Multifarious Chaotic Attractors and Its Control in Rigid Body Attitude Dynamical System

Mathematical Problems in Engineering ◽

10.1155/2020/5958768 ◽

2020 ◽

Vol 2020 ◽

pp. 1-11

Author(s):

Yang Wang ◽

Zhen Wang ◽

Dezhi Kong ◽

Lingyun Kong ◽

Yukun Qiao

Keyword(s):

Rigid Body ◽

Equilibrium Point ◽

Equilibrium Points ◽

Euler Angle ◽

Chaotic Attractors ◽

Attitude Motion ◽

Control Law ◽

Relay Control ◽

Body Attitude ◽

The Stability

The Euler dynamical equation which describes the attitude motion of a rigid body will exhibit very complex dynamic behaviors under the action of different external torques. Many special types of new chaotic attractors are presented, including hidden attractors, double-body-double-core chaotic attractors, and single-body-three-core-tree-wing chaotic attractors. The position of equilibrium points in several typical cases of the Euler dynamic equation is solved, and the stability of linearized equation at each equilibrium point and its influence on the formation of the chaotic attractor are analyzed. An improved nonlinear relay control law based on Euler angle feedback is developed to stabilize a new chaotic spacecraft attitude motion to an appointed equilibrium point or a periodic orbit.

Download Full-text

On dynamical equations in s-parameters for rigid body attitude motion

2015 International Conference on Mechanics - Seventh Polyakhov's Reading ◽

10.1109/polyakhov.2015.7106723 ◽

2015 ◽

Author(s):

Cemal B. Dolicanin ◽

Alexey A. Tikhonov

Keyword(s):

Rigid Body ◽

Attitude Motion ◽

Dynamical Equations ◽

Body Attitude ◽

S Parameters

Download Full-text

Robust stabilization of rigid body attitude motion in the presence of a stochastic input torque

2015 IEEE International Conference on Robotics and Automation (ICRA) ◽

10.1109/icra.2015.7139034 ◽

2015 ◽

Cited By ~ 3

Author(s):

Ehsan Samiei ◽

Maziar Izadi ◽

Sasi P. Viswanathan ◽

Amit K. Sanyal ◽

Eric A. Butcher

Keyword(s):

Rigid Body ◽

Robust Stabilization ◽

Attitude Motion ◽

Body Attitude ◽

Stochastic Input ◽

Input Torque

Download Full-text

Mathematical Modelling of Deforestation Due to Population Density and Industrialization

Jurnal Varian ◽

10.30812/varian.v5i1.1412 ◽

2021 ◽

Vol 5 (1) ◽

pp. 9-16

Author(s):

Didiharyono D. ◽

Irwan Kasse

Keyword(s):

Numerical Simulation ◽

Population Density ◽

Mathematical Modelling ◽

Equilibrium Point ◽

Equilibrium Points ◽

Stability Criteria ◽

Hurwitz Stability ◽

Stable Conditions ◽

Linear Differential ◽

The Stability

The focus of the study in this paper is to model deforestation due to population density and industrialization. To begin with, it is formulated into a mathematical modelling which is a system of non-linear differential equations. Then, analyze the stability of the system based on the Routh-Hurwitz stability criteria. Furthermore, a numerical simulation is performed to determine the shift of a system. The results of the analysis to shown that there are seven non-negative equilibrium points, which in general consist equilibrium point of disturbance-free and equilibrium points of disturbances. Equilibrium point TE7(x, y, z) analyzed to shown asymptotically stable conditions based on the Routh-Hurwitz stability criteria. The numerical simulation results show that if the stability conditions of a system have been met, the system movement always occurs around the equilibrium point.

