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周期张开型平行裂纹问题研究 被引量:6

STUDY ON THE PROBLEM OF PERIODIC OPEN TYPE PARALLEL CRACKS
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摘要 研究无限介质中周期平行裂纹问题,利用复应力函数在集中载荷作用点和裂纹尖端的奇异性分析及双曲函数的周期性质,求得了问题在远场作用均匀载荷时裂纹尖端应力强度因子的闭合形式解,所得结果与已有的数值解吻合较好,说明了所构造复应力函数的合理性.其结果对于研究多裂纹的干涉作用以及结构和材料的强度设计提供了有意义的参考. Periodic parallel cracks in an infinite medium under far-field inplane tensile stress are investigated. By using the singular analysis of the complex stress function at the concentrated load point and the tips of cracks, as well as combining periodicity of the hyperbolic function, a closed form solution of the stress intensity factor to the problem is obtained. A comparison of the present solution with existing numerical results shows a good agreement, which indicates the validity of the complex stress function. The present Solution can be used to study the interaction of multi-cracks and the structural integrity assessment.
作者 肖俊华 蒋持平
机构地区 北京航空航天大学固体力学研究所
出处 《力学学报》 EI CSCD 北大核心 2007年第2期278-282,共5页 Chinese Journal of Theoretical and Applied Mechanics
基金 国家自然科学基金(10672008) 航空科学基金(04G51050)资助项目.~~
关键词 周期裂纹 平行裂纹 张开型 应力强度因子 双曲函数 periodic crack, parallel crack, opening type, stress intensity factor, hyperbolic function
分类号 O343.7 [理学—固体力学] O346.1 [理学—固体力学]
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参考文献13

  • 1Pak YE. Goloubeva E. Electroelastic properties of cracked piezoelectric materials under longitudinal shear. Mechanics of Materials, 1996, 24(4): 287-303
  • 2Tong ZH, Jiang CP, Lo SH, et al. A closed form solution to the antiplane problem of doubly periodic cracks of unequal size in piezoelectric materials. Mechanics of Materials, 2005, 2006, 38(4): 269-286
  • 3Hao TH. An exact elastic-perfect plastic solution of antiplane parallel periodical crack field. Engineering Fracture Mechanics, 1987, 26(1): 59-63
  • 4Hao TH. An exact solution of the anti-plane parallel periodical transverse crack field in a bimaterial infinite plane. International Journal of Fracture, 1991, 47(3): R49-R51
  • 5Sanada K, Shindo Y, Ueda S. Stress intensity factors for glass-fiber reinforced plastics with an infinite row of parallel cracks at low temperatures. Theoretical and Applied Fracture Mechanics, 1998, 28(3): 183-196
  • 6陈宜周.周期裂纹削弱的无限长板条的应力分析[J].应用数学和力学,2004,25(11):1189-1194. 被引量:2
  • 7Delameter WR, Herrman G, Barnett DM. Weakening of an elastic solid by a rectangular array of cracks. ASME Journal of Applied Mechanics, 1975, 42(1): 74-80
  • 8Karihaloo BL. Fracture of solids containing arrays of cracks. Engineering Fracture Mechanics, 1979, 12(1): 49-77
  • 9Chen YZ, Lin XY. Periodic group crack problems in an infinite plate. International Journal of Solids and Structure,2005, 42(9-10): 2837-2850
  • 10中国航圣研究院.应力强度因子手册.北京:科学出版社,1993

二级参考文献14

  • 1Savruk M P. Two-dimensional Problems of Elasticity.for Body with Cracks [M]. Kiev: Nauka Dumka, 1981.
  • 2CHEN Yi-zhou. A survey of new integral equations in plane elasticity crack problem[J]. Engng Fract Mech, 1995,51(5) :387-394.
  • 3CHEN Yi-zhou , Lee K Y. An infinite plate weakened by periodic cracks[J]. J Appl Mech , 2002 , 69 ( 3 ) :552-555.
  • 4Isida M, Usijima N, Kishine N. Rectangular plate, strips and wide plates containing internal cracks under various boundary conditions[J]. Trans Japan Soc Mech Engrs, 1981,47:27-35.
  • 5Delameter W R, Herrmann G, Barnett D M. Weakening of elastic solid by a rectangular array of cracks[ J]. J Appl Mech, 1975,42(1) :74-80.
  • 6Parton V Z, Perlin P I. Integral Equations in Elasticity [M]. Moscow: Mir, 1982.
  • 7Benthem J P, Koiter W T. Asymptotic approximations to crack problems[A]. In: G C Sih Ed. Mechanics of Fracture [ C ]. 1973,1: 131 - 178.
  • 8Huang Y, Hu K X, Chandra A. Stiffness evaluation for solids containing dilute distributions of inclusions and microcracks[J]. J Appl Mech, 1995,62( 1 ) :71-77.
  • 9Kachanov M. Elastic solids with many cracks and related problems [A]. In: J W Hutchinson, T Wu Eds . Advances in Applied Mechanics [ C]. 1993,30:259-445.
  • 10CHEN Yi-zhou. An investigation of the stress intensity factor for a finite internally cracked plate by using variational method [J]. Engng Fract Mech, 1983,17 (5): 387-394.

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力学学报
2007年 第2期

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