一类随机耦合 Lorenz 映射的渐近行为

Abstract

Abstract:

This paper investigates the mixing property of a class of piecewise linear Lorenz maps and the existence of absolutely continuous invariant measures for their stochastically coupled counterparts. Applying renormalization theory, it is rigorously proved that two deterministic maps within this Lorenz framework exhibit mixing. Based on this foundation, numerical experiments are designed, revealing a peculiar phenomenon of synchronized chaos: while both deterministic maps have positive Lyapunov exponents, the corresponding stochastic map possesses a negative Lyapunov exponent while still maintaining an absolutely continuous invariant measure. Further research demonstrates that this stochastic map not only possesses global ergodicity but can also induce the emergence of synchronization phenomena.

Key words: Lorenz map, trivial renormalization, random map, absolutely continuous invariant measure.

CLC Number:

O193

Bowen Zheng, Liang Zhang. The Asymptotic Behavior of a Class of Randomly Coupled Lorenz Maps[J].Acta mathematica scientia,Series A, 2026, 46(3): 939-948.

Trendmd

Figures/Tables 5

References 19

[1]	Boyarsky A, Pawel G. Laws of Chaos:Invariant Measures and Dynamical Systems in One Dimension. Boston: Birkhauser, 1997
[2]	Viana M. Foundations of Ergodic Theory. Cambridge: Cambridge University Press, 2016
[3]	Lasota A, Yorke J A. On the existence of invariant measures for piecewise monotonic transformations. Transactions of the American Mathematical Society, 1973, 186 : 481-488 doi: 10.1090/S0002-9947-1973-0335758-1
[4]	Lasota A, Mackey M C. Chaos, Fractals, and Noise: Stochastic Aspects of Dynamics. New York: Springer-Verlag, 1994
[5]	Barrientos P G. A family of eventually expanding piecewise linear maps of the interval. The American Mathematical Monthly, 2015, 122 (7): 674-680 doi: 10.4169/amer.math.monthly.122.7.674
[6]	Peyman E, Pawel G. On eventually expanding maps of the interval. The American Mathematical Monthly, 2011, 118 (7): 629-635 doi: 10.4169/amer.math.monthly.118.07.629
[7]	Pelikan S. Invariant densities for random maps of the interval. Transactions of the American Mathematical Society, 1984, 281 (2): 813-825 doi: 10.1090/tran/1984-281-02
[8]	Kalle C, Maggioni M. Invariant densities for random systems of the interval. Ergodic Theory and Dynamical System, 2022, 42 (1): 79-141
[9]	Ding Y M, Fan A H, Yu J H. Absolutely continuous invariant measures of piecewise linear Lorenz maps. arXiv: 1001.3014
[10]	Dorfman J R. An Introduction to Chaos in Nonequilibrium Statistical Mechanics. Cambridge: Cambridge University Press, 1999
[11]	Eckmann J P, Ruelle D. Ergodic theory of chaos and strange attractors. Reviews of Modern Physics, 1985, 57 (3): 617-656 doi: 10.1103/RevModPhys.57.617
[12]	Wolf A, Swift J B, Swinney H L, et al. Determining Lyapunov exponents from a time series. Nonlinear Phenomena, 1985, 16 (3): 285-317 doi: 10.1016/0167-2789(85)90011-9
[13]	Cui H F, Ding Y M. Renormalization and conjugacy of piecewise linear Lorenz maps. Advances in Mathematics, 2015, 271 : 235-272 doi: 10.1016/j.aim.2014.11.024
[14]	Ding Y M. Renormalization and $\alpha$-limit set for expanding Lorenz map. Continuous Dynamical Systems, 2011, 29 : 979-999
[15]	Birkhoff G D. Proof of the ergodic theorem. Proceedings of the National Academy of Science, 1931, 17 (12): 656-660
[16]	Walters P. An Introduction to Ergodic Theory. New York: Springer-Verlag, 1982
[17]	孙文祥. 遍历论. 北京: 北京大学出版社, 2018
	Sun W X. Ergodic Theory. Beijing: Peking University Press, 2018
[18]	Kocarev L, Tasev Z. Lyapunov exponents, noise-induced synchronization, and Parrondo's paradox. Physical Review E, 2002, 65 (4): Art 046215
[19]	Szczepański J, Kotulski Z. Pseudorandom number generators based on chaotic dynamical systems. Open System and Information Dynamics, 2001, 8 (1): 137-146 doi: 10.1023/A:1011950531970

