圆形三向网架非线性动力稳定性分析

用拟板法将网架简化为平板,给出表层应变与中面位移的非线性关系．根据薄板的非线性动力学理论,建立了在直角坐标系中三向网架的非线性动力学方程,又将此方程转化为极坐标系轴对称非线性动力学方程．在周边固定条件下,引入异于等厚度板的无量纲量,对基本方程无量纲化．利用Galerkin法得到一个三次非线性振动方程,在无外激励情况下,讨论了稳定性与分岔问题．在外激励情况下,用Melnikov方法研究了圆形三向网架可能发生的混沌运动．通过数字仿真绘出了发生混沌的相平面图．     

托卡马克中低模态到高模态转迁模型的混沌运动

利用Melnikov方法详细研究了在托卡马克(Tokamaks)中,等离子区边缘附近低模态到高模态转迁方程的混沌动力学.该转迁方程是一个含外激励和参数激励的系统.对含周期外激励和线性参数激励、三次参数激励的系统分别绘出了用来划分混沌区和非混沌区的临界曲线.得到的结果表明,含有线性或三次参数激励的系统存在不可控区域,在该区域中异宿轨分岔总是导致混沌发生.特别地,三次参数激励系统存在一个"可控频率",施以该频率的激励,不论激励的振幅多大,同宿轨分岔总是不会导致混沌发生.得到了这类系统的一些复杂的动力学行为.     

非线性弹性地基上的圆薄板的分岔与混沌问题

根据非线性弹性地基上圆薄板大幅度方程,弹性抗力有线性项,三次非线性项和抗弯曲弹性项。在周边固定的条件下,利用Galerkin法得到了一个非线性振动方程。在无外激励情况下,求出在平衡点处的Floquet指数。分析了其稳定性与可能发生的分岔条件。在外激励条件下,用Melnikov方法分析研究了可能发生的混沌振动。通过数字仿真给出了各种地基参数下混沌区域的临界曲线和相平面图。     

多频激励软弹簧型Duffing系统中的混沌

研究了多频激励下的软弹簧型Duffing系统的混沌动力学,发现混沌产生的根本原因是系统相空间中横截异宿环面的存在．建立了双频激励情况下二维环面上的Poincaré映射、稳定流形和不稳定流形,应用Melnikov方法给出了稳定流形和不稳定流形横截相交的条件,并将此方法推广到激励包含有限多个频率的情形．推广了Melnikov方法在高维系统中的应用,给出了Smale马蹄意义下混沌存在的判据．同时证明,激励频率数目的增加扩大了参数空间上的混沌区域．     

大挠度板混沌运动的双模态分析

研究了大挠度矩形薄板受迫振动时的混沌运动,导出了矩形薄板的非线性控制方程;利用Galerkin原理,将其化为二自由度的常微分方程组,从理论上证明了在讨论其混沌运动时可以归结为一个单模态问题;利用Melnikov函数法给出了发生混沌运动的临界条件,揭示出在此类新的非线性动力系统中,同样存在着发生混沌的可能.     

1∶2内共振情况下点阵夹芯板动力学的奇异性分析

内共振是一种典型的非线性动力学行为,点阵夹芯板在航空航天领域中有着广泛的应用背景.研究点阵夹芯板的内共振问题具有重要的理论及工程意义.在横向激励与面内激励联合作用下,基于四边简支点阵夹芯板的动力学方程,利用多尺度法得到极坐标形式的平均方程,进而化简成稳态形式的代数方程,研究其在1∶2内共振情况下的非线性动力学行为.该文利用推广的奇异性理论研究分叉问题,基于稳态形式的代数方程,计算出含有两个调谐参数、一个横向激励和一个面内激励这4个参数的限制切空间;在强等价的条件下,简化了稳态形式的代数方程;在非退化的情况下,计算出简化的代数方程的正规形;对于含有两个状态变量和4个分叉参数的一般非线性动力学方程的奇异性理论进行了推广;利用推广的奇异性理论得到正规形余维4的18个普适开折的表达式;计算出普适开折转迁集的表达式;这样清楚了点阵夹芯板受到小扰动,当分叉、滞后和双极限点产生时,调谐参数和激励参数之间的关系,数值仿真了转迁集和分叉图,结果表明在不同的分叉区域有不同的振动形式.     

