共查询到20条相似文献,搜索用时 984 毫秒
1.
2.
3.
Numerical investigations were conducted on plane and axisymmetric convex joints of polycarbonate—aluminum and poly(methyl
methacrylate)—aluminum interfaces to gain a better understanding of the stress state along the interface and also to aid an
experimental study conducted on the same issue. Two-dimensional plane—stress investigations of convex joints revealed the
successful elimination of the free-edge stress singulatities along the specimen width although stress singularities, along
the thickness direction, persisted. A convex axisymmetric design, with the same material combination and joining angles, proves
to be a better design in order to achieve an overall elimination of free-edge stress singularities of dissimilar materials
and structures. 相似文献
4.
接合残余应力对异种接合材料强度的影响很大,正确地分析接合残余应力在界面端附近的分布及其奇异特性,是研究异材强度评价方法的关键问题之一,本文利用弹性学中的Goursat公式和有关微分方程解的理论,求得了平面近似下的界面端附近的残余应力场及其应力奇异性,与单纯的外力作用时的情况不同,残余应力在界面端有可能出现对数型的应力奇异性,并且不能仅用Dunders的异材参数来描述。 相似文献
5.
直角结合异材界面端应力强度系数的经验公式 总被引:1,自引:0,他引:1
由不同材料结合而成的材料(简称异材或双材料)的力学性能及其可靠性评价是工程中亟待解决的问题。表征界面端奇异应力场大小的应力强度系数是结合异材强度评价的依据,本文针对工程中最常见的直角结合异材,通过对大量不同材料组合的异材的边界元数值分析,提出了界面端应力强度系数的近似计算公式,无量纲化后的应力强度系数的值只与异材Dundurs参数a,卢有关,该公式具有较高的精度,可以作为一般工程上的应力强度系数的计算以及异材结构设计的依据。 相似文献
6.
7.
多重应力奇异性及其强度系数的数值分析方法 总被引:1,自引:1,他引:0
以具有两个应力奇异性次数的平面问题为例,提出了一种利用普通的数值分析结果确定奇异点附近多重应力奇异性的各阶次数以及相应的应力强度系数的数值分析方法,计算实例表明,本方法可以精确地求得各阶应力奇异性的次数,并且可以很方便地应用外插法确定出对应的应力强度系数。 相似文献
8.
与界面相交的裂纹尖端的应力奇异性分析 总被引:7,自引:1,他引:7
为了确定与结合材料的界面相交的裂纹尖端附近的应力奇异性次数,提出了一种基于最小势能原理的一维特殊有限元法,以奇异点为原点半径r0的扇形奇异区域,可以简化为一维线性领域,即一条以代表结合材料的两个自由表面为端点的线段。对该一维线性领域作网格划分,采用三节点一维等参数二次单元。数值计算结果与已有理论解的比较表明,该方法具有很高的精度和效率,最后,利用文中给出的方法,得到了各向异性结合材料中与界面以任意角相交的裂纹尖端的奇异性次数随裂纹的变化规律。 相似文献
9.
Ali R. Hadjesfandiari Gary F. Dargush 《International Journal of Solids and Structures》2011,48(10):1499-1512
A boundary element formulation is developed to determine the complex stress intensity factors associated with cracks on the interface between dissimilar materials. This represents an extension of the methodology developed previously by the authors for determination of free-edge generalized stress intensity factors on bi-material interfaces, which employs displacements and weighted tractions as primary variables. However, in the present work, the characteristic oscillating stress singularity is addressed through the introduction of complex weighting functions for both displacements and tractions, along with corresponding non-standard numerical quadrature formulas. As a result, this boundary-only approach provides extremely accurate mesh-insensitive solutions for a range of two-dimensional interface crack problems. A number of computational examples are considered to assess the performance of the method in comparison with analytical solutions and previous work on the subject. As a final application, the method is applied to study the scaling behavior of epoxy–metal butt joints. 相似文献
10.
应用复变函数方法,通过构造复函数形式的特解序列,从理论上研究了顶端受集中力偶的双材料平面界面接合楔体的应力场,给出了相应的经典解,发现其存在一次和二次佯谬,相应的应力具有(Inr)/r2和(In2r)/r2的奇异性。 相似文献
11.
《International Journal of Solids and Structures》2007,44(11-12):3796-3810
The electroelastic analysis of two bonded dissimilar piezoelectric ceramics with a crack perpendicular to and terminating at the interface is made. By using Fourier integral transform, the associated boundary value problem is reduced to a singular integral equation with generalized Cauchy kernel, the solution of which is given in closed form. Results are presented for a permeable crack under anti-plane shear loading and in-plane electric loading. Obtained results indicate that the electroelastic field near the crack tip in the homogeneous piezoelectric ceramic is dominated by a traditional inverse square-root singularity, while the electroelastic field near the crack tip at the interface exhibits the singularity of power law r−α, r being distance from the interface crack tip and α depending on the material constants of a bi-piezoceramic. In particular, electric field has no singularity at the crack tip in a homogeneous solid, whereas it is singular around the interface crack tip. Numerical results are given graphically to show the effects of the material properties on the singularity order and field intensity factors. 相似文献
12.
The problem of a mode-II crack close to and perpendicular to an imperfect interface of two bonded dissimilar materials is investigated.The imperfect interface is modelled by a linear spring with the vanishing thickness.The Fourier transform is used to solve the boundary-value problem and to derive a singular integral equation with the Cauchy kernel.The stress intensity factors near the left and right crack tips are evaluated by numerically solving the resulting equation.Several special cases of the mode-II crack problem with an imperfect interface are studied in detail.The effects of the interfacial imperfection on the stress intensity factors for a bimaterial system of aluminum and steel are shown graphically.The obtained observation reveals that the stress intensity factors are dependent on the interface parameters and vary between those with a fully debonded interface and those with a perfect interface. 相似文献
13.
