夹层压电材料中垂直于界面的共线双裂纹动力学问题分析

采用Schmidt方法分析了在简谐反平面剪切波作用下,两个半空间夹层压电材料中的共线裂纹的动力学行为．压电材料层内裂纹垂直于界面,电边界条件假设为可导通．通过Fourier变换,使问题的求解转换为两对三重积分对偶方程．通过数值计算,给出了裂纹的几何尺寸、压电材料常数、入射波频率等对于应力强度因子的影响．结果表明,在不同的入射波频率范围,动力场将阻碍或促使压电材料内裂纹的扩展．与不可导通电边界条件相比,导通裂纹表面的电位移强度因子比不可导通裂纹的电位移强度因子要小许多．     

有限高狭长压电体中共线双半无限裂纹问题的解析解

通过引入合适的保角变换,利用复变函数法,分析了部分裂纹面上受反平面剪应力和面内电载荷共同作用下有限高狭长压电体中含共线双半无限裂纹问题,导出了电不可通边界条件下两个裂纹尖端场强度因子和机械应变能释放率的解析解．当不考虑电场作用时,所得解可退化到经典弹性材料的情况．而当两裂纹尖端的距离趋于无穷大时,也可退化为狭长压电体中半无限裂纹问题的解．最后,通过数值算例,讨论了受载长度、狭长体高度、机电载荷对机械应变能释放率的影响规律以及两个裂纹之间的相互作用．结果表明,两裂纹尖端的距离越短,材料越容易破坏;且机电载荷对左尖端裂纹的扩展影响更为显著．     

压电介质内裂纹问题的精确解

在压电介质断裂力学分析中,人们常假定裂纹面上的电位移法向分量为零,可是实验表明,这一假设将导致错误的结果。本文基于精确的电边界条件,并应用Stroh公式的方法,导出了含裂纹压电介质在无限远处均匀外载作用下二维问题的精确解。结果表明:(ⅰ)应力强度因子与各向同性材料相同,而电位移强度因子取决于材料常数和机械载荷,但与电载荷无关;(ⅱ)能量释放率大于纯弹性各向异性材料内的值,即总是正的,且与电载荷无关;(ⅲ)裂纹内所含空气的介电常数对介质内的场强无影响。     

在面斜对称载荷下无限各向异性介质内的周期裂纹

本文试图藉助复变函数方法求解在面斜对称载荷下无限各向异性弹性介质的周期裂纹问题.这问题将化为欲确定满足某种边值条件的两个复变函数.文中假定应力、位移与边值条件是周期的,而且假定应力在无穷远处有界.这里的解答已表示为封闭形式.     

权函数法研究高速旋转厚壁筒的应力强度因子

采用厚壁筒在内压作用下的应力强度因子作为参考载荷的应力强度因子,通过权函数方法推导出了内壁带二维径向边裂纹的旋转厚壁筒的应力强度因子公式．这些公式可用于计算旋转厚壁筒在不同裂纹深度、转速、材料和尺寸情况下的应力强度因子．算例表明该文的公式具有良好的精度．同时还研究了旋转圆筒应力强度因子随裂纹深度和内外径比之间的变化规律,方便了工程应用．     

压电材料中两个非对称平行裂纹的基本解

采用Schmidt方法分析压电材料中非对称平行的双可导通裂纹的断裂性能．利用Fourier变换使问题的求解转换为求解两对以裂纹面位移之差为未知变量的对偶积分方程．为了求解对偶积分方程,直接把裂纹面位移差函数展开成Jacobi多项式形式．最终得到了裂纹的应力强度因子与电位移强度因子之间的关系．数值结果表明,应力强度因子和电位移强度因子与裂纹间的距离、裂纹的几何尺寸有关;与不可导通裂纹有关结果相比,可导通裂纹的电位移强度因子远小于相应问题不可导通裂纹的电位移强度因子．同时可以发现裂纹间的“屏蔽”效应也在压电材料中出现．     

压电陶瓷板中非电渗透型反平面裂纹的电弹性场

对受4种机电载荷的内含裂纹的压电陶瓷板的电弹性行为进行了分析。利用积分变换方法将非电渗透型反平面裂纹问题化为对偶积分方程组,求解这些方程组可以获得裂纹线上电弹性场的明显解析表达式,及裂尖处一些量的强度因子和机械应变能释放率。当板的厚度趋近于无穷大时,所得结果还原为熟知结果。     

