Analysis and image encryption of memristive chaotic system with coexistence bubble

doi:10.1088/1674-1056/adbee5

中国物理B ›› 2025, Vol. 34 ›› Issue (4): 40203-040203.doi: 10.1088/1674-1056/adbee5

Analysis and image encryption of memristive chaotic system with coexistence bubble

Da Qiu(邱达)^1,2, Bo Zhang(张博)², Tingting Zhang(张婷婷)², Song Liu(刘嵩)², and Peiyu He(何培宇)^1,†

1 Sichuan University, College of Electronics and Information Engineering, Chengdu 610065, China;
2 Hubei Minzu University, School of Intelligent Systems Science and Engineering, Enshi 445000, China

收稿日期:2025-01-12 修回日期:2025-02-25 接受日期:2025-03-11 出版日期:2025-04-15 发布日期:2025-04-15
通讯作者: Peiyu He E-mail:hpysbsy@163.com
基金资助:
Project supported by the Natural Science Foundation of Hubei Province (Grant No. 2024AFD068).

Analysis and image encryption of memristive chaotic system with coexistence bubble

Da Qiu(邱达)^1,2, Bo Zhang(张博)², Tingting Zhang(张婷婷)², Song Liu(刘嵩)², and Peiyu He(何培宇)^1,†

1 Sichuan University, College of Electronics and Information Engineering, Chengdu 610065, China;
2 Hubei Minzu University, School of Intelligent Systems Science and Engineering, Enshi 445000, China

Received:2025-01-12 Revised:2025-02-25 Accepted:2025-03-11 Online:2025-04-15 Published:2025-04-15
Contact: Peiyu He E-mail:hpysbsy@163.com
Supported by:
Project supported by the Natural Science Foundation of Hubei Province (Grant No. 2024AFD068).

摘要/Abstract

摘要： In recent years, the phenomenon of multistability has attracted wide attention. In this paper, a memristive chaotic system with extreme multistability is constructed by using a memristor. The dynamic behavior of the system is analyzed by Poincaré mapping, a time series diagram, and a bifurcation diagram. The results show that the new system has several significant characteristics. First, the new system has a constant Lyapunov exponent, transient chaos and one complete Feigenbaum tree. Second, the system has the phenomenon of bifurcation map shifts that depend on the initial conditions. In addition, we find periodic bursting oscillations, chaotic bursting oscillations, and the transition of chaotic bursting oscillations to periodic bursting oscillations. In particular, when the system parameters take different discrete values, the system generates a bubble phenomenon that varies with the initial conditions, and this bubble can be shifted with the initial values, which has rarely been seen in the previous literature. The implementation by field-programmable gate array (FPGA) and analog circuit simulation show close alignment with the MATLAB numerical simulation results, validating the system's realizability. Additionally, the image encryption algorithm integrating DNA-based encoding and chaotic systems further demonstrates its practical applicability.

关键词: coexistence bubble, extreme multistability, clustered oscillation, anti-monotonicity

Abstract: In recent years, the phenomenon of multistability has attracted wide attention. In this paper, a memristive chaotic system with extreme multistability is constructed by using a memristor. The dynamic behavior of the system is analyzed by Poincaré mapping, a time series diagram, and a bifurcation diagram. The results show that the new system has several significant characteristics. First, the new system has a constant Lyapunov exponent, transient chaos and one complete Feigenbaum tree. Second, the system has the phenomenon of bifurcation map shifts that depend on the initial conditions. In addition, we find periodic bursting oscillations, chaotic bursting oscillations, and the transition of chaotic bursting oscillations to periodic bursting oscillations. In particular, when the system parameters take different discrete values, the system generates a bubble phenomenon that varies with the initial conditions, and this bubble can be shifted with the initial values, which has rarely been seen in the previous literature. The implementation by field-programmable gate array (FPGA) and analog circuit simulation show close alignment with the MATLAB numerical simulation results, validating the system's realizability. Additionally, the image encryption algorithm integrating DNA-based encoding and chaotic systems further demonstrates its practical applicability.

Key words: coexistence bubble, extreme multistability, clustered oscillation, anti-monotonicity

中图分类号: (Bifurcation theory)

02.30.Oz

05.45.Pq (Numerical simulations of chaotic systems) 07.50.Ek (Circuits and circuit components)

Da Qiu(邱达), Bo Zhang(张博), Tingting Zhang(张婷婷), Song Liu(刘嵩), and Peiyu He(何培宇). Analysis and image encryption of memristive chaotic system with coexistence bubble[J]. 中国物理B, 2025, 34(4): 40203-040203.

Da Qiu(邱达), Bo Zhang(张博), Tingting Zhang(张婷婷), Song Liu(刘嵩), and Peiyu He(何培宇). Analysis and image encryption of memristive chaotic system with coexistence bubble[J]. Chin. Phys. B, 2025, 34(4): 40203-040203.

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Analysis and image encryption of memristive chaotic system with coexistence bubble

Analysis and image encryption of memristive chaotic system with coexistence bubble

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