Download Full-text

Equilibrium Further Studied for Combined System of Cournot and Bertrand: A Differential Approach

Complexity ◽

10.1155/2020/3160658 ◽

2020 ◽

Vol 2020 ◽

pp. 1-11

Author(s):

Bingyuan Gao ◽

Yueping Du

Keyword(s):

General Equilibrium ◽

Equilibrium Point ◽

Price Competition ◽

Dynamic Equilibrium ◽

Equilibrium Points ◽

Cournot Model ◽

Combined System ◽

Quantity Competition ◽

Bertrand Model ◽

The Stability

In general, quantity competition and price competition exist simultaneously in a dynamic economy system. Whether it is quantity competition or price competition, when there are more than three companies in one market, the equilibrium points will become chaotic and are very difficult to be derived. This paper considers generally dynamic equilibrium points of combination of the Bertrand model and Cournot model. We analyze general equilibrium points of the Bertrand model and Cournot model, respectively. A general equilibrium point of the combination of the Cournot model and Bertrand model is further investigated in two cases. The theory of spatial agglomeration and intermediate value theorem are introduced. In addition, the stability of equilibrium points is further illustrated on celestial bodies motion. The results show that at least a general equilibrium point exists in combination of Cournot and Bertrand. Numerical simulations are given to support the research results.

Download Full-text

The Qualitative Analysis of Two Populations Commensalisms Model

Advanced Materials Research ◽

10.4028/www.scientific.net/amr.524-527.3705 ◽

2012 ◽

Vol 524-527 ◽

pp. 3705-3708

Author(s):

Guang Cai Sun

Keyword(s):

Qualitative Analysis ◽

Equilibrium Point ◽

Stable Equilibrium ◽

Equilibrium Points ◽

Mathematics Model ◽

Stable Equilibrium Point ◽

The Stability ◽

Two Populations

This paper deals with the mathematics model of two populations Commensalisms symbiosis and the stability of all equilibrium points the system. It has given the conclusion that there is only one stable equilibrium point the system. This paper also elucidates the biology meaning of the model and its equilibrium points.

Download Full-text

Bifurcation Control of Ro¨ssler System

Design Engineering, Volumes 1 and 2 ◽

10.1115/imece2003-55035 ◽

2003 ◽

Author(s):

Z. Q. Wu ◽

P. Yu

Keyword(s):

Feedback Control ◽

Nonlinear Dynamical Systems ◽

Equilibrium Points ◽

New Method ◽

Control Law ◽

Equilibrium Solutions ◽

Nonlinear Dynamical ◽

The Stability ◽

Parameter Values ◽

Feasible System

In this paper, a new method is proposed for controlling bifurcations of nonlinear dynamical systems. This approach employs the idea used in deriving the transition variety sets of bifurcations with constraints to find the stability region of equilibrium points in parameter space. With this method, one can design, via a feedback control, appropriate parameter values to delay either static, or dynamic or both bifurcations as one wishes. The approach is applied to consider controlling bifurcations of the Ro¨ssler system. The uncontrolled Ro¨ssler has two equilibrium solutions, one of which exhibits static bifurcation while the other has Hopf bifurcation. When a feedback control based on the new method is applied, one can delay the bifurcations and even change the type of bifurcations. An optimal control law is obtained to stabilize the Ro¨ssler system using all feasible system parameter values. Numerical simulations are used to verify the analytical results.

Download Full-text

Self-Excited and Hidden Attractors in an Autonomous Josephson Jerk Oscillator: Analysis and Its Application to Text Encryption

Journal of Computational and Nonlinear Dynamics ◽

10.1115/1.4043359 ◽

2019 ◽

Vol 14 (7) ◽

Cited By ~ 1

Author(s):

Sifeu Takougang Kingni ◽

Gaetan Fautso Kuiate ◽

Victor Kamdoum Tamba ◽

Viet-Thanh Pham ◽

Duy Vo Hoang

Keyword(s):