The fracture problems near the interface crack tip for mode Ⅱ of double dissimilar orthotropic composite materials are studied. The mechanical models of interface crack for mode Ⅱ are given. By translating the governing equations into the generalized bi-harmonic equations,the stress functions containing two stress singularity exponents are derived with the help of a complex function method. Based on the boundary conditions,a system of non-homogeneous linear equations is found. Two real stress singularity exponents are determined be solving this system under appropriate conditions about himaterial engineering parameters. According to the uniqueness theorem of limit,both the formulae of stress intensity factors and theoretical solutions of stress field near the interface crack tip are derived. When the two orthotropic materials are the same,the stress singularity exponents,stress intensity factors and stresses for mode Ⅱ crack of the orthotropic single material are obtained. 相似文献
14.
An integrated experimental and numerical investigation was conducted for removing the free-adge stress singularities in dissimilar
material joints. A convex inter-face/joint design, inspired by the shape and mechanics of trees, will result in reduced stress
singularities at bimaterial corners for most engineering material combinations.In situ photoelasticity experiments on convex polycarbonate-aluminum joints showed that the free-edge stress singularity was successfully
removed. As a result, the new design not only improves the static load transfer capacity of dissimilar meterial joints, but
also yields more reasonable interfacial tensile strength evaluation. For convex polycarbonate-aluminum and poly(methyl methacrylate)-aluminum
joint specimens, the ultimate tensile load increased up to 81% while the total material volume was reduced by at least 15%
over that of traditional butt-joint specimens with severe free-edge stress singularities. 相似文献
15.
16.
提出了一种分析双材料轴对称界面端的应力奇异行为的特征值法.基于弹性力学空间轴对称问题的基本方程和一阶近似假设,利用分离变量形式的位移函数和无网格算法,导出了关于应力奇异性指数的离散形式的奇异性特征方程.由奇异性特征方程的特征值和特征向量,即可确定应力奇异性指数、位移角函数和应力角函数.数值求解了纤维/基体轴对称界面端模型的奇异性特征方程, 结果表明:尺寸效应参数δ(奇异点与轴对称轴的距离和应力奇异性支配区域大小的比值)影响着应力奇异性的强弱与阶次, 准一阶近似解析解只是δ>>1时的一个特例. 相似文献
17.
The fracture problems near the similar orthotropic composite materials are interface crack tip for mode Ⅱ of double disstudied. The mechanical models of interface crack for mode Ⅱ are given. By translating the governing equations into the generalized hi-harmonic equations, the stress functions containing two stress singularity exponents are derived with the help of a complex function method. Based on the boundary conditions, a system of non-homogeneous linear equations is found. Two real stress singularity exponents are determined be solving this system under appropriate conditions about bimaterial engineering parameters. According to the uniqueness theorem of limit, both the formulae of stress intensity factors and theoretical solutions of stress field near the interface crack tip are derived. When the two orthotropic materials are the same, the stress singularity exponents, stress intensity factors and stresses for mode II crack of the orthotropic single material are obtained. 相似文献
18.
《International Journal of Solids and Structures》2007,44(18-19):6340-6359
Based upon linear fracture mechanics, it is well known that the singular order of stresses near the crack tip in homogeneous materials is a constant value −1/2, which is nothing to do with the material properties. For the interface cracks between two dissimilar materials, the near tip stresses are oscillatory due to the order of singularity being −1/2 ± iε and −1/2. The oscillation index ε is a constant related to the elastic properties of both materials. While for the general interface corners, their singular orders depend on the corner angle as well as the elastic properties of the materials. Owing to the difference of the singular orders of homogeneous cracks, interface cracks and interface corners, their associated stress intensity factors are usually defined separately and even not compatibly. Since homogenous cracks and interface cracks are just special cases of interface corners, in order to build a direct connection among them a unified definition for their stress intensity factors is proposed in this paper. Based upon the analytical solutions obtained previously for the multibonded anisotropic wedges, the near tip solutions for the general interface corners have been divided into five different categories depending on whether the singular order is distinct or repeated, real or complex. To provide a stable and efficient computing approach for the general mixed-mode stress intensity factors, the path-independent H-integral based on reciprocal theorem of Betti and Rayleigh is established in this paper. The complementary solutions needed for calculation of H-integral are also provided in this paper. To illustrate our results, several different kinds of examples are shown such as cracks in homogenous isotropic or anisotropic materials, central or edge notches in isotropic materials, interface cracks and interface corners between two dissimilar materials. 相似文献
19.
In this paper we study the effects of negative Poisson's ratios on elastic problems containing singularities. Materials with a negative Poisson's ratio are termed auxetic. We present a brief review of such materials. The elasticity problem of a bimateral wedge is presented, then two particular cases of this problem are investigated: the free-edge problem and the interface crack problem. We study the effect on the stress singularity due to one portion of the bimaterial becoming auxetic. We find that the auxetic material has a significant effect on the singularity order, even causing the singularity to vanish for certain values of the elastic constants. 相似文献
20.
A crack terminating at an interface of two dissimilar elastic materials is investigated. It is found that the asymptotic stress
field near the crack tip is in general composed of two parts with each part being characterized by one singularity. The detailed
relation of the two singularities with the bimaterial properties is given for some special cases of the crack. 相似文献