焊接残余应力平板多个共面表面裂纹的应力强度因子

采用线弹簧模型求解含焊接残余应力平板多个共面任意分布表面裂纹的应力强度因子.利用边裂纹权函数给出了裂纹表面上沿厚度非线性分布的残余应力向线性分布的转化公式.基于Reissner板理论和连续分布位错思想,将含多个共面任意分布表面裂纹的无限平板问题归结为一组Cauchy型奇异积分方程,并采用Gauss-Chebyshev方法获得了奇异积分方程的数值解.以三共面表面裂纹为例,计算了表面裂纹的应力强度因子,并讨论了裂纹间距、裂纹几何形状等因素对应力强度因子的影响.     

磁电热弹耦合材料三维多裂纹超奇异积分法

用超奇异积分方程法将多场耦合载荷作用下磁电热弹耦合材料内含任意形状和位置三维多裂纹问题转化为求解一以广义位移间断为未知函数的超奇异积分方程组问题,退化得到内含任意形状平行三维多裂纹问题的超奇异积分方程组;推导出平行三维多裂纹问题的裂纹前沿广义奇异应力场解析表达式、定义了广义(应力、应变能)强度因子和广义能量释放率;应用有限部积分概念及体积力法,为超奇异积分方程组建立了数值求解方法,编制了FORTRAN程序,以平行双裂纹为例,通过典型算例,研究了广义(应力、应变能)强度因子随裂纹位置、裂纹形状及材料参数变化规律,得到裂纹断裂评定准则. 最后,分析了裂纹间干扰、屏蔽作用及其在工程实际中的应用.      

周期张开型平行裂纹问题研究

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 因子的精确闭合形式解，并与已有的数值结果进行了比较. 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具有重要的实用价值.     

论侧向应力与疲劳裂纹扩展

本文通过对Ⅰ型平裂纹及复合型斜裂纹的疲劳试验说明:虽然平行于裂纹面的正应力(侧向应力)对应力强度因子不起作用,但是对裂纹顶端的塑性变形,从而对疲劳裂纹扩展速率却有明显的影响.相应于同样的应力强度因子幅值,当双轴载荷比λ=1时,侧向应力为零,裂纹扩展最慢;随着λ值减小,裂纹扩展速率增大.因此,在估算疲劳寿命时,如果只考虑应力强度因子幅值的作用,而忽略实验加载条件和实际加载条件下侧向应力差别的影响,必然会带来较大的误差,甚至是不安全的.     

平行于功能梯度材料夹层的币型裂纹起裂条件

分析了功能梯度材料中币型裂纹的扩展问题．裂纹平行于无限域中功能梯度材料夹层,受有与裂纹面成任意角度的拉应力．假定功能梯度材料夹层与两个半无限域均匀介质完全粘合,其弹性模量沿厚度方向变化．采用基于层状材料广义Kelvin基本解的边界元方法分析裂纹问题,给出了均布正应力和剪应力作用下裂纹的应力强度因子、将应力强度因子耦合于应变能密度断裂判据,讨论了裂纹体在拉伸应力作用下的起裂条件．     

压电体内孔边裂纹的应力强度因子

本文研究含有Ⅲ型孔边裂纹压电弹性体的反平面问题.根据Muskhelishvili的数学弹性力学理论,并利用保角变换和Cauchy积分的方法,对含有圆孔孔边单裂纹和双裂纹的压电弹性体分别进行了分析.基于电不可穿透裂纹模型,得到了在反平面剪力和面内电载荷的共同作用下裂纹尖端应力强度因子的解析解.最后,通过数值算例,讨论了应力强度因子随裂纹长度变化的规律.结果表明:应力强度因子随着裂纹和孔的相对尺寸的增加而增加,并且单边裂纹的应力强度因子要比双边裂纹的应力强度因子大.     

表面荷载作用下半无限层状介质中的裂纹分析

分析了半无限层状介质中的正方形裂纹。层状材料的层面互相平行,外部荷载作用在边界面上,正方形裂纹平行于层面。基于Yue基本解的数值方法和线弹性断裂力学叠加原理,首先采用一种数值方法获得无裂纹半无限层状介质的应力场,然后将计算得到的应力按叠加原理施加在裂纹面上,并采用另一种数值方法计算此情形下裂纹面的间断位移,最后采用裂纹面的间断位移计算应力强度因子。结果显示:I型和II型应力强度因子的变化与裂纹所处的位置关系密切;层状介质中的裂纹张开和滑移受到不同介质存在的影响,进而影响到裂纹的应力强度因子。建议的数值方法可用于分析复杂荷载作用下层状介质中裂纹的断裂力学特性。     

估算裂纹应力强度因子的新方法

根据裂纹形状与裂纹尖端应力强度因子分布之间的固有关系，在线弹性断 裂力学条件下，提出了一种按已知I型裂纹应力强度因子分布规律求裂纹形状及相应应力强 度因子的无梯度迭代法. 通过有限厚度、有限宽度板穿透裂纹和表面裂纹的数值模拟实例验 证了所提出方法的有效性和实用性，并对不同应力强度因子分布规律对裂纹形状以及相应的 应力强度因子大小的影响进行了分析和讨论. 所提出的方法有助于提高实际扩展裂纹应 力强度因子的估算精度以及更合理地预测疲劳裂纹形状演化.     

