A Memristor-Based Complex Lorenz System and Its Modified Projective Synchronization

Wang, Shibing; Wang, Xingyuan; Zhou, Yufei

doi:10.3390/e17117628

Cited by 26 publications

(10 citation statements)

References 43 publications

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“…As introduced in [23,44,45], transient phenomena can appear in some memristor-based nonlinear systems, which need much longer computational time to achieve the steady states of the system. Hence, we use ode45 solver of Matlab®R2013a to simulate the system for plotting bifurcation diagram and calculating Lyapunov exponents with computational time interval 0-20,000 s and 0-100,000 s separately.…”

Section: Dynamical Behaviors Of Mhclsmentioning

confidence: 99%

A Memristor-Based Hyperchaotic Complex Lü System and Its Adaptive Complex Generalized Synchronization

Wang

Zhou

et al. 2016

Entropy

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This paper introduces a new memristor-based hyperchaotic complex Lü system (MHCLS) and investigates its adaptive complex generalized synchronization (ACGS). Firstly, the complex system is constructed based on a memristor-based hyperchaotic real Lü system, and its properties are analyzed theoretically. Secondly, its dynamical behaviors, including hyperchaos, chaos, transient phenomena, as well as periodic behaviors, are explored numerically by means of bifurcation diagrams, Lyapunov exponents, phase portraits, and time history diagrams. Thirdly, an adaptive controller and a parameter estimator are proposed to realize complex generalized synchronization and parameter identification of two identical MHCLSs with unknown parameters based on Lyapunov stability theory. Finally, the numerical simulation results of ACGS and its applications to secure communication are presented to verify the feasibility and effectiveness of the proposed method.

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Section: Dynamical Behaviors Of Mhclsmentioning

confidence: 99%

A Memristor-Based Hyperchaotic Complex Lü System and Its Adaptive Complex Generalized Synchronization

Wang

Zhou

et al. 2016

Entropy

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“…Since (3) is a linear differential equation, we can consider the differential Galois group corresponding to (3). Generally speaking, the differential Galois group G of (3) is a matrix subgroup of GL(n − 1, C) acting on the fundamental solutions of (3) such that it dose not change polynomial and differential relations between them.…”

Section: Preliminariesmentioning

confidence: 99%

“…To deal with the issue, one should show that the system has positive Lyapunov exponents or metric entropy, heteroclinic connections, and so on (see for instance [1][2][3]). There is much literature on the complex behavior and non-integrability of dynamical systems.…”

Section: Introductionmentioning

confidence: 99%

Meromorphic Non-Integrability of Several 3D Dynamical Systems

Huang

Shi

2017

Entropy

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Abstract:In this paper, we apply the differential Galoisian approach to investigate the meromorphic non-integrability of a class of 3D equations in mathematical physics, including Nosé-Hoover equations, the Lü system, the Rikitake-like system and Rucklidge equations, which are well known in the fields of molecular dynamics, chaotic theory and fluid mechanics, respectively. Our main results show that all these considered systems are, in fact, non-integrable in nearly all parameters.

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“…Some researchers added the memristor model to Chua's circuit [13], and others combined the Lorenz system with memristors [14]. In recent years, a lot of attention has been paid to the research on the memristive chaotic circuits applied to synchronization, and the synchronization scheme of memristive chaos based on Lorenz system has been developed initially [15,16]. Master system and slave system can achieve chaotic synchronization under controlled constraints, and it has been widely used in secure communication and other fields [17,18].…”

Section: Introductionmentioning

confidence: 99%

Circuit Implementation, Synchronization of Multistability, and Image Encryption of a Four-Wing Memristive Chaotic System

Peng

Min

Wang

2018

Journal of Electrical and Computer Engineering

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The four-wing memristive chaotic system used in synchronization is applied to secure communication which can increase the difficulty of deciphering effectively and enhance the security of information. In this paper, a novel four-wing memristive chaotic system with an active cubic flux-controlled memristor is proposed based on a Lorenz-like circuit. Dynamical behaviors of the memristive system are illustrated in terms of Lyapunov exponents, bifurcation diagrams, coexistence Poincaré maps, coexistence phase diagrams, and attraction basins. Besides, the modular equivalent circuit of four-wing memristive system is designed and the corresponding results are observed to verify its accuracy and rationality. A nonlinear synchronization controller with exponential function is devised to realize synchronization of the coexistence of multiple attractors, and the synchronization control scheme is applied to image encryption to improve secret key space. More interestingly, considering different influence of multistability on encryption, the appropriate key is achieved to enhance the antideciphering ability.

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A Memristor-Based Complex Lorenz System and Its Modified Projective Synchronization

Cited by 26 publications

References 43 publications

A Memristor-Based Hyperchaotic Complex Lü System and Its Adaptive Complex Generalized Synchronization

A Memristor-Based Hyperchaotic Complex Lü System and Its Adaptive Complex Generalized Synchronization

Meromorphic Non-Integrability of Several 3D Dynamical Systems

Circuit Implementation, Synchronization of Multistability, and Image Encryption of a Four-Wing Memristive Chaotic System

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