共查询到20条相似文献,搜索用时 14 毫秒
1.
Understanding hidden attractors, whose basins of attraction do not contain the neighborhood of equilibrium of the system, are important in many physical applications. We observe riddled-like complicated basins of coexisting hidden attractors both in coupled and uncoupled systems. Amplitude death is observed in coupled hidden attractors with no fixed point using nonlinear interaction. A new route to amplitude death is observed in time-delay coupled hidden attractors. Numerical results are presented for systems with no or one stable fixed point. The applications are highlighted. 相似文献
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According to the risk management process of financial markets,a financial risk dynamic system is constructed in this paper.Through analyzing the basic dynamic properties,we obtain the conditions for stability and bifurcation of the system based on Hopf bifurcation theory of nonlinear dynamic systems.In order to make the system’s chaos disappear,we select the feedback gain matrix to design a class of chaotic controller.Numerical simulations are performed to reveal the change process of financial market risk.It is shown that,when the parameter of risk transmission rate changes,the system gradually comes into chaos from the asymptotically stable state through bifurcation.The controller can then control the chaos effectively. 相似文献
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Based on passive theory, this paper studies a hybrid chaotic dynamical system from the mathematics perspective to implement the control of system stabilization. According to the Jacobian matrix of the nonlinear system, the stabilization control region is gotten. The controller is designed to stabilize fast the minimum phase Lorenz-Chen chaotic system after equivalently transforming from chaotic system to passive system. The simulation results show that the system not only can be controlled at the different equilibria, but also can be transformed between the different chaotic attractors. 相似文献
4.
This paper proposes a new robust chaotic system of three-dimensional
quadratic autonomous ordinary differential equations by introducing
an exponential quadratic term. This system can display a
double-scroll chaotic attractor with only two equilibria, and can be
found to be robust chaotic in a very wide parameter domain with
positive maximum Lyapunov exponent. Some basic dynamical properties
and chaotic behaviour of novel attractor are studied. By numerical
simulation, this paper verifies that the three-dimensional system
can also evolve into periodic and chaotic behaviours by a constant
controller. 相似文献
5.
在新的四维混沌系统中数值观察到四翼混沌吸引子,然而,通过进一步分析发现,该四翼吸引子并非真实的,实际上它是上、下两个共存的双翼混沌吸引子,他们各自有独立的混沌吸引域,由于其位置靠得太近和数值误差产生的一种假象.通过引入一个线性状态反馈控制项,系统的一些相似性被破坏,受控系统能产生穿越上下吸引域界限的对角双翼混沌吸引子,进一步,随着动力学模态的演化,上下混沌吸引子与对角混沌吸引子融合成一个真正的四翼混沌吸引子.最后,通过比较该四翼混沌吸引子的系统、Lorenz系统、Chua氏电路等混沌信号的频谱发现,四翼混沌吸引子的系统信号具有极宽的频谱带宽,该特性在通讯加密等工程应用中具有重要价值.
关键词:
四维混沌系统
双翼吸引子
四翼吸引子
频谱分析 相似文献
6.
运用Silnikov定理构建一个具有共存吸引子且个数可调的混沌系统.首先在经典混沌系统基础上构建一个结构简单的混沌系统,分析系统的动力学特性,验证系统马蹄意义下的混沌特性.在此基础上,将多零点分段函数引入该系统,以扩展系统平衡点的方式来增加系统的不变集,进而建立具有共存吸引子个数可调的混沌系统,由于共存吸引子的复杂性,... 相似文献
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Phase demodulation from a single fringe pattern is a challenging task but of interest. A quadratic phase matching and frequency-guided regularized phase tracker (QFGRPT) and a quadratic phase matching and frequency-guided sequential demodulation (QFSD) for demodulation of a single fringe pattern are proposed. The algorithms are characterized by their improvements on both robustness and accuracy, which are realized by quadratic phase matching and frequency guided scanning strategy, respectively. Quadratic phase matching improves accuracy compared with the existing regularized phase tracker techniques and the frequency-guided sequential demodulation technique using linear phase matching. Frequency guidance ensures high robustness compared with the recently published path-independent regularized phase-tracking technique. Demodulation results from computer-simulated and experimental fringe patterns using the proposed methods are demonstrated and analyzed. 相似文献
9.
构造一个具有复合幂函数的三维连续自治混沌系统。系统的状态方程仅有5项,其中一项是指数小于1的复合幂函数。该系统具有结构简单、非双曲平衡点、吸引子共存的性质,展现出了复杂的动力学行为。首先,对系统的动力学行为进行分析,包括李雅普诺夫(Lyapunov)指数谱、分岔图以及庞加莱映射等,结果表明此系统具有混沌特性。然后进行混沌系统的电路设计,电路仿真结果验证了理论分析的正确性。 相似文献
10.
In this paper we present a new simple controller for a chaotic system, that is, the
Newton--Leipnik equation with two strange attractors: the upper attractor (UA) and
the lower attractor (LA). The controller design is based on the passive technique.
The final structure of this controller for original stabilization has a simple
nonlinear feedback form. Using a passive method, we prove the stability of a
closed-loop system. Based on the controller derived from the passive principle, we
investigate three different kinds of chaotic control of the system, separately: the
original control forcing the chaotic motion to settle down to the origin from an
arbitrary position of the phase space; the chaotic intra-attractor control for
stabilizing the equilibrium points only belonging to the upper chaotic attractor or
the lower chaotic one, and the inter-attractor control for compelling the chaotic
oscillation from one basin to another one. Both theoretical analysis and simulation
results verify the validity of the suggested method. 相似文献
11.
