdogan, Fracture mechanics of orthotropic laminated plates—I. The through crack problem, International Journal of Solids and Structures, Volume 30, Issue 17, pp. 2357–2378, 1993. [16] T. Dirgantara, M.H. Aliabadi, Stress intensity factors for cracks in thin plates, Engineering Fracture Mechanics, 69, 1465–1486, 2002. [17] O. Tamate, Two arbitrarily situated cracks in an elastic plate under flexure. International Journal of Solids and Structures, 12, 287-298, 1975. [18] Delale, F. and Erdogan, F. The Problem of Internaland Edge Cracks in an Orthotropic Strip, Journal of Applied Mechanics, Vol. 44, No. 2, pp.237-242, 1977 [19] Wu, K. C. A new boundary integral equation method for analysis of cracked linear elastic bodies. Journal of the Chinese Institute of Engineers, Vol. 27, pp.937-941, 2004. [20] Hwu, C, Stroh-Like Formalism for the Coupled Stretching–Bending Analysis of Composite Laminates, International Journal of Solids and Structures, Vol. 40, pp. 3681, 2003. [21] Love, A. E. H., A Treatise on the Mathematical Theory of Elasticity, 3rd ed. (Cambridge U. P., 1920). [22] Erdogan, F. and Gupta, G. D. On the Numerical Solution of Singular Integral Equations, Quarterly of Applied Mathematics, Vol. 29, pp. 525-534, 1972. [23] Erdogan, F. On the stress distribution in plates with collinear cuts under arbitrary loads, in Proceedings of the 4th U.S. National Congress of Applied Mechanics, Vol. 1, pp. 547-553, The American Society of Mechanical Engineers, New York , 1962. [24] Isida, M. Bending of Plate Containing Arbitrary Array of Cracks. Trans. The Japan Society of Mechanical Engineers. Vol. 43, No. 367, pp. 825-837, 1997. [25] Isida, M. Interaction of arbitrary array of cracks in wide plates under classical bending: Mechanics of fracture Volume 3, Plates and shells with cracks, Edited by G. C. Sih, Noordhoff , pp 1-43, 1997. [26] Young , M. J. and Sun, C.T. On the strain energy release rate for a cracked plate subjected to out-of-plane bending moment, International Journal of Fracture 60. 227-247, 1993. [27] Wu, K. C. On the Crack-Tip Fields and Energy Release Rate of a Dynamically Propagating Crack in an Anisotropic Elastic Solid, International Journal of Fracture, Vol. 41, No. 4, pp. 253-266, 1989. [28] Perlman, A. B. and Sih, G. C. Circular-arc cracks in bimaterial plates under bending, International Journal of Fracture Mechanics, 3, pp. 193-206 ,1967. [29] Becker, W. Closed-form analytical solutions for a Griffith crack in a non-symmetric laminate plate. Composite structures, 21(1), 49-55, 1992. [30] Chattopadhyay, L. Analytical solution for an orthotropic elastic plate containing cracks. International Journal of Fracture, 134(3-4), 305-317, 2005. [31] Sih, G. C. and Rice, J. R. The bending of plates of dissimilar materials with cracks. Journal of Applied Mechanics, 31(3), 477-482, 1964. [32] Wu, K. C., Chiu, Y. T., and Hwu, Z. H., A New Boundary Integral Equation Formulation for Linear Elastic Solids, Journal of Applied Mechanics, Vol. 59, p. 344, 1992. [33] Wu, K. C., and Chen, C. T., Stress Analysis of Anisotropic Elastic V-Notched Bodies, International journal of solids and structures, Vol. 33, p. 2403, 1996. [34] Lu, P. Stroh type formalism for unsymmetric laminated plate. Mechanics research communications, 21(3), 249-254, 1994. [35] Ting, T. C. T. Anisotropic Elasticity – Theory and Applications, Oxford university Press, Oxford, UK., 1996. [36] Isida, M. Elastic Analysis of Cracks and Stress Intensity Factors, in Fracture Mechanics and Strength of Materials, vol. 2, Baifuukan, pp. 181-184. In Janpanese, 1976. [37] Isida, M. and Nakamura, Y. Edge cracks originating from an elliptical hole in a wide plate subjected to tension and in-plane shear, Transactions of the Japan Society of Mechanical Engineers. A 46:409, 947–956. In Japanese, 1980. [38] 鄧明浩, 異相彈狹長條內裂縫之分析, 國立台灣大學應用力學研究所碩士論文, 1996. [39] 蕭培需, 一個用於分析異向彈性彎曲問題的新邊界積分法, 國立台灣大學應用力學研究所碩士論文, 2014. [40] Chen, J. T. and Hong, H. K, Review of Dual Boundary Element Methods With Emphasis on Hypersingular Integrals and Divergent Series. Journal of Applied Mechanics. Rev 52(1), 17-33, 1999 [41] Roland, deWit. Theory of Disclinations: IV. Straight Disclinations. Journal of research of the Notional Bureau of Standards-A. Physics and Chemistry. Vol. 77A, No.5, 1973.