两自由度非线性振动系统主参数激励下的分岔分析

本文给出了参数激励作用下两自由度非线性振动系统,在1:2内共振条件下主参数激励低阶模态的非线性响应.采用多尺度法得到其振幅和相位的调制方程,分析发现平凡解通过树枝分岔产生耦合模态解,采用Melnikov方法研究全局分岔行为,确定了产生Smale马蹄型混沌的参数值.     

扁柱面网壳的非线性动力学行为

用连续化法建立了正三角形网格的三向单层扁柱面网壳的非线性动力学方程和协调方程．在两对边简支条件下用分离变量函数法给出扁柱面网壳的横向位移．由协调方程求出张力,通过Galerkin作用得到了一个含二次、三次的非线性动力学微分方程．通过求Floquet指数讨论平衡点邻域的稳定性,用复变函数留数理论求出Melnikov函数,可得到该动力学系统发生混沌运动的临界条件．通过数值计算模拟和Poincaré映射也证明了混沌运动存在．     

一般脉冲系统的Melnikov函数构造方法及其应用

利用摄动法给出了一般脉冲系统Melnikov函数构造方法,得到脉冲信号作用下一般非线性系统Melnikov方法.为考察方法的有效性,将方法应用到脉冲信号作用下Duffing系统的混沌预测中去,通过方法得到脉冲信号作用下Duffing系统出现混沌的阈值曲线,数值实验结果验证理论结果的正确性.     

双稳态压电能量获取系统的分岔混沌阈值

建立了双稳态压电能量获取系统动力学模型并且分析了系统的同宿分岔和混沌等非线性动力学行为.根据受压梁的双稳态特性,提出了等效双稳态压电能量获取系统的数学模型.基于Melnikov理论,获得了谐波激励作用下的能量获取系统关于同宿分岔的定性研究方法.通过优化系统参数,得到了发生同宿分岔的阈值曲线.数值结果显示系统在临界阈值处由单阱运动演变为双阱运动,验证了理论分析的有效性.结果表明Melnikov方法可为能量获取系统的参数设计提供有效的理论依据.     

The extended Melnikov method for non-autonomous nonlinear dynamical systems and application to multi-pulse chaotic dynamics of a buckled thin plate

The extended Melnikov method, which was used to solve autonomous perturbed Hamiltonian systems, is improved to deal with high-dimensional non-autonomous nonlinear dynamical systems. The multi-pulse Shilnikov type chaotic dynamics of a parametrically and externally excited, simply supported rectangular thin plate is studied by using the extended Melnikov method. A two-degree-of-freedom non-autonomous nonlinear system of the rectangular thin plate is derived by the von Karman type equation and the Galerkin approach. The case of buckling is considered for the rectangular thin plate. The extended Melnikov method is directly applied to the non-autonomous governing equations of motion to investigate multi-pulse Shilnikov type chaotic motions of the buckled rectangular thin plate for the first time. The results obtained here indicate that multi-pulse chaotic motions can occur in the parametrically and externally excited, simply supported buckled rectangular thin plate.     

Chaos control in duffing system

Analytical and numerical results concerning the inhibition of chaos in Duffing’s equation with two weak forcing excitations are presented. We theoretically give parameter-space regions by using Melnikov’s function, where chaotic states can be suppressed. The intervals of initial phase difference between the two excitations for which chaotic dynamics can be eliminated are given. Meanwhile, the influence of the phase difference on Lyapunov exponents for different frequencies is investigated. Numerical simulation results show the consistence with the theoretical analysis and the chaotic motions can be controlled to period-motions by adjusting parameter of suppressing excitation.     