三维无限体中两平行平片裂纹相互干扰的超奇异积分方程解法

本文利用三维断裂力学的超奇异积分方程求解理论，对三维无限体中两平行平片裂纹在任意载荷作用下的相互干扰问题作了研究。首先导出了以裂纹面移间断（位借）为未知函数的超奇异积分方程组，然后为其建立了有限积分边界元法；在此基础上，讨论用了裂纹面位移间断计算应力强度因子的方法，最后用此计算了两平行平片裂纹的相对位置对裂前沿应力强度因子的影响，其数值结果令人满意。     

各向异性双材料界面裂纹扩展裂尖场

应用界面断裂力学理论和Stroh方法,研究了广义平面变形下动态裂纹沿着各向异性双材料界面扩展时的裂尖奇异应力及动态应力强度因子.双材料界面的动态裂尖区域特性主要由两个实矩阵W和D确定,且裂尖奇异应力和动态应力强度因子可以由包含这两个矩阵的柯西奇异积分方程确定,同时给出了动态应力强度因子和能量释放率的显示表达式.算例得出当裂纹以小速度扩展时,裂尖振荡因子ε与静态时几乎相同,当界面裂纹扩展速度接近瑞利波速时,ε趋于无穷大;同时得出应力强度因子及能量释放率随裂纹扩展速度的变化关系.     

Analysis of three-dimensional edge cracks under tensile loading

Three-dimensional edge cracks are analyzed using the Self-Similar Crack Expansion (SSCE) method with a boundary integral equation technique. The boundary integral equations for surface cracks in a half space are presented based on a half space Green's function (Mindlin, 1936). By using the SSCE method, the stress intensity factors are determined by the crack-opening displacement over the crack surface. In discrete boundary integral equations, the regular and singular integrals on the crack surface elements are evaluated by an analytical method, and the closed form expressions of the integrals are given for subsurface cracks and edge crakcs. This globally numerical and locally analytical method improves the solution accuracy and computational effort. Numerical results for edge cracks under tensile loading with various geometries, such as rectangular cracks, elliptical cracks, and semi-circular cracks, are presented using the SSCE method. Results for stress intensity factors of those surface breaking cracks are in good agreement with other numerical and analytical solutions.     

Extended meshless method based on partition of unity for solving multiple crack problems

An extended meshless method based on partition of unity was used in this study to simulate multiple cracks. The cracks are implicitly denoted by a jump in the displacement field function, which has nodes that have domains of influence completely segmented by cracks. Nodes whose domains of influence are partially segmented by cracks are extended by the crack tip singularity function. The influence domain of a node is independent of cracks so that the sparsity of the system equations should not be affected by cracks and the computing time should not increase with the effect of the cracks. Additionally, r ^?1/2 singularity can be accurately reproduced at the crack tip. Compared with the modified intrinsic enriched meshless method, our method has a higher computational efficiency and precision. Several numerical examples show that the extended meshless method based on partition of unity is feasible and effective in simulating multiple cracks.     

爆炸荷载作用下模型介质裂纹扩展试验与分析

为研究爆炸载荷作用下裂隙介质裂纹扩展规律,以含人工裂隙的有机玻璃薄板为介质,分别以炮孔中心到人工裂隙垂直距离L和人工裂隙长度D为变量,采用单发雷管爆炸加载试验模型进行试验。试验结果表明,爆炸荷载作用将使裂隙介质形成径向裂纹、翼裂纹、层裂裂纹和似层裂裂纹;人工裂隙能够阻隔径向裂纹的扩展,径向裂纹的扩展对距离L比长度D更敏感;翼裂纹是爆炸绕射波或绕射波与压缩应力波共同作用产生的,翼裂纹的长度随距离L增加而降低;入射压缩应力波与反射拉伸应力波叠加形成的净拉伸应力拉裂介质形成层裂效应、引起径向裂纹弯曲形成似层裂效应,层裂裂纹和似层裂裂纹几乎平行于人工裂隙。研究结果可为裂隙岩体爆破设计、冲击矿压防治和结构工程防护等提供理论依据。     

Automated numerical simulation of the propagation of multiple cracks in a finite plane using the distributed dislocation method

In this paper, an automated numerical simulation of the propagation of multiple cracks in a finite elastic plane by the distributed dislocation method is developed. Firstly, a solution to the problem of a two-dimensional finite elastic plane containing multiple straight cracks and kinked cracks is presented. A serial of distributed dislocations in an infinite plane are used to model all the cracks and the boundary of the finite plane. The mixed-mode stress intensity factors of all the cracks can be calculated by solving a system of singular integral equations with the Gauss–Chebyshev quadrature method. Based on the solution, the propagation of multiple cracks is modeled according to the maximum circumferential stress criterion and Paris' law. Several numerical examples are presented to show the accuracy and efficiency of this method for the simulation of multiple cracks in a 2D finite plane.     

