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功能梯度条共线Griffith裂纹反平面剪切冲击 总被引:1,自引:1,他引:1
研究正交各向异性功能梯度条中多个共线Griffith裂纹的反平面剪切冲击问题.材料两个方向的剪切模量假定按比例同时以特定的梯度变化.采用Laplace和Fourier变换及引进位错密度函数将问题化为求解Cauchy奇异积方程,进而化为代数方程数值求解.考查材料非均匀性、正交性和功能梯度条高度对裂尖动态断裂特性的影响.动应力强度因子的数值结果显示:增加剪切模量的梯度和(或)增加垂直于裂纹面方向的剪切模量,可以抑制动应力强度因子的幅度;若功能梯度条较薄,增大条形域的高度也可抑制裂纹扩展. 相似文献
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本文研究了位于界面相中的圆柱形界面裂纹的扭转冲击问题.采用Laplace、Fourier变换和位错密度函数将混合边值问题转化为求解Cauchy核奇异积分方程,利用Laplace数值反演技术计算了动态应力强度因子.讨论了材料特性和结构的几何尺寸对动态应力强度因子的影响.结果表明,随着界面相厚度的增加,无量纲化的动态应力强度因子减小.当裂纹靠近剪切弹性模量大的材料时,无量纲化的动态应力强度因子增大,反之减小.界面相两侧不同的材料组合对裂尖动态应力强度因子的影响是随着剪切弹性模量和质量密度的比值的增加而减小.界面相中裂纹长度对裂尖动态应力强度因子的影响比其他因素的影响大. 相似文献
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研究多个纵向环形界面裂纹的P波散射问题.以裂纹面的位错密度函数为未知量,利用Fourier积分变换,将问题归结为第二类奇异积分方程,然后通过数值求解,获得裂纹尖端的动应力强度因子.最后给出了双裂纹动应力强度因子随入射波频率变化的关系曲线. 相似文献
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本文研究了含非完整界面的功能梯度压电复合材料的Ⅲ型裂纹问题.此裂纹垂直于非完整界面,采用弹簧型力电耦合界面模型模拟非完整界面.界面两侧材料的性质,如弹性模量、压电常数和介电常数均假定呈指数函数形式且沿着裂纹方向变化.运用积分变换法将裂纹面条件转换为奇异积分方程,并使用Gauss-Chebyshev方法对其进行数值求解.根据算例结果讨论了一些退化问题并分析了裂纹尖端强度因子与材料的非均匀系数和非完整界面参数的关系. 相似文献
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功能梯度双材料弱/微间断界面的冲击断裂分析 总被引:1,自引:0,他引:1
提出强间断、弱间断、微间断和全连续界面的概念与分类,建立功能梯度弹性双材料弱间断
界面冲击断裂问题的力学模型,采用积分变换法推导问题的Cauchy奇异积分方程,并用配
点法求得数值解. 分析表明,弱/微间断性对于FGMs界面裂纹应力强度因子有着重要影响,
而且微间断性是优于弱间断性的一种界面力学性能连接关系. 以FGMs界面某一侧
的力学性能函数在界面处的Taylor展开式的低阶项作为界面另一侧的力学性能函数,便可
以使FGMs界面成为``微间断'界面. 界面的一阶微间断对应力强度因子的减小作用较为明
显,而高阶(二阶及以上)微间断对应力强度因子的影响较小. 减小界面的弱间断程度或使
FGMs界面具备``微间断性',都将利于提高功能梯度双材料界面抗冲击断裂能力,在一定
程度上达到界面增韧的目的. 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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研究反平面载荷作用下压电/压磁双材料的周期界面裂纹问题,压电/压磁双材料由有限厚度的功能梯度压电层和功能梯度压磁层粘结而成.为便于分析,假设压电层和压磁层的材料性质沿着裂纹的法线方向呈指数变化,基于分离变量和Hilbert核奇异积分方程方法,获得应力强度因子的数值解.数值算例讨论层厚、周期带长度、梯度参数以及材料参数变动等对应力强度因子的影响.结果发现层厚以及裂纹间距的增大会降低裂纹尖端应力强度因子,梯度参数的改变对应力强度因子也有显著的影响.材料参数变动的讨论发现弹性参数的变动对应力强度因子影响最大,其次为电参数,磁参数的变动对应力强度因子影响最小. 相似文献
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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. 相似文献
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This paper provides a method for studying the penny-shaped cracks configuration in functionally graded material(FGM) structures
subjected to dynamic or steady loading. It is assumed that the FGMs are transversely isotropic and all the material properties
only depend on the axial coordinatez. In the analysis, the elastic region is treated as a number of layers. The material properties are taken to be constants
for each layer. By utilizing the Laplace transform and Hankel transform technique, the general solutions for the layers are
derived. The dual integral equations are then obtained by introducing the mechanical boundary and layer interface conditions
via the flexibility/stiffness matrix approach. The stress intensity factors are computed by solving dual integral equations
numerically in Laplace transform domain. The solution in time domain is obtained by utilizing numerical Laplace inverse. The
main advantage of the present model is its ability for treating multiple crack configurations in FGMs with arbitrarily distributed
and continuously varied material properties by dividing the FGMs into a number of layers with the properties of each layer
slightly different from one another.