CHEN Yong YAN Zhen-Ya 《理论物理通讯》2008,49(4):951-954
In this paper, we study chaos control of the new 3D chaotic system. We use three feedback methods (the linear, speed, doubly-periodic function controller) to suppress the chaos to unstable equilibrium. As a result, some controllers are obtained. Moreover, numerical simulations are used to verify the effectiveness of the obtained controllers. 相似文献
12.
Robust Stabilization and Synchronization of a Novel Chaotic System with Input Saturation Constraints
Ahmad Taher Azar Fernando E. Serrano Quanmin Zhu Maamar Bettayeb Giuseppe Fusco Jing Na Weicun Zhang Nashwa Ahmad Kamal 《Entropy (Basel, Switzerland)》2021,23(9)
In this paper, the robust stabilization and synchronization of a novel chaotic system are presented. First, a novel chaotic system is presented in which this system is realized by implementing a sigmoidal function to generate the chaotic behavior of this analyzed system. A bifurcation analysis is provided in which by varying three parameters of this chaotic system, the respective bifurcations plots are generated and evinced to analyze and verify when this system is in the stability region or in a chaotic regimen. Then, a robust controller is designed to drive the system variables from the chaotic regimen to stability so that these variables reach the equilibrium point in finite time. The robust controller is obtained by selecting an appropriate robust control Lyapunov function to obtain the resulting control law. For synchronization purposes, the novel chaotic system designed in this study is used as a drive and response system, considering that the error variable is implemented in a robust control Lyapunov function to drive this error variable to zero in finite time. In the control law design for stabilization and synchronization purposes, an extra state is provided to ensure that the saturated input sector condition must be mathematically tractable. A numerical experiment and simulation results are evinced, along with the respective discussion and conclusion. 相似文献
13.
The open-plus-closed loop (OPCL) method for chaotic systems with multiple strange attractors 
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下载免费PDF全文 Based on the open-plus-closed-loop (OPCL) control method a systematic
and comprehensive controller is presented in this paper for a chaotic
system, that is, the Newton--Leipnik equation with two strange
attractors: the upper attractor (UA) and the lower attractor (LA).
Results show that the final structure of the suggested controller for
stabilization has a simple linear feedback form. To keep the
integrity of the suggested approach, the globality proof of the
basins of entrainment is also provided. In virtue of the OPCL
technique, three different kinds of chaotic controls of the system
are investigated, separately: the original control forcing the
chaotic motion to settle down to the origin from an arbitrary
position of the phase space; the chaotic intra-attractor control for
stabilizing the equilibrium points only belonging to the upper
chaotic attractor or the lower chaotic one; and the inter-attractor
control for compelling the chaotic oscillation from one basin to
another one. Both theoretical analysis and simulation results verify
the validity of the proposed means. 相似文献
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This paper introduces a new three dimensional autonomous system with five equilibrium points.It demonstrates complex chaotic behaviours within a wide range of parameters,which are described by phase portraits,Lyapunov exponents,frequency spectrum,etc.Analysis of the bifurcation and Poincar’e map is used to reveal mechanisms of generating these complicated phenomena.The corresponding electronic circuits are designed,exhibiting experimental chaotic attractors in accord with numerical simulations.Since frequency spectrum analysis shows a broad frequency bandwidth,this system has perspective of potential applications in such engineering fields as secure communication. 相似文献
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Probing a subcritical instability with an amplitude expansion: An exploration of how far one can get
Paul Becherer Alexander N. Morozov Wim van Saarloos 《Physica D: Nonlinear Phenomena》2009,238(18):1827-1840
We explore methods to locate subcritical branches of spatially periodic solutions in pattern forming systems with a nonlinear finite-wavelength instability. We do so by means of a direct expansion in the amplitude of the linearly least stable mode about the appropriate reference state which one considers. This is motivated by the observation that for some equations fully nonlinear chaotic dynamics has been found to be organized around periodic solutions that do not simply bifurcate from the basic (laminar) state. We apply the method to two model equations, a subcritical generalization of the Swift–Hohenberg equation and a novel extension of the Kuramoto–Sivashinsky equation that we introduce to illustrate the abovementioned scenario in which weakly chaotic subcritical dynamics is organized around periodic states that bifurcate “from infinity” and that can nevertheless be probed perturbatively. We explore the reliability and robustness of such an expansion, with a particular focus on the use of these methods for determining the existence and approximate properties of finite-amplitude stationary solutions. Such methods obviously are to be used with caution: the expansions are often only asymptotic approximations, and if they converge their radius of convergence may be small. Nevertheless, expansions to higher order in the amplitude can be a useful tool to obtain qualitatively reliable results. 相似文献
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This paper describes a simple three-dimensional time-reversible system of ODEs with quadratic nonlinearities and the unusual property that it is exhibits conservative behavior for some initial conditions and dissipative behavior for others. The conservative regime has quasi-periodic orbits whose amplitude depend on the initial conditions, while the dissipative regime is chaotic. Thus a strange attractor coexists with an infinite set of nested invariant tori in the state space. 相似文献
20.
We consider Kochen-Specker theorem for three-qubit system with eight-dimensional state space. Reexamining the proof given by Kernaghan and Peres, we make some clarifications on the orthogonality of rays and rank-two projectors found by them. Basing on their five groups of orthogonal octad, we then show a proof that requires only seventeen rays. 相似文献