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Fluid Flow-Induced Nonlinear Vibration of Suspended Cables 总被引:2,自引:0,他引:2
The nonlinear interaction of the first two in-plane modes of a suspended cable with a moving fluid along the plane of the cable is studied. The governing equations of motion for two-mode interaction are derived on the basis of a general continuum model. The interaction causes the modal differential equations of the cable to be non-self-adjoint. As the flow speed increases above a certain critical value, the cable experiences oscillatory motion similar to the flutter of aeroelastic structures. A co-ordinate transformation in terms of the transverse and stretching motions of the cable is introduced to reduce the two nonlinearly coupled differential equations into a linear ordinary differential equation governing the stretching motion, and a strongly nonlinear differential equation for the transverse motion. For small values of the gravity-to-stiffness ratio the dynamics of the cable is examined using a two-time-scale approach. Numerical integration of the modal equations shows that the cable experiences stretching oscillations only when the flow speed exceeds a certain level. Above this level both stretching and transverse motions take place. The influences of system parameters such as gravity-to-stiffness ratio and density ratio on the response characteristics are also reported. 相似文献
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Although the mean–variance control was initially formulated for financial portfolio management problems in which one wants to maximize the expected return and control the risk, our motivations stem from highway vehicle platoon controls that aim to maximize highway utility while ensuring zero accident. This paper develops near-optimal mean–variance controls of switching diffusion systems. To reduce the computational complexity, with motivations from earlier work on singularly perturbed Markovian systems [Sethi and Zhang, Hierarchical Decision Making in Stochastic Manufacturing Systems, Birkhäuser, Boston, MA, 1994; Yin and Zhang, Continuous-Time Markov Chains and Applications: A Singular Pertubation Approach, Springer-Verlag, New York, 1998 and Yin et al., Ann. Appl. Probab. 10 (2000), pp. 549–572], we use a two-time-scale formulation to treat the underlying system, which is represented by the use of a small parameter. As the small parameter goes to 0, we obtain a limit problem. Using the limit problem as a guide, we construct controls for the original problem, and show that the control so constructed is nearly optimal. 相似文献
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建立一种刚性杆-弹簧摆刚柔耦合强非线性动力学系统模型,给出了无量纲的动力学微分方程.该模型同时存在小幅度快速振荡和大范围慢速摆动的快、慢双时间尺度变量.针对工程中此类系统数值求解容易产生的刚性问题,采用一种三次Hermite插值精细积分法进行数值计算.将频率比、摆长比和初始摆角作为控制参数,研究刚性杆-弹簧摆刚柔耦合系统快、慢变量的复杂动力学行为.通过数值仿真分析,发现系统在不同的控制参数组合下呈现出混沌运动状态,并给出了与系统运动状态相关的控制参数范围,为复杂的刚柔耦合多体系统的设计与数值分析提供了参考. 相似文献
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刚柔耦合多体系统变量的特点为既有大范围慢变量,又有小幅度快变量,它们相互耦合,构成时变强非线性的高维动力学方程.由于这一特点往往给系统的数值模拟带来困境,需要对这一特点进行更深入的数值分析.以双时间尺度变量弹簧摆作为研究模型,采用一种三次Lagrange插值精细积分法进行数值计算,该方法是一个显式单步预测-校正的有效算法,能够自起步,且具有精度高、计算量小的特点.将该精细积分法与四阶Runge-Kutta法从能量守恒及计算结果准确度两方面进行比较,结果表明在计算系统快变量的响应时,精细积分法优于四阶Runge-Kutta法.对弹簧摆系统进行动力学行为分析,以大频率比及初始大摆角作为控制参数,研究系统的复杂动力学行为,给出了一定范围内不同动力学性态对应的参数域. 相似文献
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本文对一类多输入多输出非线性奇异摄动系统 ,构造了具有良好性态的状态反馈控制律 ,从而保证了闭环系统的稳定和良好的输入输出特性 . 相似文献
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