Equilibrium Points ◽

Dynamical Behavior ◽

Projective Synchronization ◽

Chaotic Attractors ◽

Generalized Function ◽

Function Projective Synchronization ◽

Dc Bias ◽

The Stability ◽

Security Device ◽

High Level

By converting the resistive capacitive shunted junction model to a jerk oscillator, an autonomous chaotic Josephson jerk oscillator which can belong to oscillators with hidden and self-excited attractors is designed. The proposed autonomous Josephson jerk oscillator has two or no equilibrium points depending on DC bias current. The stability analysis of the two equilibrium points shows that one of the equilibrium points is unstable while for the other equilibrium point, the existence of a Hopf bifurcation is established. The dynamical behavior of autonomous Josephson jerk oscillator is analyzed by using standard tools of nonlinear analysis. For a suitable choice of the parameters, an autonomous Josephson jerk oscillator can generate antimonotonicity, periodic oscillations, self-excited chaotic attractors, hidden chaotic attractors, hidden chaotic bubble attractors, and coexistence between periodic and chaotic self-excited attractors. Finally, a text cryptographic encryption scheme with the help of generalized function projective synchronization of the proposed autonomous Josephson jerk oscillators in hidden chaotic attractor regime is illustrated through a numerical example, showing that a high-level security device can be produced using this system.

Download Full-text

A Four-Zone Model and Nonlinear Dynamic Analysis of Solution Multiplicity of Buoyancy Ventilation in Underground Building

Complexity ◽

10.1155/2020/8658797 ◽

2020 ◽

Vol 2020 ◽

pp. 1-24

Author(s):

Yuxing Wang ◽

Chunyu Wei

Keyword(s):

Differential Equations ◽

Equilibrium Point ◽

Equilibrium Points ◽

Underground Structure ◽

Unstable Equilibrium ◽

Phase Portraits ◽

Zone Model ◽

Unstable Equilibrium Point ◽

Index 2 ◽

The Stability

The solution multiplicity of natural ventilation in buildings is very important to personnel safety and ventilation design. In this paper, a four-zone model of buoyancy ventilation in typical underground building is proposed. The underground structure is divided to four zones, a differential equation is established in each zone, and therefore, there are four differential equations in the underground structure. By solving and analyzing the equilibrium points and characteristic roots of the differential equations, we analyze the stability of three scenarios and obtain the criterions to determine the stability and existence of solutions for two scenarios. According to these criterions, the multiple steady states of buoyancy ventilation in any four-zone underground buildings for different stack height ratios and the strength ratios of the heat sources can be obtained. These criteria can be used to design buoyancy ventilation or natural exhaust ventilation systems in underground buildings. Compared with the two-zone model in (Liu et al. 2020), the results of the proposed four-zone model are more consistent with CFD results in (Liu et al. 2018). In addition, the results of proposed four-zone model are more specific and more detailed in the unstable equilibrium point interval. We find that the unstable equilibrium point interval is divided into two different subintervals corresponding to the saddle point of index 2 and the saddle focal equilibrium point of index 2, respectively. Finally, the phase portraits and vector field diagrams for the two scenarios are given.

Download Full-text

STABILITY BOUNDARY CHARACTERIZATION OF NONLINEAR AUTONOMOUS DYNAMICAL SYSTEMS IN THE PRESENCE OF A SUPERCRITICAL HOPF EQUILIBRIUM POINT

International Journal of Bifurcation and Chaos ◽

10.1142/s0218127413501964 ◽

2013 ◽

Vol 23 (12) ◽

pp. 1350196 ◽

Cited By ~ 2

Author(s):

JOSAPHAT R. R. GOUVEIA ◽

FABÍOLO MORAES AMARAL ◽

LUÍS F. C. ALBERTO

Keyword(s):

Dynamical Systems ◽

Equilibrium Point ◽

Equilibrium Points ◽

Stability Boundary ◽

Complete Characterization ◽

Center Manifolds ◽

The Stability ◽

Hyperbolic Equilibrium ◽

Autonomous Dynamical Systems

A complete characterization of the boundary of the stability region (or area of attraction) of nonlinear autonomous dynamical systems is developed admitting the existence of a particular type of nonhyperbolic equilibrium point on the stability boundary, the supercritical Hopf equilibrium point. Under a condition of transversality, it is shown that the stability boundary is comprised of all stable manifolds of the hyperbolic equilibrium points lying on the stability boundary union with the center-stable and\or center manifolds of the type-k, k ≥ 1, supercritical Hopf equilibrium points on the stability boundary.

Download Full-text