共查询到20条相似文献,搜索用时 187 毫秒
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研究了转子-机匣系统发生碰摩时的分叉与混沌行为,分析了转子机匣频率比与刚度比、偏心质量等参数对系统分叉与混沌特性的影响.当转子机匣系统发生碰摩时除了通过倍周期、阵发性和拟周期分叉进入混沌外,还发现了孪生叉形分叉现象,呈现出非常丰富的动力学行为. 相似文献
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非稳态非线性油膜力作用下柔性轴裂纹转子的动力特性分析 总被引:5,自引:0,他引:5
分析了在动载轴承非稳态非线性油膜力作用下,具有横向裂纹柔性轴Jeffcott转子在非线性涡动影响下的动力特性。通过数值计算表明,在油膜失稳转速前,随着裂纹轴刚度变化比的增大,系统在低转速区域内具有丰富的非线性动力行为,出现倍周期分叉及混沌现象,涡动振幅随转速升高而减小,直到非稳态非线性油膜失稳,在无裂纹转子油膜临界失稳点处发现了类Hopf分叉现象,系统运动由平衡变为拟周期运动;裂纹转子在油膜临界失稳时的系统运动亦为拟周期运动,裂纹转子轴刚度变化对油膜失稳点及油膜失稳之后转子的运动影响不大,转子系统作拟周期运动。 相似文献
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本文完善和改进了求解非线性常微分方程组周期解及分叉特性分析的PNF方法,用以有效地分析谐波、次谐波运动和倍周期分叉行为。然后,应用该方法对一个单盘挠性转子-轴承系统的动力行为进行了研究。结果显示运动呈现拟周期分叉、倍周期分叉和切分叉等复杂动力学现象,并与一些理论和实验结论作了比较。 相似文献
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转子—轴承系统的分叉行为研究 总被引:8,自引:1,他引:8
本文完善和改进了求解非线性常微分方程组周期解及分叉特性分析的PNF方法,用以有效地分析谐波、次谐波运动和倍周期分叉行为。然后,应用该方法对一个单盘挠性转子-轴承系统的动力行为进行了研究。结果显示运动呈现拟周期分叉、倍周期分叉和切分叉等复杂动力学现象,并与一些理论和实验结论作了比较。 相似文献
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汽轮机转子在气流力和油膜力作用下的非线性动力学特性 总被引:2,自引:0,他引:2
为了分析转子在油膜力和气流激振力共同作用下的非线性振动特性,本文以短轴承支撑的不平衡刚性对称Jeffcott转子系统为研究对象,首先分析转子在非稳态油膜力作用下的振动特性,然后分析转子在油膜力和气流激振力共同作用下的非线性振动特性。采用数值模拟的方法研究了系统的分岔和混沌特性,计算结果表明,考虑气流激振力和油膜力共同作用下的转子系统与仅考虑油膜力的转子系统相比,在相对进气速度v=30m/s时,随着无量纲转速ω的增加。二者都出现了周期运动和混沌运动多次交替出现的复杂运动特性,但是前者首次出现倍周期分岔和混沌运动时的转运提前,在定转速情况下,随着v的增大,系统最终在经历周期运动之后进入混沌运动,而且圆盘中心的最大振幅随着v的增大而增大。 相似文献
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转子—轴承系统发生动静件碰摩时的混沌路径 总被引:11,自引:1,他引:11
分析了一个由油膜轴承支承的转子系统在发生动静件碰摩时的振动特性。转子转速与不平衡量被用来作为控制参数以研究进入和离开混沌区域的各种路径以及系统的各种形式的周期、拟周期与混沌运动。结果证明碰摩转子系统在进入和离开混沌区域时可经由倍周期分岔、阵发性和拟周期路径,以及一种由周期运动直接到混沌状态的突发路径。 相似文献
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非线性系统周期强迫不平衡响应的稳定性分析 总被引:4,自引:0,他引:4
多自由度强非线性系统是工程实际中经常遇见的一类模型,利用非线性动力学分析中的打靶法求解该类系统的周期解,并对Flopuet主导特征值判断周期解的失稳方式,利用该方法对旋转机械中的一个具体模型;双盘县臂柔性转子-非同心型挤压油膜阻尼器(SFD)系统周期强迫不平衡响应的稳定性和分岔行为进行了分析,分析表明,在该系统中存在着第二Hopf分岔、倍周期分岔、鞍-结分岔三种分岔形式。 相似文献
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The Ananthakrishna model, seeking to explain the phenomenon of repeated yielding of materials, is studied with or without periodic perturbation. For the unforced model, Hopf bifurcation, degenerate Hopf bifurcation and saddle-node bifurcation are detected. For the periodically forced model, two elementary periodic mechanisms are analyzed corresponding to five bifurcation cases of the unforced one. Rich dynamical behaviors arise, including stable and unstable periodic solutions of different periods, quasi-periodic solutions, chaos through torus destruction or cascade of period doublings. Moreover, even small change of a parameter can lead to bifurcation of different periodic solutions. Finally, according to the forced Ananthakrishna model, four types of stress–time curves are simulated, which can well interpret various experimental phenomena of repeated yielding. 相似文献
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This paper presents a detailed analysis on the dynamics of a ring network with small world connection. On the basis of Lyapunov stability approach, the asymptotic stability of the trivial equilibrium is first investigated and the delay-dependent criteria ensuring global stability are obtained. The existence of Hopf bifurcation and the stability of periodic solutions bifurcating from the trivial equilibrium are then analyzed. Further studies are paid to the effects of small world connection on the stability interval and the stability of periodic solution. In particular, some complex dynamical phenomena due to short-cut strength are observed numerically, such as: period-doubling bifurcation and torus breaking to chaos, the coexistence of multiple periodic solutions, multiple quasi-periodic solutions, and multiple chaotic attractors. The studies show that small world connection may be used as a simple but efficient “switch” to control the dynamics of a system. 相似文献
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In this paper, a delayed predator-prey model with dormancy of predators is investigated. It shows that time delay in the prey-species growth can lead to the occurrence of Hopf bifurcation with stability switches at a coexistence equilibrium. The computing formulas of stability and direction of the Hopf bifurcating periodic solutions are given. Under appropriate conditions, the uniform persistence of this model with time delay is proved. In this simple model, multiple periodic solutions coexist. Through numerical simulation, it is shown that different values of time delay can generate or eliminate chaos. Biologically, our results imply that dynamical behaviors of this system with time delay strongly depend on the initial density of this model and the time delay of the growth of the prey. 相似文献
