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1.
基于大变形动力控制方程并利用有限差分离散分析,研究了斜撞击作用下弹塑性悬臂梁的动力响应.通过对屈服函数以及弯矩、轴力在动力响应过程中分布规律的分析,阐明了斜撞击下恳臂梁的弹塑性动力响应模式和斜撞击的轴向分量对变形机制的影响.研究表明,弹塑性响应过程可划分为四个阶段,对应的变形模式为:“压缩塑性区扩展”模式,“广义移行塑性铰”和“压缩塑性区收缩”混合模式,“驻定塑性铰”模式,“弹性自由振动”模式.与刚塑性分析所假定的两相变形模式比较,弹塑性应响分析证实了响应早期的瞬态轴向压缩模式和梁根部“驻定塑性铰”模式的存在性,肯定了刚塑性分析所假定变形模式的主要特征.斜撞击的轴向分量在撞击发生的瞬时主导了梁的变形,使梁呈现同承受横向冲击明显小同的变形规律.随着响应的深入,轴向分量迅速衰减,其对截面屈服的贡献非常微弱,由横向分量引起的弯曲挠动在大部分时间内主导和控制梁的变形.数值计算结果表明,斜撞击载荷的质量、撞击速度和角度是影响梁动力响应的重要因素. 相似文献
2.
集中质量撞击作用下梁的刚塑性动力分析是结构碰撞的研究课题之一。很多学者曾做了详细的研究。实验表明,对于剪切强度较弱的梁,在集中质量撞击作用下梁内将出现明显的剪切滑移变形。因此,研究剪切变形对梁的动力塑性响应的影响是十分必要的,symonds、Nonaka和Oliveira曾采用方形的横向剪力和弯矩的屈服曲线研究了集中质量撞击作用下有限长梁的刚塑性动力分析。本文采用圆形屈服曲线进一步讨论了上述问题,目的是考察不同的屈服曲线对梁的动力塑性响应的影响。 相似文献
3.
基于大挠度动力控制方程,应用有限差分离散求解,研究了阶跃载荷作用下弹塑性悬臂梁的动力行为。通过对动力响应早期内力、变形以及能量分布规律的分析,考察了悬臂梁的弹塑性响应模式和变形机制,并与已有的刚塑性分析进行了系统的比较。数值计算表明,阶跃载荷的不同幅值使得梁的响应模式存在较大差异,弹塑性分析肯定了刚塑性理论在处理中载情形的准确性,同时也指出了其在处理低载和高载情形时的缺陷。通过与小变形理论计算结果的比较,指出了考虑大变形效应的必要性,为今后的大变形刚塑性动力分析提出了建议。 相似文献
4.
基于大变形动力学微分方程并利用有限差分离散分析,研究了子弹撞击作用下固支浅圆拱的弹塑性动力响应。通过对响应不同时刻内力分布特征的分析,阐明了圆拱的响应模式和变形机制。研究表明,弹塑性响应过程可分为六个阶段。在响应早期,拱的变形以塑性弯曲挠动由撞击点向拱根部传播为主;在响应后期,则主要以轴力主导下的轴向拉伸变形为主。在高速撞击下,塑性弯曲挠动的不均匀性可以引起浅拱的反向弯曲变形。固支浅圆拱的动力响应对撞击速度的某个变化范围非常敏感,在此范围内,撞击速度的较小增加可以导致响应的很快增长,但动力响应随撞击速度连续变化,未发生突然的跳跃失稳。本文中计算结果同实验数据吻合较好。 相似文献
5.
为了讨论率敏感材料软钢钢梁受矩形脉冲载荷作用下的动力响应问题,通过直接离散有限变形弹
塑性连续体最小加速度原理中的Lee泛函得到基本控制方程,并将包含应变率的Cowper-Symonds方程嵌入
应力-应变关系方程,使该计算模型计及材料的应变率效应,因而能够准确描述钢梁受爆炸和冲击载荷作用下
的动力响应问题。该计算模型的有效性通过与通用有限元程序ABAQUS比较而得到了验证,并进一步与已
有的刚塑性解做了对比。利用该计算模型进行数值计算,分析了均布和集中脉冲载荷作用下钢梁动力响应的
应变率效应,结果发现对于钢梁存在新的异常行为响应模式,应变率导致异常区域偏移和扩大,已有的刚塑性
解在一定载荷强度范围内不能准确预报钢梁的实际位移。 相似文献
6.