The Asymptotic Behavior of a Class of Randomly Coupled Lorenz Maps

RichHTML

PDF (PC)

Abstract

Cite this article

share this article

Figures/Tables 5

References 19

Related Articles 15

Metrics

Comments

Recommended 0

[1]	Yiyao Yang, Jinping Jiang, Nannan Ma. Stochastic Attractors and Invariant Measures for Fractional Nonlocal Reaction-Diffusion Equations [J]. Acta mathematica scientia,Series A, 2026, 46(3): 949-962.
[2]	Yuan Lian, Hongjun Liu. An Entropy of an Extended Map of Amenable Group Actions [J]. Acta mathematica scientia,Series A, 2026, 46(1): 359-365.
[3]	Manlu He, Dingshi Li. Statistical Solutions for the Nonautonomous Discrete Modified Swift-Hohenberg Equation in Weighted Spaces [J]. Acta mathematica scientia,Series A, 2025, 45(5): 1586-1601.
[4]	LI Yazhi, Liu Lili, Tian Yanni. Optimal Control Strategy for the SVEITR Pulmonary Tuberculosis Transmission Model Considering Diffusion [J]. Acta mathematica scientia,Series A, 2025, 45(3): 934-945.
[5]	Lin Yanxue. Dynamical Localization for the CMV Matrices with Verblunsky Coeffcients Defined by the Skew-Shift [J]. Acta mathematica scientia,Series A, 2025, 45(2): 334-346.
[6]	Zhang Yiran, Li Dingshi. Invariant Measure of Impulsive Fractional Lattice System [J]. Acta mathematica scientia,Series A, 2024, 44(6): 1563-1576.
[7]	Lian Yuan, Liu Hongjun, Zhu Bin. Weyl Mean Equicontinuity and Weyl Mean Sensitivity of A Random Dynamical System [J]. Acta mathematica scientia,Series A, 2024, 44(6): 1595-1606.
[8]	Xiao Jianrong. Robust Accessible Hyperbolic Repelling Sets [J]. Acta mathematica scientia,Series A, 2024, 44(1): 1-11.
[9]	Fu Qinhong, Xiong Lianglin, Zhang Haiyang, Qin Ya, Quan Shenai. Sliding Mode Control for Time-Varying Delay Systems with Semi-Markov Jump [J]. Acta mathematica scientia,Series A, 2023, 43(2): 549-562.
[10]	Zhu Kaixuan, Sun Tao, Xie Yongqin. Global Attractors for a Class of Reaction-Diffusion Equations with Distribution Derivatives in $\Bbb R ^{n}$ [J]. Acta mathematica scientia,Series A, 2023, 43(1): 82-92.
[11]	Kaixuan Zhu,Yongqin Xie,Xinyu Mei,Xijun Deng. Uniform Attractors for the Sup-Cubic Weakly Damped Wave Equations with Delays [J]. Acta mathematica scientia,Series A, 2022, 42(1): 86-102.
[12]	Yue Sun,Daoxiang Zhang,Wen Zhou. The Influence of Fear Effect on Stability Interval of Reaction-Diffusion Predator-Prey System with Time Delay [J]. Acta mathematica scientia,Series A, 2021, 41(6): 1980-1992.
[13]	Xiaofang Yang,Xiao Tang,Tianxiu Lu. The Collectively Sensitivity and Accessible in Non-Autonomous Composite Systems [J]. Acta mathematica scientia,Series A, 2021, 41(5): 1545-1554.
[14]	Kaixuan Zhu,Yongqin Xie,Feng Zhou,Xijun Deng. Pullback Attractors for the Complex Ginzburg-Landau Equations with Delays [J]. Acta mathematica scientia,Series A, 2020, 40(5): 1341-1353.
[15]	Lan Xu. Another Proof of Variational Principle for Sub-Additive Potentials [J]. Acta mathematica scientia,Series A, 2020, 40(4): 977-982.