dc.identifier.uri	http://tdr.lib.ntu.edu.tw/jspui/handle/123456789/53675	-
dc.description.abstract	本文發展一種新的積分方程式，用於分析二維含裂縫異向性彈性板彎矩作用之問題上。此法的推導是先利用Stroh理論求得單一旋錯(disclination)的基本解，再利用旋錯會造成旋轉角不連續的特性，將受力矩作用的裂縫視為連續分佈的旋錯，來建構相關的積分方程式。該積分方程式可經由高斯-謝比雪夫積分法轉化為線性代數方程式求解。此法的優點是不論邊界條件、材料常數為何，其裂縫尖端之應力強度因子都可求得；即使在少數的積分點下，也可達到很高的精確性。本文之算例使用之材料有等向性與正交性兩種，計算的模型有單裂縫、雙裂縫、多裂縫、弧形裂縫之無限板受均勻力矩或剪力問題等，其中部分結果參考其他文獻之解析解，驗證其有效性與精確性。	zh_TW
dc.description.abstract	A new integral equation method is developed in this paper for the analysis of two-dimensional general anisotropic cracked elastic plates under bending. Integral equation are constructed by considering cracks as continuous distributions of disclination. Using Gauss-Chebyshev integration formulas, the integral equations can be transformed into the form of algebraic equations, with which the disclination densities and the stress intensity factors associated with each crack tip can be computed. An advantage of the method is that we can get the stress intensity factors regardless of the boundary conditions and material parameters. Another advantage is that accurate results may be obtained with relatively few integration points. Numerical examples are provided for isotropic or orthotropic plates with a single line or arc crack, double line cracks, multiple line cracks, under uniform bending, twisting moments or shearing force. The some results are compared with those in the literature whenever possible to verify their accuracy.	en
dc.description.provenance	Made available in DSpace on 2021-06-16T02:27:24Z (GMT). No. of bitstreams: 1 ntu-104-R02543001-1.pdf: 7560414 bytes, checksum: 221258393b158af660173e74e345934e (MD5) Previous issue date: 2015	en
dc.description.tableofcontents	致謝 i 中文摘要 ii ABSTRACT iii 目錄 iv 圖目錄 viii 表目錄 xiii 第1章導論 1 1.1 研究動機與文獻回顧 1 1.2 本文大綱 3 第2章薄板理論 4 2.1 古典板假設 4 2.2 應力應變關係 5 2.3 應變與位移關係 6 2.4 組成律 7 2.5 平衡方程式 9 2.6 統御方程式 9 第3章 Stroh理論 10 3.1 薄板之Stroh-Like理論 10 3.2 Stroh-Like理論之特性 15 第4章數值方法 18 4.1 旋錯（disclination）基本解 18 4.2 含多裂縫板之積分方程式 21 4.3 旋錯法與謝比雪夫多項式 23 4.4 應力強度因子計算 27 4.5 解析解 30 第5章數值方法 33 5.1 材料常數 33 5.1.1 等向性材料與正交性材料 33 5.2 水平單裂縫之無限板受均勻力矩與剪力 35 5.2.1 水平單裂縫之無限板受均勻扭矩與 35 5.2.2 水平單裂縫之無限板受均勻彎矩 37 5.2.3 水平單裂縫之無限板受均勻剪力 39 5.3 傾斜單裂縫之無限板受均勻力矩 41 5.3.1 傾斜單裂縫之無限板受均勻扭矩與 41 5.3.2 傾斜單裂縫之無限板受均勻彎矩 45 5.4 雙裂縫之無限板受均勻力矩 49 5.4.1 水平雙裂縫之無限板受均勻彎矩 49 5.4.2 傾斜雙裂縫之無限板受均勻彎矩 54 5.4.3 傾斜雙裂縫之無限板受均勻彎矩 58 5.4.4 傾斜雙裂縫之無限板受均勻扭矩與 62 5.4.5 修正常數 66 5.5 多裂縫之無限板受均勻力矩 68 5.5.1 三裂縫之無限板受均勻彎矩 68 5.5.2 三裂縫之無限板受均勻彎矩 71 5.5.3 三裂縫之無限板受均勻彎矩與 74 5.5.4 多裂縫之無限板受均勻彎矩與 76 5.5.5 多裂縫之無限板受均勻扭矩與 81 5.6 弧形裂縫之無限板受均勻力矩 87 5.6.1 弧狀裂縫之數值方法 87 5.6.2 弧狀裂縫之無限板受均勻彎矩與 88 5.6.3 弧狀裂縫之無限板受均勻扭矩與 92 第6章結論與未來展望 95 6.1 結論 95 6.2 未來展望 96 參考文獻 97
dc.language.iso	zh-TW
dc.subject	Stroh法	zh_TW
dc.subject	邊界積分法	zh_TW
dc.subject	裂縫	zh_TW
dc.subject	異向彈性板	zh_TW
dc.subject	anisotropic plates	en
dc.subject	Stroh-like formalism	en
dc.subject	boundary integral equations	en
dc.subject	cracks	en
dc.title	含裂縫異向性彈性板受彎矩作用之破壞力學分析	zh_TW
dc.title	Fracture Mechanics Analysis for Bending Problems of Anisotropic Plates with Cracks	en
dc.type	Thesis
dc.date.schoolyear	103-2
dc.description.degree	碩士
dc.contributor.oralexamcommittee	張正憲,陳正宗,陳俊杉,陳世豪
dc.subject.keyword	邊界積分法,裂縫,異向彈性板,Stroh法,	zh_TW
dc.subject.keyword	boundary integral equations,cracks,anisotropic plates,Stroh-like formalism,	en
dc.relation.page	101
dc.rights.note	有償授權
dc.date.accepted	2015-08-04
dc.contributor.author-college	工學院	zh_TW
dc.contributor.author-dept	應用力學研究所	zh_TW
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