功能梯度条硬币型裂纹扭转冲击响应

冯文杰; 李向国; 王守东

功能梯度条硬币型裂纹扭转冲击响应

1.
石家庄铁道学院力学与工程科学系,石家庄 050043;2.石油大学资源与信息学院,北京 102200

基金项目: 国家自然科学基金资助项目(19772029);河北省博士基金资助项目(B2001213)

详细信息

作者简介:
冯文杰(1967- ),男,河北泊头人,教授,博士(联系人.Tel:+86-311-7936543;Fax:+86-311-7936541;E-mail:fengwj@sjzri.edu.cn).

中图分类号: O346.1
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出版历程
- 收稿日期: 2003-01-19
- 修回日期: 2004-07-06
- 刊出日期: 2004-12-15

Torsional Impact Response of a Penny-Shaped Crack in a Functional Graded Strip

1.
Department of Mechanics and Engineering Science, Shijiazhuang Railway Institute, Shijiazhuang 050043, P. R. China;

摘要

摘要: 研究非均匀条中硬币型裂纹的扭转冲击问题．材料的剪切模量假定按特定的梯度变化．采用Laplace 和Hankel 变换将问题化为求解Fredholm积分方程，通过将Bessel函数渐进展开获得裂纹尖端动态应力场．考查非均匀参数和功能梯度条高度对裂尖动态断裂行为的影响．动应力强度因子和能量密度因子的清晰表达式表明，作为裂纹扩展力，对于这里所研究的问题，二者是等价的．动应力强度因子的数值结果显示，增加剪切模量的非均匀参数可以抑制动应力强度因子的幅度，而条形域的高度对动态断裂特性的影响较小．
- 动应力强度因子 /
- 扭转冲击 /
- 硬币型裂纹 /
- 功能梯度条 /
- 积分变换 /
- 能量密度因子
Abstract: The torsional impact response of a penny-shaped crack in a nonhomogeneous strip is considered.The shear modulus is assumed to be functionally graded such that the mathematics is tractable.Laplace and Hankel transforms were used to reduce the problem to solving a Fredholm integral equation.The crack tip stress field is obtained by considering the asymptotic behavior of Bessel function.Explicit expressions of both the dynamic stress intensity factor and the energy density factor were derived.And it is shown that,as crack driving force,they are equivalent for the present crack problem.Investigated are the effects of material nonhomogeneity and strip's highness on the dynamic fracture behavior.Numerical results reveal that the peak of the dynamic stress intensity factor can be suppressed by increasing the nonhomogeneity parameter of the shear modulus,and that the dynamic behavior varies little with the adjusting of the strip's highness.
- dynamic stress intensity factor /
- torsional impact /
- penny-shaped crack /
- functionally graded strip /
- integral transform /
- energy density factor

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参考文献(7)

[1]	Erdogan F. The crack problem for bonded nonhomogeneous materials under antiplane shear loading[J].ASME Journal of Applied Mechanics,1985,52(4):823—828. doi: 10.1115/1.3169153
[2]	Gerasoulis A, Srivastav R P. A Griffith crack problem for a nonhomogeneous medium[J].Internat J Engrg Sci,1980,18(2):239—247. doi: 10.1016/0020-7225(80)90023-3
[3]	Konda N, Erdogan F. The mixed-mode crack problem in a nonhomogeneous elastic medium[J].Engineering Fracture Mechanics,1994,47(4):533—545. doi: 10.1016/0013-7944(94)90253-4
[4]	Li C Y, Zou Z Z. Local stress field for torsion of a penny-shaped crack in a functionally graded material[J].Internat J Fracture,1998,91(2):L17—L22.
[5]	李春雨, 邹振祝, 段祝平. 功能梯度材料裂纹尖端动态应力场[J]. 力学学报,2001,33(2):270—274.
[6]	Copson E P. On certain dual integral equations[J].Proceedings Glasgow Mathematical Association,1961,5:19—24.
[7]	Zuo J Z, Sih G C. Energy density theory formulation and interpretation of cracking behavior for piezoelectric ceramics[J].J Theoret Appl Fracture Mech,2000,34(1):17—33. doi: 10.1016/S0167-8442(00)00021-5

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功能梯度条硬币型裂纹扭转冲击响应

作者简介:
冯文杰(1967- ),男,河北泊头人,教授,博士(联系人.Tel:+86-311-7936543;Fax:+86-311-7936541;E-mail:fengwj@sjzri.edu.cn).

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Torsional Impact Response of a Penny-Shaped Crack in a Functional Graded Strip

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功能梯度条硬币型裂纹扭转冲击响应

作者简介: 冯文杰(1967- ),男,河北泊头人,教授,博士(联系人.Tel:+86-311-7936543;Fax:+86-311-7936541;E-mail:fengwj@sjzri.edu.cn).

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出版历程

Torsional Impact Response of a Penny-Shaped Crack in a Functional Graded Strip

计量

出版历程

目录

作者简介:
冯文杰(1967- ),男,河北泊头人,教授,博士(联系人.Tel:+86-311-7936543;Fax:+86-311-7936541;E-mail:fengwj@sjzri.edu.cn).