Bifurcation and chaos of thin circular functionally graded plate in thermal environment

A ceramic/metal functionally graded circular plate under one-term and two-term transversal excitations in the thermal environment is investigated, respectively. The effects of geometric nonlinearity and temperature-dependent material properties are both taken into account. The material properties of the functionally graded plate are assumed to vary continuously through the thickness, according to a power law distribution of the volume fraction of the constituents. Using the principle of virtual work, the nonlinear partial differential equations of FGM plate subjected to transverse harmonic forcing excitation and thermal load are derived. For the circular plate with clamped immovable edge, the Duffing nonlinear forced vibration equation is deduced using Galerkin method. The criteria for existence of chaos under one-term and two-term periodic perturbations are given with Melnikov method. Numerical simulations are carried out to plot the bifurcation curves for the homolinic orbits. Effects of the material volume fraction index and temperature on the criterions are discussed and the existences of chaos are validated by plotting phase portraits, Poincare maps. Also, the bifurcation diagrams and corresponding maximum Lyapunov exponents are plotted. It was found that periodic, multiple periodic solutions and chaotic motions exist for the FGM plate under certain conditions.     

Chaotic dynamics of the vibro-impact system under bounded noise perturbation

In this paper, chaotic dynamics of the vibro-impact system under bounded noise excitation is investigated by an extended Melnikov method. Firstly, the Melnikov method in the deterministic vibro-impact system is extended to the stochastic case. Then, a typical stochastic Duffing vibro-impact system is given to application. The analytic conditions for occurrence of chaos are derived by using the random Melnikov process in the mean-square-value sense. In addition, the numerical simulations confirm the validity of analytic results. Also, the influences of interesting system parameters on the chaotic dynamics are discussed.     

扁锥面网壳非线性动力分岔与混沌运动

对曲面为正三角形网格的3向扁锥面单层网壳,用拟壳法建立了轴对称非线性动力学方程．在几何非线性范围内给出了协调方程．网壳在周边固定条件下,通过Galerkin作用得到一个含2次、3次的非线性微分方程,通过求Floquet指数讨论了分岔问题．为了研究混沌运动,对一类非线性动力系统的自由振动方程进行了求解,继之给出了单层扁锥面网壳非线性自由振动微分方程的准确解,通过求Melnikov函数,给出了发生混沌的临界条件,通过数值仿真也证实了混沌运动的存在．     

Horseshoe-shaped maps in chaotic dynamics of long Josephson junction driven by biharmonic signals

A collective coordinate approach is applied to study chaotic responses induced by an applied biharmonic driven signal on the long Josephson junction influenced by a constant dc-driven field with breather initial conditions. We derive a nonlinear equation for the collective variable of the breather and a new version of the Melnikov method is then used to demonstrate the existence of Smale horseshoe-shaped maps in its dynamics. Additionally, numerical simulations show that the theoretical predictions are well reproduced. The subharmonic Melnikov theory is applied to study the resonant breathers. Results obtained using this approach are in good agreement with numerical simulations of the dynamics of the Poincaré islands.     

Dynamics of a two-layer fluid sloshing problem

A second-order ordinary differential equation, which is a reducedform of the periodically forced extended Korteweg–de Vries(eKdV) equation, is derived in the physical context of sloshinga two-layer fluid tank. In the limit of small dispersion, numericalevidence is given of multiple periodic solutions displayingfast oscillations superimposed on slow periodic waves and ahigher-order Melnikov method is then used to verify the existenceof such solutions. The dynamical behaviour of a similar equationwith more general coefficients is also examined, demonstratingthe existence of periodic and chaotic behaviour. We highlightnew aspects which arise due to the presence of mixed nonlinearity.     

周期扰动下卫星运动系统的动力学性质

本文运用Melnikov方法对平面卫星运动系统在周期扰动下所表现出来的动力学性质进行了探讨.首先运用次谐Melnikov方法给出了卫星轨道在周期扰动下存在次谐周期轨道的条件,并进一步运用同宿.Melnikov方法证实了该系统存在Smale马蹄意义下的混沌性质.     

The Existence of Silnikov''''s Orbik in Four-dimensional Duffing''''s Systems

Abstract The existence of Silnikov's orbits in a four-dimensional dynamical system is discussed.The exis-tence of Silnikov's orbit resulting in chaotic dynamics is established by the fiber structure of invariant manifoldand high-dimensional Melnikov method.Numerical simulations are given to demonstrate the theoretical analysis.