Coexisting Infinite Equilibria and Chaos

Author:

Li Chunbiao12ORCID,Peng Yuxuan23,Tao Ze23,Sprott Julien Clinton4,Jafari Sajad5

Affiliation:

1. School of Artificial Intelligence, Nanjing University of Information Science and Technology, Nanjing 210044, P. R. China

2. Jiangsu Collaborative Innovation Center of Atmospheric, Environment and Equipment Technology (CICAEET), Nanjing University of Information Science and Technology, Nanjing 210044, P. R. China

3. Jiangsu Key Laboratory of Meteorological Observation and Information Processing, Nanjing University of Information, Science and Technology, Nanjing 210044, P. R. China

4. Department of Physics, University of Wisconsin-Madison, Madison, WI 53706, USA

5. Biomedical Engineering Faculty, Amirkabir University of Technology, 424 Hafez Ave, 15875-4413, Tehran, Iran

Abstract

Equilibria are a class of attractors that host inherent stability in a dynamic system. Infinite number of equilibria and chaos sometimes coexist in a system with some connections. Hidden chaotic attractors exist independent of any equilibria rather than being excited by them. However, the equilibria can modify, distort, eliminate, or even instead coexist with the chaotic attractor depending on the distance between the equilibria and chaotic attractor. In this paper, chaotic systems with infinitely many equilibria are considered and explored. Extra surfaces of equilibria are introduced into the chaotic flows, showing that a chaotic system can maintain its basic dynamics if the newly added equilibria do not intersect the original attractor. The offset-boostable plane of equilibria rescales the frequency of the chaotic oscillation with an almost linearly modified largest Lyapunov exponent or conversely drives the system into periodic oscillation, even ending in a divergent state. Furthermore, additional infinite number of equilibria or even a solid space of equilibria are safely nested into the chaotic system without destroying the original dynamics, which provides an alternate permanent location for a dynamical system. A circuit simulation agrees with the numerical calculation.

Funder

National Natural Science Foundation of China

Natural Science Foundation of Jiangsu Province

Priority Academic Program Development of Jiangsu Higher Education Institutions

Publisher

World Scientific Pub Co Pte Lt

Subject

Applied Mathematics,Modelling and Simulation,Engineering (miscellaneous)

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