桅杆结构纤绳拉耳任意形状孔边裂纹SIF计算
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摘要
给定形状裂纹的SIF(应力强度因子)可以通过各种数值方法确定,但裂纹扩展过程中裂纹形状不断发生变化,对任意时刻所对应的裂纹进行全三维分析确定裂纹前缘应力强度因子不现实且难以实现。通过采用有限元法事先计算各种不同形状、尺寸的桅杆结构纤绳连接拉耳孔边裂纹前缘表面点及最深点处的应力强度因子及无因次形状因子,然后对基本数据进行多参数拉格朗日插值的方法来求解拉耳任意形状孔边裂纹的应力强度因子。并对某一形状裂纹的应力强度因子插值计算结果与有限元直接分析结果进行了对比,结果表明插值法具有较高的可靠性,可用于应力强度因子的近似计算。
The stress intensity factor of any given shape crack can be determined by all kinds of numerical methods,but the shape of crack is changing during the period of propagation.It is a hard labor and could not be carried out easily to obtain the stress intensity factors of each time interval with 3-D dimensional analysis.This paper has calculated the stress intensity factors and no dimensional shape factors of the surface point and the depth point on the crack front of crack at hole of different shapes,sizes of ear plate for cable connecting ear plate on guyed mast structure.The stress intensity of any shape crack at hole can be acquired by the Lagrange interpolation method basing on those basic data.Moreover,a comparison for stress intensity factor has been made between the interpolation solution and the solution of finite element analysis for a certain shape crack at hole.The result shows that the interpolation method has a high reliability and can be used to calculate stress intensity factor similarly.
The stress intensity factor of any given shape crack can be determined by all kinds of numerical methods,but the shape of crack is changing during the period of propagation.It is a hard labor and could not be carried out easily to obtain the stress intensity factors of each time interval with 3-D dimensional analysis.This paper has calculated the stress intensity factors and no dimensional shape factors of the surface point and the depth point on the crack front of crack at hole of different shapes,sizes of ear plate for cable connecting ear plate on guyed mast structure.The stress intensity of any shape crack at hole can be acquired by the Lagrange interpolation method basing on those basic data.Moreover,a comparison for stress intensity factor has been made between the interpolation solution and the solution of finite element analysis for a certain shape crack at hole.The result shows that the interpolation method has a high reliability and can be used to calculate stress intensity factor similarly.
引文
[1]王肇民.桅杆结构[M].北京:科学出版社,2001.
[2]Fett T.Esti mation of Stress Intensity Factorsfor Semi-elliptical Surface Crack[J].Engineering Fracture Mechanics,2000,66:349-356.
[3]Nao-Aki Noda.Stress Intensity Formulas for Three-di mensional Cracks in Homogeneous and Bonded Dissi milar Materials[J].Engineering Fracture Mechanics,2003,71:1-15.
[4]Raju I S,Newman J C.Stress-intensity Factors for a Wide Range of Semi-elliptical Surface Cracks in Finite-thickness Plates[J].Engineering Fracture Mechanics,1979(11):817-829.
[5]吴学仁,黄新跃.受任意钉载圆孔边径向裂纹分析[J].航空学报,1998,9(9):434-439.
[6]陆山,黄其青.复杂载荷三维裂纹分析双重边界元法[J].力学学报,2002,34(5):715-725.
[7]谢伟,黄其青,殷之平.用推广的片条合成法求解工程复杂结构三维裂纹应力强度因子[J].机械强度,2004,26(S):192-194.
[8]刘金依,薛河,刘永军,等.三维中心裂纹板中J积分的计算及分析[J].西安科技学院学报,2002,22(1):91-94.
[9]瞿伟廉,鲁丽君,李明.工程结构疲劳裂纹最大应力强度因子计算[J].地震工程与工程振动,2007,27(6):58-63.
[10]瞿伟廉,鲁丽君,李明.带三维穿透裂纹结构的有限元实体建模方法[J].武汉理工大学学报,2008,30(1):87-90.
[11]中国航空研究院主编.应力强度因子手册[M].北京:科学出版社,1993.
[12]李庆芬,胡胜海,朱世范.断裂力学及其工程应用[M].哈尔滨工程大学出版社,1998.
[13]袁海庆,蒋沧如.有限单元法的理论与工程应用[M].武汉工业大学出版社,1997.
[2]Fett T.Esti mation of Stress Intensity Factorsfor Semi-elliptical Surface Crack[J].Engineering Fracture Mechanics,2000,66:349-356.
[3]Nao-Aki Noda.Stress Intensity Formulas for Three-di mensional Cracks in Homogeneous and Bonded Dissi milar Materials[J].Engineering Fracture Mechanics,2003,71:1-15.
[4]Raju I S,Newman J C.Stress-intensity Factors for a Wide Range of Semi-elliptical Surface Cracks in Finite-thickness Plates[J].Engineering Fracture Mechanics,1979(11):817-829.
[5]吴学仁,黄新跃.受任意钉载圆孔边径向裂纹分析[J].航空学报,1998,9(9):434-439.
[6]陆山,黄其青.复杂载荷三维裂纹分析双重边界元法[J].力学学报,2002,34(5):715-725.
[7]谢伟,黄其青,殷之平.用推广的片条合成法求解工程复杂结构三维裂纹应力强度因子[J].机械强度,2004,26(S):192-194.
[8]刘金依,薛河,刘永军,等.三维中心裂纹板中J积分的计算及分析[J].西安科技学院学报,2002,22(1):91-94.
[9]瞿伟廉,鲁丽君,李明.工程结构疲劳裂纹最大应力强度因子计算[J].地震工程与工程振动,2007,27(6):58-63.
[10]瞿伟廉,鲁丽君,李明.带三维穿透裂纹结构的有限元实体建模方法[J].武汉理工大学学报,2008,30(1):87-90.
[11]中国航空研究院主编.应力强度因子手册[M].北京:科学出版社,1993.
[12]李庆芬,胡胜海,朱世范.断裂力学及其工程应用[M].哈尔滨工程大学出版社,1998.
[13]袁海庆,蒋沧如.有限单元法的理论与工程应用[M].武汉工业大学出版社,1997.
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