共查询到19条相似文献,搜索用时 93 毫秒
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《中国光学与应用光学文摘》2005,(2)
O437 2005021105 声光双稳态系统的周期驱动混沌=Acousto-optic bistable system chaos anti-control via periodic signal drive[刊,中]/ 张涛(中国科技大学物理系.安徽,合肥(230026)),冯忠耀 …//光子学报.-2004,33(5).-557-559 利用外周期信号对处于周期态的声光双稳态系统进 行驱动,在合适的驱动强度和频率下,系统可能从周期态 转换为李雅普诺夫指数意义下的混沌态。提出了这一混 相似文献
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单向耦合驱动同步法可实现耦合环形腔激光器映象格子模型与耦合声光双稳态映象格子模型时空混沌的广义同步.数值实验表明最大条件李雅普诺夫指数为负,可以实现时空混沌广义同步,给出了实现同步的最小耦合强度,利用辅助分析法证明了异构系统的广义同步. 相似文献
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声光双稳态系统混沌的周期扰动控制 总被引:4,自引:2,他引:2
声光双稳混沌系统的参量受到进行周期扰动,在一定扰动强度下,可实现对混沌的控制.通过数值模拟,证明该方法的有效性,并计算了系统随扰动强度的状态演化和李雅普诺夫指数演化,揭示了扰动强度与系统状态的关系.在此基础上的实验研究,实验证实了对声光双稳混沌系统进行参量扰动可以有效控制混沌. 相似文献
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提出双环掺铒光纤激光器耦合反馈控制混沌的物理模型,利用定向耦合器将系统的输出变量反馈到系统中,通过间接控制损耗系数,并选取适当的反馈系数,实现对系统混沌的控制。分析了反馈系数对激光器由混沌态进入周期态和稳定态的动力学行为的影响。数值模拟表明:改变系统损耗系数,双环掺铒光纤激光器可由周期态进入混沌态;加入耦合反馈,适当调制反馈系数,可以将双环光纤激光器混沌控制到周期态和稳定态上;提高系统反馈系数,系统进入稳定态的时间变短。选取不同的系统初值,激光器总能得到两种不同的奇怪吸引子,可见双环掺铒光纤激光器具有双稳态特征。 相似文献
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利用自治混沌系统的参数非共振激励混沌抑制原理实现强噪声背景下微弱方波信号的检测. 将频率远大于系统特征频率的方波信号作为内置激励信号,经平均法处理后,得到受控系统与原系统之间的参数等效关系,并由此确定使系统由混沌状态突变为周期状态的检测参数临界值. 数值仿真结果表明此系统可以达到极低的信噪比工作下限. 相比于利用参数共振微扰混沌抑制原理实现微弱信号检测的有关方法,此方案可根据严格的理论分析得到更准确的检测参数估计值,有利于在相关领域推广应用.
关键词:
自治混沌系统
参数激励
方波信号
检测 相似文献
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本文利用非共振参数策动实现对Chen系统的非反馈方式混沌控制.使用远大于系统平均频率的周期信号作为控制输入,将控制系统中的系统变量分解为按系统平均频率变化的慢变量和按外加控制信号频率变化的快变量,然后利用平均法对控制系统进行处理得到慢变系统;根据慢变系统的动力学性质,得出所用控制参数应满足的条件.数值仿真结果表明此方法可以使控制系统迅速达到目标状态,并且在控制信号受到噪声干扰时,在一定信噪比范围内仍能对系统进行有效的控制,证明了该方法的可行性.
关键词:
平均法
Chen系统
混沌控制 相似文献
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In this paper we propose a new scheme to achieve chaos control and synchronization in Bragg acousto-optic bistable systems. In the scheme, we use the output of one system to drive two identical chaotic systems. Using the maximal conditional Lyapunov exponent (MCLE) as the criterion, we analyze the conditions for realizing chaos synchronization. Numerical calculation shows that the two identical systems in chaos with negative MCLEs and driven by a chaotic system can go into chaotic synchronization whether or not they were in chaos initially. The two systems can go into different periodic states from chaos following an inverse period-doubling bifurcation route as well when driven by a periodic system. 相似文献
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The bifurcation threshold value of the chaos detection system for a weak signal* 总被引:6,自引:0,他引:6
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Recently, it has become an important problem to confirm the bifurcation threshold value of a chaos detectionsystem for a weak signal in the fields of chaos detection. It is directly related to whether the results of chaos detectionare correct or not. In this paper, the discrimination system for the dynamic behaviour of a chaos detection system fora weak signal is established by using the theory of linear differential equation with periodic coefficients and computingthe Lyapunov exponents of the chaos detection system; and then, the movement state of the chaos detection system isdefined. The simulation experiments show that this method can exactly confirm the bifurcation threshold value of thechaos detection svstem. 相似文献
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Lai YC Kandangath A Krishnamoorthy S Gaudet JA de Moura AP 《Physical review letters》2005,94(21):214101
We propose a scheme to induce chaos in nonlinear oscillators that either are by themselves incapable of exhibiting chaos or are far away from parameter regions of chaotic behaviors. Our idea is to make use of small, judiciously chosen perturbations in the form of weak periodic signals with time-varying frequency and phase, and to drive the system into a hierarchy of nonlinear resonant states and eventually into chaos. We demonstrate this method by using numerical examples and a laboratory experiment with a Duffing type of electronic circuit driven by a phase-locked loop. The phase-locked loop can track the instantaneous frequency and phase of the Duffing circuit and deliver resonant perturbations to generate robust chaos. 相似文献
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对非线性光电延迟反馈系统的响应时间序列进行数值分析.模型反馈循环中加入带通滤波器,建立非线性光电延迟反馈系统的数学模型.用龙格-库塔数值分析方法,通过调节参数,发现两种产生混沌信号的路径.设置特定φ时,在低反馈增益情况下,系统输出快速方波信号或慢速周期震荡信号,随着反馈增益的增加,系统输出出现复杂周期信号或混沌breather现象;在高反馈增益时,系统输出从不同的动力特性变成混沌状态. 相似文献
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The chaos in the KdV Burgers equation describing a ferroelectric
system has been successfully controlled by using a continuous
feedback control. This system has two stationary points. In order to
know whether the chaos is controlled or not, the instability of
control equation has been analysed numerically. The numerical
analysis shows that the chaos can be converted to one point by using
one control signal, however, it can converted to the other point by
using three control signals. The chaotic motion is converted to two
desired stationary points and periodic orbits in numerical experiment
separately. 相似文献