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本文提出一种修改后的结构的振动特性计算方法;此法利用测量频率响应函数矩阵,将结构的修改量作为作用在结构上的力处理,分析计算出修改后结构的频率响应函数矩阵。其优点是理论简单、计算量小、便于直接指导实际结构修改。 相似文献
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本文提出一种计算结构修改后振动特性的频率响应函数方法。此法考虑结构修改时振动系统的物理参数矩阵(质量、刚度、阻尼)的同时变化,利用位置矩阵,将局部修改时产生的物理参数矩阵的增量部分分解表示。推导出修改后振动系统的频率响应函数矩阵,进而拟合出模态参数。此法对物理参数的改变量的大小可以任意,且计算过程简单。 相似文献
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锅炉炉墙板梁结构随机响应的边界元方法 总被引:1,自引:0,他引:1
锅炉炉墙可简化成板,梁的组合结构,在燃烧脉动的激励下会形成随机性的振动。本文提出了一种借助于边界元方法进行随机激励作用下正交各向异性板,梁组合结构动力响应计算的一般方法。文中首先导出各向异性板,梁结构动力问题的边界积分方程,进而得到用于随机响应计算的板,梁结构的频率响应函数矩阵。在此基础上可以求出板,梁结构上任意点响应的均方值。这一方法的有效性在文中电站锅炉实际算例中得到了验证。 相似文献
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一维弹塑性波在土-结构体系中传播的有限元分析 总被引:1,自引:0,他引:1
本文用有限元方法分析了一维弹塑性波在土-结构体系中的传播问题。土体用Drucker-Prager屈服准则描述,结构仅考虑为线弹性体。文中给出了有限元计算的基本公式,计算和分析了自由场中压力和加速度峰值随深度衰减特性,土-结构体系界面的相互作用力和结构运动加速度特性:讨论了土分层和卸载模量对反应特性的影响。文中还对弹性波和弹塑性波两种情况下的结果做了比较。 相似文献
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阶梯压电层合梁的波动动力学特性 总被引:2,自引:0,他引:2
采用行波理论系统地研究了压电阶梯梁的自由振动分析以及强迫响应的分析方法. 基于分布
参数理论研究了压电阶梯梁的波传播特性,忽略柔性梁横向剪切和转动惯量的影响,给出了
梁的轴向和横向的简谐波解. 将压电阶梯梁离散化为单元,考虑压电片的刚度和质量的影响,
建立了节点散射模型. 应用位移连续和力平衡条件,推导了节点的波反射和波传递矩阵,在
此基础上,引入波循环矩阵的概念,给出波循环矩阵、波传递系数矩阵的确定方法. 应用波
循环矩阵可以有效地计算结构的固有频率. 另外,应用波传递系数研究了压电陶瓷作动器位
置对其驱动能力的影响. 得出两个主要结论:1)作动器靠近悬臂梁固定端将有较强的驱动
能力,悬臂梁边界反射行波产生弯曲消失波有利于增大压电波的模态传递系数;2)模态传
递系数与固有频率的灵敏度密切相关,波传递系数越大, 对应该处固有频率变化灵敏度越大.