含切口悬臂梁的大变形塑性冲击动力响应 总被引:2,自引:0,他引:2
本文分析了含切口的悬臂梁受飞射物撞击的刚塑性动力响应的完全解,推导了考虑几何大变形效应的“双铰模式”的动力学方程,给出了计算方法和计算结果,最后讨论了耗散能的分配和切口对梁最终变形的影响。 相似文献
7.
本文考虑了一个放置在粘性介质上的刚-理想塑性悬臂梁在自由端受冲击载荷时的小变形动力响应。具体讨论了线性粘性介质时矩形脉冲,线性衰减脉冲及瞬时冲击等加载情况,并与无介质解进行了比较,讨论了介质对梁的运动变形模式、最终挠度、能量吸性的影响。 相似文献
8.
本文用矩量法解薄板塑性动力响应问题,分析阻尼介质对简支方板塑性动力响应的影响,对计算结果进行了讨论. 相似文献
9.
10.
本文对受集中冲击作用的深圆拱的刚塑性动力响应进行了理论分析和数值计算,用瞬时构形法得到了问题的全程解,提出发生反向弯曲的必要条件和反向弯曲变形的近似分析方法,确定了反向弯曲出现的临界冲击速度范围,并讨论质量比,能量比和支承条件对结构的响应时间,塑性形区域和最变形的影响。本文理论分析结果与实验数据吻合。 相似文献
11.
IntroductionDue to its excellent piezoelectric properties,composites made of piezoelectric materialsare found widespread applications and attracted more attentions[1-10].Because of materialanisotropy and couplingbetween mechanical deformation and electric… 相似文献
12.
For the orthotropic piezoelectric plane problem, a series of piezoelectric beams is solved and the corresponding exact solutions are obtained with the trial-anderror method on the basis of the general solution in the case of three distinct eigenvalues, in which all displacements, electrical potential, stresses and electrical displacements are expressed by three displacement functions in terms of harmonic polynomials. These problems are rectangular beams having rigid body displacements and identical electrical potential, rectangular beams under uniform tension and electric displacement as well as pure shearing and pure bending, beams of two free ends subjected to uniform electrical potential on the upper and lower surfaces. 相似文献
13.
In this paper, a new method, the step-reduction method, is proposed to investigate the dynamic response of the Bernoulli-Euler beams with arbitrary nonhomogeneity and arbitrary variable cross-section under arbitrary loads. Both free vibration and forced vibration of such beams are studied. The new method requires to discretize the space domain into a number of elements. Each element can be treated as a homogeneous one with uniform thickness. Therefore, the general analytical solution of homogeneous beams with uniform cross-section can be used in each element. Then, the general analytic solution of the whole beam in terms of initial parameters can be obtained by satisfying the physical and geometric continuity conditions at the adjacent elements. In the case of free vibration, the frequency equation in analytic form can be obtained, and in the case of forced vibration, a final solution in analytical form can also be obtained which is involved in solving a set of simultaneous algebraic equations with only 相似文献
14.
In this paper a general solution for the analysis of shear deformable stiffened plates subjected to arbitrary loading is presented.
According to the proposed model, the arbitrarily placed parallel stiffening beams of arbitrary doubly symmetric cross section
are isolated from the plate by sections in the lower outer surface of the plate, taking into account the arising tractions
in all directions at the fictitious interfaces. These tractions are integrated with respect to each half of the interface
width resulting two interface lines, along which the loading of the beams as well as the additional loading of the plate is
defined. Their unknown distribution is established by applying continuity conditions in all directions at the interfaces.
The utilization of two interface lines for each beam enables the nonuniform distribution of the interface transverse shear
forces and the nonuniform torsional response of the beams to be taken into account. The analysis of both the plate and the
beams is accomplished on their deformed shape taking into account second-order effects. The analysis of the plate is based
on Reissner’s theory, which may be considered as the standard thick plate theory with which all others are compared, while
the analysis of the beams is performed employing the linearized second order theory taking into account shear deformation
effect. Six boundary value problems are formulated and solved using the analog equation method (AEM), a BEM based method.
The solution of the aforementioned plate and beam problems, which are nonlinearly coupled, is achieved using iterative numerical
methods. The adopted model permits the evaluation of the shear forces at the interfaces in both directions, the knowledge
of which is very important in the design of prefabricated ribbed plates. The effectiveness, the range of applications of the
proposed method and the influence of shear deformation effect are illustrated by working out numerical examples with great
practical interest. 相似文献
15.