一维六方压电准晶双材料界面共线裂纹问题北大核心CSCD

利用复变函数理论中的解析延拓、奇性主部分析和推广的Liouville定理,求解了一维六方压电准晶双材料在集中载荷作用下界面共线裂纹反平面弹性问题.导出了含有一条和两条有限长界面裂纹的封闭解,同时给出了裂纹尖端场强度因子(包含声子场和相位子场应力强度因子和电位移强度因子)的表达式.数值算例分析了外荷载与耦合系数之比对裂纹尖端场强度因子变化规律的影响.从数值结果中可以看出,当裂纹长度增加时,裂纹尖端场强度因子随之增加;应力强度因子随双材料耦合系数之比的增大而增大,电位移强度因子几乎不变;不同载荷作用下,裂纹尖端场强度因子随着裂纹长度改变时的变化趋势也不尽相同.研究结果可为压电准晶双材料的设计和制备提供一定的理论参考.     

无限板圆孔边四不等长裂纹问题

利用有限截项法研究了无限远处受任意角度单向均拉、无限大板圆孔边四不等长裂纹的应力强度因子和裂纹面张开位移问题,结果表明,当裂纹长与半径的比值大于2时,有限截项法和复变函数法所得应力强度因子的结果逼近程度较好.将圆孔边四条裂纹退化为两条裂纹时,应力强度因子的结果在裂纹长与半径的比值大于1.5时与复变函数解吻合较好;裂纹面张开位移的值仅在裂纹起始处与文献已有结果有差异,与已有的有限截项法结果均一致,即还原了两条裂纹的结果.     

横观各向同性压电材料中正三角形孔口快速传播裂纹的解析解

利用复变函数方法,通过引入合适的数值保角映射研究了横观各向同性压电材料中正三角形孔口快速传播裂纹的反平面剪切问题,并在电非渗透型与电渗透型两种边界条件下,结合柯西积分,导出了力-电耦合作用下以速度v传播时的Ⅲ型裂纹的动态应力强度因子和电位移强度因子的解析解.最后,考虑面内电载荷和面外机械载荷共同作用,分析了三角形孔尺寸、裂纹尺寸、外载变化对裂尖场强度因子的影响.     

Strip electro-mechanical yielding model for piezoelectric plate cut along two equal collinear cracks

The multiple-crack problems for piezoelectric ceramics till now have not yet address the crack opening arrest problem. The present work addresses this paucity. A 2-D strip-electro-mechanical yielding model is proposed for a transversely isotropic piezoelectric media weakened by two internal equal collinear straight cracks. The infinite boundary is prescribed with combined uniform constant in-plane mechanical and electrical loads. Developed mechanical and electric strip zones are arrested by prescribing over their rims uniform, normal, cohesive yield point stress and saturation limit electric displacement. Two cases are considered when saturation zone is bigger than developed yield zone and vice versa. Stroh formulation together with complex variable technique is employed to obtain the solution. Closed form expressions are derived for saturation zone length, yield zone length, crack opening displacement (COD), crack opening potential jump (COP) and energy release rate (ERR). An illustrative numerical study is prescribed to determine the effect of various parameters on the crack growth arrest and presented graphically. The results reveal that the model is capable of crack arrest under small-scale mechanical and electric yielding.     

不同功能梯度压电压磁层状介质中共线界面裂纹的动态性能分挝

对不同功能梯度压电压磁层状介质中,共线界面裂纹对简谐应力波作用下的动态问题,进行了分析.经Fourier变换,使问题的求解转换为求解以裂纹面上位移间断为未知量的三重对偶积分方程,三重对偶方程可以采用Schmidt方法来求解,进而分析了功能梯度参数、入射波频率和层状介质厚度对应力、电位移和磁通量强度因子的影响.     