另外,数值算例表明了行波方法比有限元方法具有更高的计算精度. 相似文献
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弹性波在岩体中传播时与岩体缺陷相互作用形成复杂的传播图案。为研究缺陷对弹性波多次散射作用的影响,建立了双椭圆缺陷模型,基于Green函数基本解,采用边界积分的计算方法,得到了反映缺陷界面条件的刚度矩阵,分析了弹性波在双椭圆缺陷间的多次散射效应。结果表明:与单椭圆缺陷模型相比,双缺陷的相互作用使得弹性波频散和衰减效应增强,定量给出了缺陷的影响区域,从而明确了多次散射效应的尺度界限。进一步探讨了弹性波传播的多尺度效应,结果表明频散的Rayleigh峰、Mie峰和衰减的峰值频率同椭圆长轴和入射波波长两个尺度密切相关,存在明确的定量关系。相应的数值模拟结果表明,弹性波和缺陷相互作用在缺陷界面上诱发界面波,该界面波也存在频率相关性,影响了弹性波宏观传播的频散和衰减特征。 相似文献
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Abstract Linear dynamic analysis of lattice structures using transfer matrices and joint coupling matrices is presented. A lattice structure is defined as a network of one-dimensional members that are connected by joints. Two examples are considered to illustrate how transfer matrices and joint coupling matrices may be used to compute natural frequencies of vibration. These two examples indicate that the transfer matrix and joint coupling matrix analysis is numerically accurate over a wide range of frequencies and becomes increasingly efficient, compared to the finite element method, as the frequency increases. Some suggestions for further improvements in computational efficiency and some comments about applicability to numerical analysis of wave propagation problems are given. 相似文献
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Yi-Ze Wang Feng-Ming Li Kikuo Kishimoto Yue-Sheng Wang Wen-Hu Huang 《Archive of Applied Mechanics (Ingenieur Archiv)》2010,80(6):629-640
In this paper, the propagation and localization of elastic waves in randomly disordered layered three-component phononic crystals
with thermal effects are studied. The transfer matrix is obtained by applying the continuity conditions between three consecutive
sub-cells. Based on the transfer matrix method and Bloch theory, the expressions of the localization factor and dispersion
relation are presented. The relation between the localization factors and dispersion curves is discussed. Numerical simulations
are performed to investigate the influences of the incident angle on band structures of ordered phononic crystals. For the
randomly disordered ones, disorders of structural thickness ratios and Lamé constants are considered. The incident angles,
disorder degrees, thickness ratios, Lamé constants and temperature changes have prominent effects on wave localization phenomena
in three-component systems. Furthermore, it can be observed that stopbands locate in very low-frequency regions. The localization
factor is an effective way to investigate randomly disordered phononic crystals in which the band structure cannot be described. 相似文献
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Li Fengming Wang Yuesheng Chen Ali 《Acta Mechanica Solida Sinica》2006,19(1):50-57
The wave propagation in periodic and disordered periodic piezoelectric rods is studied in this paper. The transfer matrix between two consecutive unit cells is obtained according to the continuity conditions. The electromechanical coupling of piezoelectric materials is considered. According to the theory of matrix eigenvalues, the frequency bands in periodic structures are studied. Moreover, by introducing disorder in both the dimensionless length and elastic constants of the piezoelectric ceramics, the wave localization in disordered periodic structures is also studied by using the matrix eigenvalue method and Lyapunov exponent method. It is found that tuned periodic structures have the frequency passbands and stopbands and localization phenomenon can occur in mistuned periodic structures. Furthermore, owing to the effect of piezoelectricity, the frequency regions for waves that cannot propagate through the structures are slightly increased with the increase of the piezoelectric constant. 相似文献
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In this paper,modified two-dimensional periodic lattice materials with local resonance phononic bandgaps are designed and investigated.The design concept isto introduce some auxiliary structures into conventional periodic lattice materials.Elastic wave propagation in this kindof modified two-dimensional lattice materials is studied using a combination of Bloch’s theorem with finite elementmethod.The calculated frequency band structures of illustrative modified square lattice materials reveal the existenceof frequency band gaps in the low frequency region due tothe introduction of the auxiliary structures.The mechanismunderlying the occurrence of these frequency band gaps isthoroughly discussed and natural resonances of the auxiliarystructures are validated to be the origin.The effect of geometric parameters of the auxiliary structures on the width ofthe local resonance phononic band gaps is explored.Finally,a conceptual broadband vibration-insulating structure basedon the modified lattice materials is designed and its capability is demonstrated.The present work is anticipated to beuseful in designing structures which can insulate mechanicalvibrations within desired frequency ranges. 相似文献