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一类冲击振动系统在强共振条件下的亚谐分叉与Hopf分叉 总被引:5,自引:1,他引:5
通过理论分析和数值仿真,研究了一类二维冲击振动系统在一种强共振条件下的Hopf分叉与亚谐分叉。分析并证实了该类系统在此共振条件下可由稳定的周期1 1振动分叉为周期4 4振动或概周期振动,讨论了亚谐振动和概周期振动向混沌运动的演化过程。 相似文献
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This paper presents a detailed analysis on the dynamics of a delayed oscillator with negative damping and delayed feedback
control. Firstly, a linear stability analysis for the trivial equilibrium is given. Then, the direction of Hopf bifurcation
and stability of periodic solutions bifurcating from trivial equilibrium are determined by using the normal form theory and
center manifold theorem. It shows that with properly chosen delay and gain in the delayed feedback path, this controlled delayed
system may have stable equilibrium, or periodic solutions, or quasi-periodic solutions, or coexisting stable solutions. In
addition, the controlled system may exhibit period-doubling bifurcation which eventually leads to chaos. Finally, some new
interesting phenomena, such as the coexistence of periodic orbits and chaotic attractors, have been observed. The results
indicate that delayed feedback control can make systems with state delay produce more complicated dynamics. 相似文献
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Qinsheng Bi 《International Journal of Non》2004,39(1):33-54
The dynamical behavior of two coupled parametrically excited van der pol oscillators is investigated in this paper. Based on the averaged equations, the transition boundaries are sought to divide the parameter space into a set of regions, which correspond to different types of solutions. Two types of periodic solutions may bifurcate from the initial equilibrium. The periodic solutions may lose their stabilities via a generalized static bifurcation, which leads to stable quasi-periodic solutions, or via a generalized Hopf bifurcation, which leads to stable 3D tori. The instabilities of both the quasi-periodic solutions and the 3D tori may directly lead to chaos with the variation of the parameters. Two symmetric chaotic attractors are observed and for certain values of the parameters, the two attractors may interact with each other to form another enlarged chaotic attractor. 相似文献
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具有单侧刚性约束的两自由度振动系统在强共振条件下的拟周 … 总被引:6,自引:1,他引:5
采用理论分析和数值仿真相结合的方法,研究了一类两自由度碰撞振动系统在一种强共振条件下的Hopf分叉问题,分析并证实了碰撞振动系统在此共振条件下可由稳定的周期1-1振动分叉为不稳定的周期3-3振动,讨论了亚谐振动向混沌运动的演化过程。 相似文献
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We consider a delay equation whose delay is perturbed by a small periodic fluctuation. In particular, it is assumed that the delay equation exhibits a Hopf bifurcation when its delay is unperturbed. The periodically perturbed system exhibits more delicate bifurcations than a Hopf bifurcation. We show that these bifurcations are well explained by the Bogdanov-Takens bifurcation when the ratio between the frequencies of the periodic solution of the unperturbed system (Hopf bifurcation) and the external periodic perturbation is 1:2. Our analysis is based on center manifold reduction theory. 相似文献
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The trivial equilibrium of a two-degree-of-freedom autonomous system may become unstable via a Hopf bifurcation of multiplicity two and give rise to oscillatory bifurcating solutions, due to presence of a time delay in the linear and nonlinear terms. The effect of external excitations on the dynamic behaviour of the corresponding non-autonomous system, after the Hopf bifurcation, is investigated based on the behaviour of solutions to the four-dimensional system of ordinary differential equations. The interaction between the Hopf bifurcating solutions and the high level excitations may induce a non-resonant or secondary resonance response, depending on the ratio of the frequency of bifurcating periodic motion to the frequency of external excitation. The first-order approximate periodic solutions for the non-resonant and super-harmonic resonance response are found to be in good agreement with those obtained by direct numerical integration of the delay differential equation. It is found that the non-resonant response may be either periodic or quasi-periodic. It is shown that the super-harmonic resonance response may exhibit periodic and quasi-periodic motions as well as a co-existence of two or three stable motions. 相似文献