Transient response of two collinear dielectric cracks in a piezoelectric solid under inplane impacts

The paper is focused on the dynamic analysis of two collinear dielectric cracks in a piezoelectric material under the action of in-plane electromechanical impacts. Considering the dielectric permeability of crack interior, the electric displacements at the crack surfaces are governed by the jumps of electric potential and crack opening displacement across the cracks. The permeable and impermeable crack models are the limiting cases of the general one. The Laplace and Fourier transform techniques are further utilized to solve the mixed initial-boundary-value problem, and then to obtain the singular integral equations with Cauchy kernel, which are solved numerically. Dynamic intensity factors of stress, electric displacement and crack opening displacement are determined in time domain by means of a numerical inversion of the Laplace transform. Numerical results for PZT-5H are calculated to show the effects of the dielectric permeability inside the cracks, applied electric loadings and the geometry of the cracks on the fracture parameters in graphics. The observations reveal that based on the COD intensity factor, a positive electric field enhances the dynamic dielectric crack growth and a negative one impedes the dynamic dielectric crack growth in a piezoelectric solid.     

Strip-saturation model for piezoelectric plane weakened by two collinear cracks with coalesced interior zones

A strip-saturation model is proposed for a transversely isotropic piezoelectric plane weakened by two collinear equal cracks, when developed saturation zones at the interior tips of the cracks get coalesced. The plane is subjected to unidirectional, normal (to the crack length) in-plane tension and electric displacement. The developed saturation zones are arrested by distributing over their rims the normal, cohesive, unidirectional saturation-limit electrical displacement. The solution is obtained using Stroh formulation and complex variable technique. Closed form expressions are derived for crack opening displacement (COD), crack potential drop (COP), field intensity factors, length of saturation zone, energy release rate. Case study carried out for PZT-4 to show the effects of inter-crack distance on the stress intensity factor. The variations of energy release rates are plotted for PZT-4, PZT-5H and BaTiO₃ to study the effects of the geometry of the two cracks.     

Crack opening displacement for two unequal straight cracks with coalesced plastic zones – A modified Dugdale model

The problem investigated is of an infinite plate weakened by two collinear unequal hairline straight quasi-static cracks. Uniform constant tension is applied at infinity in a direction perpendicular to the rims of the cracks. Consequently the rims of the cracks open in Mode I type deformation. The tension at infinity is increased to the limit such that the plastic zones developed at the two adjacent interior tips of cracks get coalesced. To arrest the crack from further opening normal cohesive variable stress distribution is applied on the rims of the plastic zones. Closed form analytic expressions are obtained for load bearing capacity and crack opening displacement (COD). An illustrative case is discussed to study the behavior of load bearing capacity and crack opening displacement with respect to affecting parameters viz. crack length, plastic zone length and inter crack distance between the two cracks. Results obtained are reported graphically and analyzed.     

An exact analysis for mode III cracks between two dissimilar magnetoelectroelastic layers

This paper develops a closed-form solution for an interface crack in a layered magnetoelectroelastic strip of finite width. The strip is subjected to anti-plane mechanical and in-plane electric and magnetic fields. Explicit expressions for the stress, electric, and magnetic fields, together with their intensity factors, are obtained for two extreme cases of an impermeable and a permeable cracks. The stress intensity factor does not depend on the electromagnetic boundary conditions assumed for the crack. However, the electrically and magnetically permeable boundary conditions on the crack profile have a significant influence on the crack-tip electromagnetic field intensity factors. Solutions for some special cases, such as a central crack, an edge crack, two symmetric collinear cracks, and a row of collinear interface cracks, are also obtained in closed forms. Russian translation published in Mekhanika Kompozitnykh Materialov, Vol. 44, No. 6, pp. 763–784, November–December, 2008.     

Non-local theory solution of two collinear mode-I cracks in piezoelectric materials

In this paper, the basic solution of two collinear cracks in a piezoelectric material plane subjected to a uniform tension loading is investigated by means of the non-local theory. Through the Fourier transform, the problem is solved with the help of two pairs of integral equations, in which the unknown variables are the jumps of displacements across the crack surfaces. To solve the integral equations, the jumps of displacements across the crack surfaces are directly expanded in a series of Jacobi polynomials. Numerical examples are provided to show the effects of the interaction of two cracks, the materials constants and the lattice parameter on the stress field and the electric displacement field near crack tips. Unlike the classical elasticity solution, it is found that no stress and electric displacement singularities are present at crack tips. The non-local elastic solutions yield a finite hoop stress at the crack tip, thus allowing us to using the maximum stress as a fracture criterion in piezoelectric materials.