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基于三维弹性理论和压电理论,对材料系数按指数函数规律分布的功能梯度压电板条中的反平面运动裂纹问题进行了求解。利用Fourier积分变换方法将电绝缘型运动裂纹问题化为对偶积分方程,并进一步归结为易于求解的第二类Fredholm积分方程。通过渐近分析,获得了裂纹尖端应力、应变、电位移和电场的解析解,给出了裂纹尖端场各个变量的角分布函数,并求得了裂纹尖端场的强度因子,分析了压电材料物性梯度参数、几何尺寸及裂纹运动速度对它们的影响。结果表明,对于电绝缘型裂纹,功能梯度压电板条中运动裂纹尖端附近的各个场变量都具有-1/2阶的奇异性;当裂纹运动速度增大时,裂纹扩展的方向会偏离裂纹面。 相似文献
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功能梯度板条断裂分析 总被引:2,自引:0,他引:2
现存文献关于功能梯度材料断裂问题的研究大都假设材料性质为坐标的指数函数或幂函数,而对其它函数形式较少采用。本文假设功能梯度材料剪切模量为坐标的双曲函数,而泊松比为常量,研究功能梯度板条的混合型裂纹问题。利用Fourier积分变换技术将混合边值问题转化为一对奇异积分方程,通过数值求解奇异积分方程获得含裂纹功能梯度板条分别在剪切和法向载荷作用下的I型和Ⅱ型应力强度因子,并讨论了材料的非均匀性和裂纹相对尺寸对裂纹尖端应力强度因子的影响。 相似文献
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梯度材料中矩形裂纹的对偶边界元方法分析 总被引:2,自引:0,他引:2
采用对偶边界元方法分析了梯度材料中的矩形裂纹. 该方法基于层状材料基本解,以非裂纹边界的位移和面力以及裂纹面的间断位移作为未知量. 位移边界积分方程的源点配置在非裂纹边界上,面力边界积分方程的源点配置在裂纹面上. 发展了边界积分方程中不同类型奇异积分的数值方法. 借助层状材料基本解,采用分层方法逼近梯度材料夹层沿厚度方向力学参数的变化. 与均匀介质中矩形裂纹的数值解对比,建议方法可以获得高精度的计算结果. 最后,分析了梯度材料中均匀张应力作用下矩形裂纹的应力强度因子,讨论了梯度材料非均匀参数、夹层厚度和裂纹与夹层之间相对位置对应力强度因子的影响. 相似文献
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圆形域多圆孔多裂纹反平面问题研究 总被引:3,自引:0,他引:3
本文运用复变函数及积分方程方法,求解了圆形域多圆孔多裂纹反平面问题,建立了两种类型的基本解。复叠加原理和所得的基本解并沿国圆孔和裂纹表面取待定的基本解密度函数,可得到一组以基本解密度函数为未知函数的Fredholm积分方程。通过该积分方程组的数值可以得到密度函数的离散值,进而得到了裂纹尖端的应力强度因子。 相似文献
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现存文献关于梯度材料断裂问题的研究大都是假设材料参数为坐标的指数函数或幂函数,而其它函数形式较少采用.本文假设功能梯度材料剪切模量和密度的倒数均为坐标的线性函数,而泊松比为常量,研究功能梯度板条的反平面运动裂纹问题.利用Fourier积分变换技术和传递矩阵法将混合边值问题化为一对奇异积分方程,通过数值求解奇异积分方程获得板条运动裂纹在反平面载荷作用下的动态应力强度因子,并讨论了裂纹运动速度、裂纹相对尺寸、以及材料非均匀性对动态应力强度因子的影响,结果证明梯度参数、裂纹速度和几何尺寸对材料动态断裂行为有显著影响. 相似文献
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功能梯度材料涂层平面裂纹分析 总被引:3,自引:1,他引:3
研究粘接于均质基底材料上功能梯度涂层平面裂纹问题.
假设功能梯度材料剪切模量的倒数为坐标的线性函数,而泊松比为常数.
采用Fourier变换和传递矩阵法将该混合边值问题化为奇异积分方程组,通过数值求解获得
应力强度因子. 考察了材料梯度变化形式、结构几何尺寸和材料梯度参数对裂纹应力强度因子的影响,发现
功能梯度材料涂层尺寸、裂纹长度以及材料梯度参数均对应力强度因子有显著影响. 相似文献
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利用奇异积分方程方法研究两个半无限大的功能梯度压电压磁材料粘结,在渗透和非
渗透边界条件下的III型裂纹问题. 首先通过积分变换构造出原问题的形式解,然
后利用边界条件通过积分变换与留数定理得到一组奇异积分方程,
最后利用Gauss-Chebyshev方法进行数值
求解,讨论材料参数、材料非均匀参数以及裂纹几何形状等对裂纹尖端应力
强度因子的影响. 从结果中可以看出,压电压磁复合材料中反平面问题的应力奇异性
形式与一般弹性材料中的反平面问题应力奇异形式相同,但材料梯度参数对功能梯度压电压
磁复合材料中的应力强度因子和电位移强度因子有很大的影响. 相似文献
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The scattering of general SH plane wave by an interface crack between two dissimilar viscoelastic bodies is studied and the
dynamic stress intensity factor at the crack-tip is computed. The scattering problem can be decomposed into two problems:
one is the reflection and refraction problem of general SH plane waves at perfect interface (with no crack); another is the
scattering problem due to the existence of crack. For the first problem, the viscoelastic wave equation, displacement and
stress continuity conditions across the interface are used to obtain the shear stress distribution at the interface. For the
second problem, the integral transformation method is used to reduce the scattering problem into dual integral equations.
