Hopf bifurcation in three-dimensional based on chaos entanglement function
作者: Kutorzi Edwin Yao , Yufeng Shi
DOI: 10.1016/J.CSFX.2020.100027
关键词: Chaotic 、 Lyapunov exponent 、 Statistical physics 、 Hopf bifurcation 、 Bifurcation 、 Secure communication 、 Attractor 、 Quantum entanglement 、 Function (mathematics) 、 Computer science
摘要: Abstract Chaotic entanglement is a new method used to deliver chaotic physical process, as suggested in this work. Primary rationale entangle more than two mathematical product stationery linear schemes by means of functions make system that develops manner.Existence Hopf bifurcation looked into selecting the set aside parameter. More accurately, we consider stableness and bifurcations sense equilibrium modern system. In addition, there involvement chaos systems have one positive Lyapunov exponent. Furthermore, are four requirements needed achieve entanglement. way through dissimilar functions, collection fresh attractors has been created abundant coordination compound dynamics exhibited. The breakthrough suggests it not difficult any longer construct obviously planned systems/networks for applied science practical application such chaos-based secure communication.
sci-hub.se 参考文章(33)
HONGTAO ZHANG, XINZHI LIU, XUEMIN SHEN, JUN LIU, CHAOS ENTANGLEMENT: A NEW APPROACH TO GENERATE CHAOS International Journal of Bifurcation and Chaos. ,vol. 23, pp. 1330014- ,(2013) , 10.1142/S0218127413300140
Sergej Čelikovský, Guanrong Chen, On the generalized Lorenz canonical form Chaos, Solitons & Fractals. ,vol. 26, pp. 1271- 1276 ,(2005) , 10.1016/J.CHAOS.2005.02.040
Wenying Xu, Jinde Cao, Min Xiao, Bifurcation analysis and control in exponential RED algorithm Neurocomputing. ,vol. 129, pp. 232- 245 ,(2014) , 10.1016/J.NEUCOM.2013.09.036
Xingwu Chen, Wentao Huang, Valery G. Romanovski, Weinian Zhang, Linearizability and local bifurcation of critical periods in a cubic Kolmogorov system Journal of Computational and Applied Mathematics. ,vol. 245, pp. 86- 96 ,(2013) , 10.1016/J.CAM.2012.12.003
Sheng Li, Qingming Wu, Zhiqiang Zhang, Bifurcation and chaos analysis of multistage planetary gear train Nonlinear Dynamics. ,vol. 75, pp. 217- 233 ,(2014) , 10.1007/S11071-013-1060-Z
Bob W. Kooi, Maíra Aguiar, Nico Stollenwerk, Bifurcation analysis of a family of multi-strain epidemiology models Journal of Computational and Applied Mathematics. ,vol. 252, pp. 148- 158 ,(2013) , 10.1016/J.CAM.2012.08.008
Chunguang Li, Guanrong Chen, Chaos in the fractional order Chen system and its control Chaos Solitons & Fractals. ,vol. 22, pp. 549- 554 ,(2004) , 10.1016/J.CHAOS.2004.02.035
Djamel Rezgui, Mark H. Lowenberg, Mark Jones, Claudio Monteggia, Continuation and Bifurcation Analysis in Helicopter Aeroelastic Stability Problems Journal of Guidance Control and Dynamics. ,vol. 37, pp. 889- 897 ,(2014) , 10.2514/1.60193
Fabio Scalco Dias, Luis Fernando Mello, Jian-Gang Zhang, Nonlinear analysis in a Lorenz-like system Nonlinear Analysis: Real World Applications. ,vol. 11, pp. 3491- 3500 ,(2010) , 10.1016/J.NONRWA.2009.12.010
Joseph Páez Chávez, Ekaterina Pavlovskaia, Marian Wiercigroch, Bifurcation analysis of a piecewise-linear impact oscillator with drift Nonlinear Dynamics. ,vol. 77, pp. 213- 227 ,(2014) , 10.1007/S11071-014-1285-5