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《International Journal of Solids and Structures》2005,42(24-25):6457-6474
The two-dimensional wave propagation and localization in disordered periodic layered 2-2 piezoelectric composite structures are studied by considering the mechanic-electric coupling. The transfer matrix between two consecutive sub-layers is obtained based on the continuity conditions. Regarding the variables of mechanical and electrical fields as the elements of the state vector, the expression of the localization factors in disordered periodic layered piezoelectric composite structures is derived. Numerical results are presented for two cases—disorder of the thickness of the polymers and disorder of the piezoelectric and elastic constants of the piezoelectric ceramics. The results show that due to the piezoelectric effects, the characteristics of the wave localization in disordered periodic layered piezoelectric composite structures are different from those in disordered periodic layered purely elastic ones. The wave localization is strengthened due to the piezoelectricity. And the larger the piezoelectric constant is, the larger the wave localization factors are. It is found that slight disorder in the piezoelectric or elastic constants of the piezoelectric ceramics can lead to more prominent localization phenomenon. 相似文献
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结构的响应实质上是材料的响应,宏观结构损伤至断裂的发展过程也是材料性质不断演化的结果。构元组集模型从材料的微观物理变形机制出发,基于对泛函势理论和Cauchy-Born准则,抽象出两种构元——弹簧束构元和体积构元。在微观层次上,结构损伤和断裂的实质都是原子间键合力减弱和丧失的结果,而弹簧束构元是同一方向上的原子键的抽象,因此损伤可以通过弹簧束构元的响应曲线来反映。组集两种构元的响应,建立了材料的弹性损伤本构关系,从而能一致描述材料从弹性到损伤、破坏的发展过程。将构元组集模型的本构关系嵌入ABAQUS的用户材料单元子程序UMAT,实现对结构响应的数值模拟。本文模拟了包含中心预制裂纹三点弯曲梁的裂纹扩展过程,并与内聚区模型比较,给出了内聚区模型所假设的应力——位移关系曲线,并从材料损伤演化的角度对材料裂纹扩展过程做出了物理解释。 相似文献
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Rectangular chiral lattices possess a two-fold symmetry; in order to characterize the overall behavior of such lattices, a two-dimensional orthotropic chiral micropolar theory is proposed. Eight additional material constants are necessary to represent the anisotropy in comparison with triangular ones, four of which are devoted to chirality. Homogenization procedures are also developed for the chiral lattice with rigid or deformable circles, all material constants in the developed micropolar theory are derived analytically for the case of the rigid circles and numerically for the case of the deformable circles. The dependences of these material constants and of wave propagation on the microstructural parameters are also examined. 相似文献
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The propagation of a Bleustein-Gulyaev (B-G) type wave in a structure consisting of multiple layers and a half-space of porous piezoelectric materials is theoretically studied. The solutions of the problem in terms of the mechanical displacements and electric potential functions are obtained for each layer and the half-space. The dispersion equation is obtained for electrically open and shorted boundary conditions by use of the transfer matrix method. A peculiar kind of B-G waves is investigated, which can propagate only in the layer over the half-space. The relationship between the piezoelectric constants and the dielectric constants is found for the existence of a peculiar kind of propagation modes. The numerical results in terms of the phase velocity and the electromechanical coupling factor with different thicknesses of the layer stack are presented. 相似文献
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蜂窝材料的弹性波传播特性 总被引:2,自引:1,他引:1
通过研究蜂窝材料的弹性波频散关系,分析了其弹性波传播特性. 采用基于小波理论的分析方法,将材料参数和位移均展开为双正交周期小波基函数的形式,利用Bloch定理将波动方程转化为特征值方程,求解该方程得到3种典型结构------正方、三角与六角排列的铝(Al)和聚丙烯(PP)蜂窝材料的频散关系,并进行了比较分析. 结果显示:结构形式的不同显著地影响其波动特性,而制作材料的不同则没有影响;3种结构形式都不存在完全带隙,但正方和三角形结构在一定的传播方向范围内存在方向带隙,而六角形结构则在任何方向都不存在方向带隙;与正方结构相比,三角结构在相同孔隙率下,在更广的传播方向内和更低的频率下,能产生较宽的方向带隙. 相似文献