Then, the dual integral equations are transformed into the Cauchy singular integral equation of first kind by introduction
of the crack dislocation density function. Finally, the singular integral equation is solved by Kurtz's piecewise continuous
function method. As a consequence, the crack opening displacement and dynamic stress intensity factor are obtained. At the
end of the paper, a numerical example is given. The effects of incident angle, incident frequency and viscoelastic material
parameters are analyzed. It is found that there is a frequency region for viscoelastic material within which the viscoelastic
effects cannot be ignored.
This work was supported by the National Natural Science Foundation of China (No.19772064) and by the project of CAS KJ 951-1-20 相似文献
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Using the slender inclusion model developed earlier the elastostatic interaction problem between a penny-shaped crack and elastic fibers in an elastic matrix is formulated. For a single set and for multiple sets of fibers oriented perpendicularly to the plane of the crack and distributed symmetrically on concentric circles the problem is reduced to a system of singular integral equations. Techniques for the regularization and for the numerical solution of the system are outlined. For various fiber geometries numerical examples are given and distribution of the stress intensity factor along the crack border is obtained. Sample results showing the distribution of the fiber stress and a measure of the fiber-matrix interface shear are also included. 相似文献
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双材料中平片裂纹问题的超奇异积分方程解法 总被引:1,自引:0,他引:1
利用三维断裂力学的超奇异积分方程方法,对双材料空间中重直于界面的平片裂纹Ⅰ型问题进行了研究。首先根据双材料空间的弹性力学基本解,使用边界积分方程方法,在有限部积分的意义下导出了以裂纹面位罗间断为未知函数的超奇异积分方程,并为其建立了数值法。在此基础上,讨论了用裂纹面位移问题计算应力强度因子的方法。最后用此计算了几个典型的Ⅰ型下片裂纹问题的应力强度因子,其数值结果令人满意。 相似文献
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Wu Zhangjian Yu Shouwen 《Acta Mechanica Solida Sinica》1994,7(1):1-14
A detailed fracture mechanics analysis of bridge-toughening in a fiberreinforced composite is presented in this paper.The integral equation governing bridge-toughening as well as crack opening displacement (COD) for the composite withinterfacial layer is derived from the Castigliano's theorem and interface shear-lagmodel.A numerical result of the COD equation is obtained using the iteration solutionof the second Fredholm integral equation.In order to investigate the effect of variousparameters on the toughening,an approximate analytical solution of the equation ispresent and its error analysis is performed,which demonstrates the approximatesolution to be appropriate.A parametric study of the influence of the crack length,interracial shear modules,thickness of the interphase,fiber radius,fiber volumefraction and properties of materials on composite toughening is therefore carried out.The results are useful for experimental demonstration and toughening design includingthe fabrication process of the composite. 相似文献
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In this paper a solution is derived to treat the three-dimensional elastostatic problem of a narrow rectangular crack embedded in an infinite elastic medium and subjected to equal and opposite shear stress distribution across its faces. Employing two-dimensional integral transforms and assuming a plane-strain solution across the width of the crack, the stress field ahead of the crack length is reduced to the solution of an integral equation of Fredholm type. A numerical solution of the integral equation and the corresponding mode II stress-intensity factor is obtained for several crack dimensions and Poisson's ratios of the material. 相似文献
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The nonlinear fracture behavior of quasi-brittle materials is closely related with the cohesive force distribution of fracture process zone at crack tip. Based on fracture character of quasi-brittle materials, a mechanical analysis model of half infinite crack with cohesive stress is presented. A pair of integral equations is established according to the superposition principle of crack opening displacement in solids, and the fictitious adhesive stress is unknown function . The properties of integral equations are analyzed, and the series function expression of cohesive stress is certified. By means of the data of actual crack opening displacement, two approaches to gain the cohesive stress distribution are proposed through resolving algebra equation. They are the integral transformation method for continuous displacement of actual crack opening, and the least square method for the discrete data of crack opening displacement. The calculation examples of two approaches and associated discussions are give 相似文献
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应用有限部积分概念和广义位移基本解,垂直于磁压电双材料界面三维复合型裂纹问题被转
化为求解一组以裂纹表面广义位移间断为未知函数的超奇异积分方程问题. 进而,通过主部
分析法精确地求得裂纹尖端光滑点附近的奇性应力场解析表达式. 然后,通过将裂纹表面
位移间断未知函数表达为位移间断基本密度函数与多项式之积,使用有限部积分法对超奇异
积分方程组建立了数值方法. 最后,通过典型算例计算,讨论了广义应力强度因子的变化规
律. 相似文献
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《International Journal of Solids and Structures》2003,40(10):2473-2486
Using the hypersingular integral equation method based on body force method, a planar crack meeting the interface in a three-dimensional dissimilar materials is analyzed. The singularity of the singular stress field around the crack front terminating at the interface is analyzed by the main-part analytical method of hypersingular integral equations. Then, the numerical method of the hypersingular integral equation for a rectangular crack subjected to normal load is proposed by the body force method, which the crack opening dislocation is approximated by the product of basic density functions and polynomials. Numerical solutions of the stress intensity factors of some examples are given. 相似文献
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含界面相效应的纤维增强复合材料桥联增韧力学分析 总被引:7,自引:0,他引:7
本文对纤维增强复合材料桥联增韧进行了详细的断裂力学分析,基于Castigliano's定理和界面剪滞模型,得到了含界丰效应的复合材料桥联增专访和裂纹线开位移的控制议程;并按照第二类Fredholm积分方程的迭代解法,给出其数值结果,为例题于分析界面相参数对增韧效果的影响,寻求了该控制方程的近似解解析表达式,对近似解进行了误差估计,证明了解的可行性,在此基础上得到了界面剪切模量,裂纹长度。界面厚度, 相似文献