综述了航天器姿态运动的分岔和混沌的研究进展。
The progresses in studying bifurcations and chaos of spacecraft attitude motions are surveyed.
研究了一类单自由度分段线性系统周期运动的分岔和混沌现象。
Bifurcation and chaos of periodic motions of a single-degree-of-freedom system with piecewise-linearity is studied.
并对系统多重参数组合共振情况进行数值模拟,分析了周期解、分岔和混沌问题。
Use numerical simulation method to simulate the multi-parametric combination resonance condition for the system, analyse the periodic value, bifurcations and chaos of the system.
论文运用数理理论对非线性动力系统的分岔和混沌的基础理论和控制进行了较为系统和深入的研究,为应用于工程实际奠定了理论基础。
The paper did a systematic and profound research in control of bifurcation and chaos based on mathematical theory, thus, set a theoretical foundation for its application in engineering projects.
首先对其非线性振动响应进行了解析分析,然后用数值方法研究了间隙、偏心和回转角速度等参数变化所导致的系统分岔和混沌运动的特征。
The nonlinear vibration is analyzed analytically first. With the numerical method, the bifurcation behaviors and chaos are studied with such parameters as clearance, eccentric and rotating velocity.
对固定的参数激励频率和阻尼,当参数激励幅值较小时梁的运动是周期的,但大幅值激励会使运动通过倍周期分岔变为混沌。
For fixed damping and fixed excited frequency the motion of the beam under small amplitude of force is periodic, but becomes chaotic through period doubling bifurcation with increase of the force.
综述了航天器姿态运动的分岔+和混沌的研究进展。
The progresses in studying bifurcations and chaos of spacecraft attitude motions are surveyed.
用数值方法模拟一个拓扑结构简单、动力学行为复杂的新型混沌系统分岔过程,并用连续控制法研究该系统的混沌控制和同步特性。
A numerical method is used to simulate the forking process of a new chaotic system which is simple in topology structure but complicated in dynamics behavior.
但是,当电场和磁场很强时,电子的运动轨道开始分岔,运动出现混沌。
But when the external fields are very strong, the trajectory of an electron begins to bifurcate, thus chaos appears.
从理论上研究了由几个混沌系统复合而构成的新系统的非线性动力学特性和分岔序列。
In this paper, the nonlinear dynamical behaviors and bifurcation series of complex systems are studied.
本文综述了含有参数激励的非线性动力系统的响应、分岔与混沌问题的研究现状和方法,讨论了所存在的问题及其发展趋势。
The problem of robust stabilization for a kind of nonlinear dynamical systems with the matched uncertainties is studied in this paper.
本文综述了含有参数激励的非线性动力系统的响应、分岔与混沌问题的研究现状和方法,讨论了所存在的问题及其发展趋势。
The problem of robust stabilization for a kind of nonlinear dynamical systems with the matched uncertainties is studied in this paper.
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