This work was supported by Failure Mechanics Laboratory of State Education Commission and the Post-doctor Research Fund of
China. 相似文献
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The dynamic interaction of two collinear interface cracks between two dissimilar functionally graded piezoelectric/piezomagnetic material strips subjected to the anti-plane shear harmonic stress waves was investigated. By using the Fourier transform, the problem can be solved with the help of a pair of triple integral equations in which the unknown variable is jump of displacement across the crack surfaces. These equations are solved using the Schmidt method. Numerical examples are provided to show the effect of the functionally graded parameter, the circular frequency of the incident waves and the thickness of the strip upon stress, electric displacement and magnetic flux intensity factors of cracks. 相似文献
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The problem of a Griffith crack in an unbounded orthotropic functionally graded material subjected to antipole shear impact was studied. The shear moduli in two directions of the functionally graded material were assumed to vary proportionately as definite gradient. By using integral transforms and dual integral equations, the local dynamic stress field was obtained. The results of dynamic stress intensity factor show that increasing shear moduli’s gradient of FGM or increasing the shear modulus in direction perpendicular to crack surface can restrain the magnitude of dynamic stress intensity factor. 相似文献
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The problem of a penny-shaped interface crack between a functionally graded piezoelectric layer and a homogeneous piezoelectric
layer is investigated. The surfaces of the composite structure are subjected to both mechanical and electrical loads. The
crack surfaces are assumed to be electrically impermeable. Integral transform method is employed to reduce the problem to
a Fredholm integral equation of the second kind. The stress intensity factor, electric displacement intensity factor and energy
release rate are derived, some typical numerical results are plotted graphically. The effects of electrical loads, material
nonhomogeneity and crack configuration on the fracture behaviors of the cracked composite structure are analyzed in detail. 相似文献
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In the present paper dynamic stress intensity factor and strain energy density factor of multiple cracks in the functionally graded orthotropic half-plane under time-harmonic loading are investigated. By utilizing the Fourier transformation technique the stress fields are obtained for a functionally graded orthotropic half-plane containing a Volterra screw dislocation. The variations of the material properties are assumed to be exponential forms which the equilibrium has an analytical solution. The dislocation solution is utilized to formulate integral equation for the half-plane weakened by multiple smooth cracks under anti-plane deformation. The integral equations are of Cauchy singular type at the location of dislocation which are solved numerically to obtain the dislocation density on the faces of the cracks. The dislocation densities are employed to determined stress intensity factor and strain energy density factors (SEDFs) for multiple smooth cracks under anti-plane deformation. Numerical examples are provided to show the effects of material properties and the crack configuration on the dynamic stress intensity factors and SEDFs of the functionally graded orthotropic half-plane with multiple curved cracks. 相似文献
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Pengpeng Shi 《基于设计的结构力学与机械力学》2016,44(3):250-269
A hollow functionally graded composite cylinder under static torsion, which consists of an inner and outer elastic circular tube with a cylindrical interface crack, is studied in this work. By utilizing Fourier integral transform method, the mixed boundary value problem is reduced to a Cauchy singular integral equation, from which the numerical results of the stress intensity factor are obtained by the Lobatto–Chebyshev quadrature technique. Numerical results demonstrate the coupled effects of geometrical, physical, and functionally graded parameters on the interfacial fracture behavior. 相似文献
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Based on the fundamental dynamic equations of functionally graded material (FGM) cylindrical shell, this paper investigates the sound radiation of vibrational FGM shell in water by mobility method. This model takes into account the exterior fluid loading due to the sound press radiated by the FGM shell. The FGM cylindrical shell was excited by a harmonic line radial force uniformly distributing along the generator. The FGM shell equations of motion, the Helmholtz equation in the exterior fluid medium and the continuity equation at fluid-shell interface are used in this vibroacoustic problem. The expressions of sound radiation efficiency and sound field of the FGM shell have been derived by mobility method. Radiation efficiency, modal mobility and the directivity pattern of the sound field are solved numerically. In particular, radiation efficiency and directivity pattern with various power law index are analyzed. 相似文献
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The torsional impact response of a penny-shaped crack in an unbounded transversely isotropic solid is considered. The shear moduli are assumed to be functionally graded such that the mathematics is tractable. Laplace transform and Hankel transform are used to reduce the problem to solving a Fredholm integral equation. The crack tip stress fields are obtained. Investigated are the influence of material nonhomogeneity and orthotropy on the dynamic stress intensity factor. The peak value of the dynamic stress intensity factor can be suppressed by increasing the shear moduli's gradient and/or increasing the shear modulus in a direction perpendicular to the crack surface. 相似文献
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弹性功能梯度材料板条中周期裂纹的反平面问题 总被引:1,自引:0,他引:1
讨论了弹性功能梯度材料板条中裂纹的反平面问题. 用Fourier
变换方法得到了一个基本解. 这个基本解表示了实轴上一点作用有点位错时引起的影响. 利
用此基本解可得单裂纹和周期裂纹问题的奇异积分方程. 在周期裂纹求解时,
远处裂纹对于中央裂纹的影响作了有效的近似处理. 最后, 给出了数值结果,
它表示了材料性质对于裂纹端应力强度因子的影响. 相似文献