A simple and accurate mixed modal-differential quadrature formulation is proposed to study the dynamic behavior of beams in contact with fluid. Both free and forced vibration problems are considered. The proposed mixed methodology uses the modal technique for the structural domain while it applies the differential quadrature method (DQM) to the fluid domain. Thus, the governing partial differential equations of the beam and fluid are reduced to a set of ordinary differential equations in time. In the case of forced vibration, the Newmark time integration scheme is employed to solve the resulting system of ordinary differential equations. The proposed formulation, in general, combines the simplicity of the modal method and high accuracy and efficiency of the DQM. Its application is shown by solving some beam-fluid interaction problems. Comparisons with analytical solutions show that the present method is very accurate and reliable. To demonstrate its efficiency, the test problems are also solved using the finite element method (FEM). It is found that the proposed method can produce better accuracy than the FEM using less computational time. The technique presented in this investigation is general and can be used to solve various fluid-structure interaction problems. 相似文献
16.
In this paper, a general solution for three-dimensional static piezothermoelastic problems of crystal class 6mm solids is
presented. The general solution involves four piezoelastic potential functions and a piezothermoelastic potential function,
of which four piezoelastic potential functions are governed by weighted harmonic differential equations. Compared with the
general solution given by Ashida et al., in which seven potential functions are introduced, the general solution proposed
in the present paper is more rigorously derived. Moreover, it has a simple form and is convenient for application. As an illustrative
example, the problem of a pyroelectric half-space subjected to axisymmetric heating is studied. Numerical results of displacements
stresses, electric potential and electric displacements are obtained for a cadmium selenide half-space. Thermally induced
displacements and stress distribution are compared with those obtained for the same material without piezoelectric and pyroelectric
effects.
Project supported by the National Natural Science Foundation of China (19872060). 相似文献
17.
For the orthotropic piezoelectric plane problem, a series of piezoelectric beams is solved and the corresponding analytical solutions are obtained with the trialand-error method on the basis of the general solution in the case of three distinct eigenvalues, in which all displacements, electrical potential, stresses and electrical displacements are expressed by three displacement functions in terms of harmonic polynomials. These problems are cantilever beam with cross force and point charge at free end, cantilever beam and simply-supported beam subjected to uniform loads on the upper and lower surfaces, and cantilever beam subjected to linear electrical potential. 相似文献
18.
IntroductionThis paper is a continuation of Ref.[1],in which a series of orthotropic piezoelectricplane problems was solved and the corresponding exact solutions were obtained with the trial-and-error method,on the basis of the general solution expressed … 相似文献
19.
In this paper, a boundary element solution is developed for the nonlinear flexural–torsional dynamic analysis of beams of arbitrary doubly symmetric variable cross section, undergoing moderate large displacements, and twisting rotations under general boundary conditions, taking into account the effect of rotary and warping inertia. The beam is subjected to the combined action of arbitrarily distributed or concentrated transverse loading in both directions and to twisting and/or axial loading. Four boundary-value problems are formulated with respect to the transverse displacements, to the axial displacement, and to the angle of twist and solved using the Analog Equation Method, a Boundary Element Method (BEM) based technique. Application of the boundary element technique yields a system of nonlinear coupled Differential–Algebraic Equations (DAE) of motion, which is solved iteratively using the Petzold–Gear Backward Differentiation Formula (BDF), a linear multistep method for differential equations coupled with algebraic equations. Numerical examples of great practical interest including wind turbine towers are worked out, while the influence of the nonlinear effects to the response of beams of variable cross section is investigated. 相似文献
20.
This paper presents a new general method for solving the pressure-diffusion equation in cylindrically radial composite reservoirs, where the rock and fluid properties may change radially as a function ofr. Composite systems, such as formations with wellbore filtrate invasion and reservoirs with peripheral water encroachment, can be encountered as a result of drilling, secondary oil recovery, and water influx.The new solution method utilizes the reflection and transmission concept of electromagnetics to solve fluid flow problems in three-dimensional cylindrically radial reservoirs, where heterogeneity is in only one direction. The Green's function for a point source in a three-dimensional radially composite system is developed by using the reflection and transmission method. The method as well as the point source solution are sufficiently general that they may be applied to similar fluid flow and well testing problems involving single-phase flow. 相似文献