On the stability of periodic motions. I

An approach to the study of the stability of non-linear multiply connected systems of automatic control by means of a fast Fourier transform and the resonance phenomenon is considered.

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SINGULARITY, SWITCHABILITY AND BIFURCATIONS IN A 2-DOF, PERIODICALLY FORCED, FRICTIONAL OSCILLATOR

International Journal of Bifurcation and Chaos ◽

10.1142/s0218127413300097 ◽

2013 ◽

Vol 23 (03) ◽

pp. 1330009 ◽

Cited By ~ 5

Author(s):

ALBERT C. J. LUO ◽

MOZHDEH S. FARAJI MOSADMAN

Keyword(s):

Dynamical Systems ◽

Bifurcation Analysis ◽

Degrees Of Freedom ◽

Eigenvalue Analysis ◽

Analytical Dynamics ◽

Periodic Motions ◽

Stability And Bifurcation ◽

Mapping Structures ◽

Stability And Bifurcation Analysis ◽

The Stability

In this paper, the analytical dynamics for singularity, switchability, and bifurcations of a 2-DOF friction-induced oscillator is investigated. The analytical conditions of the domain flow switchability at the boundaries and edges are developed from the theory of discontinuous dynamical systems, and the switchability conditions of boundary flows from domain and edge flows are presented. From the singularity and switchability of flow to the boundary, grazing, sliding and edge bifurcations are obtained. For a better understanding of the motion complexity of such a frictional oscillator, switching sets and mappings are introduced, and mapping structures for periodic motions are adopted. Using an eigenvalue analysis, the stability and bifurcation analysis of periodic motions in the friction-induced system is carried out. Analytical predictions and parameter maps of periodic motions are performed. Illustrations of periodic motions and the analytical conditions are completed. The analytical conditions and methodology can be applied to the multi-degrees-of-freedom frictional oscillators in the same fashion.

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Dynamics of Two Van Der Pol Oscillators Coupled via a Bath

Volume 5: 19th Biennial Conference on Mechanical Vibration and Noise, Parts A, B, and C ◽

10.1115/detc2003/vib-48593 ◽

2003 ◽

Author(s):

Erika Camacho ◽

Richard Rand ◽

Howard Howland

Keyword(s):

Software Package ◽

Bifurcation Theory ◽

Floquet Theory ◽

Van Der Pol Oscillator ◽

Direct Connection ◽

Periodic Motions ◽

Van Der Pol ◽

Existence And Stability ◽

Van Der Pol Oscillators ◽

The Stability

In this work we study a system of two van der Pol oscillators, x and y, coupled via a “bath” z: x¨−ε(1−x2)x˙+x=k(z−x)y¨−ε(1−y2)y˙+y=k(z−y)z˙=k(x−z)+k(y−z) We investigate the existence and stability of the in-phase and out-of-phase modes for parameters ε > 0 and k > 0. To this end we use Floquet theory and numerical integration. Surprisingly, our results show that the out-of-phase mode exists and is stable for a wider range of parameters than is the in-phase mode. This behavior is compared to that of two directly coupled van der Pol oscillators, and it is shown that the effect of the bath is to reduce the stability of the in-phase mode. We also investigate the occurrence of other periodic motions by using bifurcation theory and the AUTO bifurcation and continuation software package. Our motivation for studying this system comes from the presence of circadian rhythms in the chemistry of the eyes. We present a simplified model of a circadian oscillator which shows that it can be modeled as a van der Pol oscillator. Although there is no direct connection between the two eyes, they can influence each other by affecting the concentration of melatonin in the bloodstream, which is represented by the bath in our model.

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Dynamics of a Continuous System With Clearance and Motion Limiting Stops

Volume 7B: 17th Biennial Conference on Mechanical Vibration and Noise ◽

10.1115/detc99/vib-8184 ◽

1999 ◽

Author(s):

P. Metallidis ◽

S. Natsiavas

Keyword(s):

Piecewise Linear ◽

Research Work ◽

Continuous System ◽

Continuous Model ◽

Equation Of Motion ◽

Model System ◽

Periodic Motions ◽

System Parameters ◽

Rigid Rods ◽

The Stability

Abstract The present study generalises previous research work on the dynamics of discrete oscillators with piecewise linear characteristics and investigates the response of a continuous model system with clearance and motion-limiting constraints. More specifically, in the first part of this work, an analysis is presented for determining exact periodic response of a periodically excited deformable rod, whose motion is constrained by a flexible obstacle. This methodology is based on the exact solution form obtained within response intervals where the system parameters remain constant and its behavior is governed by a linear equation of motion. The unknowns of the problem are subsequently determined by imposing an appropriate set of periodicity and matching conditions. The analytical part is complemented by a suitable method for determining the stability properties of the located periodic motions. In the second part of the study, the analysis is applied to several cases in order to investigate the effect of the system parameters on its dynamics. Special emphasis is placed on comparing these results with results obtained for similar but rigid rods. Finally, direct integration of the equation of motion in selected areas reveals the existence of motions, which are more complicated than the periodic motions determined analytically.

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Periodic Motions in an Autonomous System With a Discontinuous Vector Field

Volume 7B: Dynamics, Vibration, and Control ◽

10.1115/imece2020-23633 ◽

2020 ◽

Author(s):

Siyu Guo ◽

Albert C. J. Luo

Keyword(s):

Vector Field ◽

Dynamical Systems ◽

Numerical Simulations ◽

Autonomous System ◽

Parameter Study ◽

Spring Stiffness ◽

Algebraic Equations ◽

Periodic Motions ◽

Mapping Structures ◽

The Stability

Abstract In this paper, periodic motions in an autonomous system with a discontinuous vector field are discussed. The periodic motions are obtained by constructing a set of algebraic equations based on motion mapping structures. The stability of periodic motions is investigated through eigenvalue analysis. The grazing bifurcations are presented by varying the spring stiffness. Once the grazing bifurcation occurs, periodic motions switches from the old motion to a new one. Numerical simulations are conducted for motion illustrations. The parameter study helps one understand autonomous discontinuous dynamical systems.