Thermal stresses in a solid containing parallel circular cracks

This paper presents an analysis of the steady-state thermal stresses and displacements in an infinite elastic medium containing two or more parallel coaxial circular cracks. A “perturbation” technique is employed to reduce the problem of finding the temperature and the induced stresses to integral equations of Fredholm type which may be solved by numerical means or iterations. Two types of prescribed thermal conditions are considered. The first is concerned with a uniform flow of heat disturbed by insulated cracks and the second deals with stress-free cracks whose surfaces are exposed to identical amounts of heat. The details of the analysis are illustrated by considering the case of two cracks symmetrically located about the mid plane of the solid. When the cracks are of equal radii, iterative solutions of the governing integral equations are derived and used to determine expressions for the stress-intensity factors (opening and edge-sliding modes), displacements of crack surfaces and other quantities of physical interest which are valid for widely spaced cracks.     

Modeling non-collinear mixing by distributions of clapping microcracks

Nonlinear scattering by distributions of clapping cracks in a non-collinear wave mixing setting is modeled. Features of the nonlinear response discriminating distributions of clapping cracks from quadratic nonlinear damage are investigated for distributions of cracks that are parallel to each other or randomly oriented. The effective properties of these distributions are recovered extending an existing model that applies to open cracks. The equation of motion is solved using a perturbation approach, and its solutions are evaluated numerically. Their dependence on the amplitude of the incident field is found to be linear, in contrast with the quadratic dependence characterizing quadratic nonlinearity. The spectrum of the scattered field is shown to contain an infinite number of higher harmonics already at the first order of perturbation. Grating-like structures due to the opening and closing of cracks are responsible for adding diffraction peaks to the directivity functions of waves scattered by open cracks. The locations of the most prominent peaks of these functions do not satisfy the selection rules controlling nonlinear scattering by quadratic nonlinearity. Examples of these are given, together with others showing the possibility of using at least one of several discrimination modalities offered by non-collinear wave mixing.     

Effective elastic moduli of an inhomogeneous medium with cracks

In the present paper, the effective elastic moduli of an inhomogeneous medium with cracks are derived and obtained by taking into account its microstructural properties which involve the shape, size and distribution of cracks and the interaction between cracks. Numerical results for the periodic microstructure of different dimensions are presented. From the results obtained, it can be found that the distribution of cracks has a significant effect on the effective elastic moduli of the material. The project supported by the National Education Committee for Doctor     

冻土破坏过程的微裂纹损伤区的计算分析

对冻土破坏过程进行了试验研究，冻土破坏的过程是微裂纹损伤与临界串接的演化过程，确认了冻土微裂纹损伤区的存在，并分别用莫尔准则和最大拉应力准则建立了微裂纹损伤区计算模式。将微裂纹损伤区按缺陷处理并简化为当量裂纹，进行了裂纹尺寸的定量计算，结果表明其尺寸与冻土中初始裂纹尺寸相当，将计算结果与观测结果相比较，误差不超过10％。     

Dynamic stress intensity factors around two rectangular cracks in an infinite elastic plate under impact load

A dynamic problem for two equal rectangular cracks in an infinite elastic plate is considered. The two cracks are placed perpendicular to the plane surfaces of the plate. An incoming shock tensile stress is returned by the cracks. In the Laplace transform domain, the boundary conditions at the two sides of the plate are satisfied using the Fourier transform technique. The mixed boundary conditions are reduced to dual integral equations. Crack displacement is expanded in a series of functions which are zero outside of the cracks. The unknown coefficients in the series are determined by the Schmidt method. The stress intensity factors are defined in the Laplace transform domain and these are inverted using a numerical method.     

3D dynamic stress intensity factors at three rectangular cracks in an infinite elastic medium subjected to a time-harmonic stress wave

Summary Dynamic stresses around three coplanar cracks in an infinite elastic medium are determined in the paper. Two of the cracks are equal, rectangular and symmetrically situated on either side of the centrally located rectangular crack. Time-harmonic normal traction acts on each surface of the three cracks. To solve the problem, two kind of solutions are superposed: one is a solution for a rectangular crack in an infinite elastic medium, and the other one is that for two rectangular cracks in an infinite elastic medium. The unknown coefficients in the combined solution are determined by applying the boundary conditions at the surfaces of the cracks. Finally, stress intensity factors are calculated numerically for several crack configurations. Received 14 July 1998; accepted for publication 2 December 1998