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Period Motions and Stability in a Nonlinear Spring Pendulum

Volume 4B: Dynamics, Vibration, and Control ◽

10.1115/imece2018-86862 ◽

2018 ◽

Author(s):

Albert C. J. Luo ◽

Yaoguang Yuan

Keyword(s):

Fourier Series ◽

Excitation Frequency ◽

Analytic Method ◽

Analytical Prediction ◽

Discrete Fourier Series ◽

Periodic Motions ◽

Harmonic Frequency ◽

Pendulum System ◽

Nonlinear Spring ◽

The Stability

In this paper, period-1 motions varying with excitation frequency in a periodically forced, nonlinear spring pendulum system are predicted by a semi-analytic method. The harmonic frequency-amplitude for periodical motions are analyzed from the finite discrete Fourier series. The stability of the periodical solutions are shown on the bifurcation trees as well. From the analytical prediction, numerical illustrations of periodic motions are given, the comparison of numerical solution and analytical solution are given.

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On an Independent Period-1 Motion in a Flexible Rotor System

Volume 4: Dynamics, Vibration, and Control ◽

10.1115/imece2019-10983 ◽

2019 ◽

Author(s):

Yeyin Xu ◽

Albert C. J. Luo

Keyword(s):

Numerical Simulations ◽

Internal Resonance ◽

Mapping Method ◽

Rotor System ◽

Flexible Rotor ◽

Periodic Motions ◽

Phase Trajectories ◽

Stability And Bifurcation ◽

The Stability ◽

Nonlinear Rotor System

Abstract This paper investigates stable and unstable period-1 motions in a rotor system through the discrete mapping method. The discrete mapping of a nonlinear rotor system is for stable and unstable period-1 motions. The stability and bifurcation of periodic motions are determined. Numerical simulations of periodic motions are completed and phase trajectories, displacement orbits and velocity plane are illustrated. The period-1 motion near the internal resonance is determined with large vibration in the nonlinear rotor system.

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On Time-Delay Effects on Period-1 Motions in a Periodically Forced, Time-Delayed, Duffing Oscillator

Volume 4B: Dynamics, Vibration, and Control ◽

10.1115/imece2016-66198 ◽

2016 ◽

Author(s):

Albert C. J. Luo ◽

Siyuan Xing

Keyword(s):

Time Delay ◽

Analytical Solutions ◽

Analytical Method ◽

Duffing Oscillator ◽

Delay Systems ◽

Harmonic Amplitude ◽

Time Delay Systems ◽

Periodic Motions ◽

Delay Effects ◽

The Stability

In recent decades, nonlinear time-delay systems were often applied in controlling nonlinear systems, and the stability of such time-delay systems was very actively discussed. Recently, one was very interested in periodic motions in nonlinear time-delay systems. Especially, the semi-analytical solutions of periodic motions in time-delay systems are of great interest. From the semi-analytical solutions, the nonlinearity and complexity of periodic motions in the time-delay systems can be discussed. In this paper, time-delay effects on periodic motions of a periodically forced, damped, hardening, Duffing oscillator are analytically discussed through a semi-analytical method. The semi-analytical method is based on discretization of the differential equation of such a Duffing oscillator to obtain the corresponding implicit discrete mappings. Through such implicit mappings and mapping structures of periodic motions, period-1 motions varying with time-delay are discussed, and the corresponding stability and bifurcation analysis of periodic motions are carried out through eigenvalue analysis. Numerical results of periodic motions are illustrated to verify analytical predictions. The corresponding harmonic amplitude spectrums and harmonic phases are presented for a better understanding of periodic motions in such a nonlinear oscillator.

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Asymptotic trajectories and the stability of the periodic motions of an autonomous hamiltonian system with two degrees of freedom

Journal of Applied Mathematics and Mechanics ◽

10.1016/0021-8928(88)90079-2 ◽

1988 ◽

Vol 52 (3) ◽

pp. 283-289

Author(s):

A.P. Markeyev

Keyword(s):

Hamiltonian System ◽

Degrees Of Freedom ◽

Periodic Motions ◽

Two Degrees Of Freedom ◽

Autonomous Hamiltonian System ◽

The Stability

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Harmonic Balance-Based Approach for Quasi-Periodic Motions and Stability Analysis

Journal of Vibration and Acoustics ◽

10.1115/1.4005823 ◽

2012 ◽

Vol 134 (3) ◽

Cited By ~ 20

Author(s):

Mikhail Guskov ◽

Fabrice Thouverez

Keyword(s):

Harmonic Balance ◽

Nonlinear Response ◽

Duffing Oscillator ◽

Point Of View ◽

Periodic Motions ◽

Computational Costs ◽

Nonlinear Responses ◽

Time Marching ◽

The Stability ◽

Good Agreement

Quasi-periodic motions and their stability are addressed from the point of view of different harmonic balance-based approaches. Two numerical methods are used: a generalized multidimensional version of harmonic balance and a modification of a classical solution by harmonic balance. The application to the case of a nonlinear response of a Duffing oscillator under a bi-periodic excitation has allowed a comparison of computational costs and stability evaluation results. The solutions issued from both methods are close to one another and time marching tests showing a good agreement with the harmonic balance results confirm these nonlinear responses. Besides the overall adequacy verification, the observation comparisons would underline the fact that while the 2D approach features better performance in resolution cost, the stability computation turns out to be of more interest to be conducted by the modified 1D approach.

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