Analysis and implementation of simple four-dimensional memristive chaotic system with infinite coexisting attractors

Using memristors to construct special chaotic systems is highly interesting and meaningful. A simple four-dimensional memristive chaotic system with an infinite number of coexisting attractors is proposed in this paper, which has a relatively simple form but demonstrates complex dynamical behavior. Here, we use digital simulations to further investigate the system and utilize the bifurcation diagrams to describe the evolution of the dynamical behavior of the system with the influence of parameters. We find that the system can generate an abundance of chaotic and periodic attractors under different parameters. The amplitudes of the oscillations of the state variables of the system are closely dependent on the initial values. In addition, the experimental results of the circuit are consistent with the digital simulations, proving the existence and feasibility of this memristive chaotic system.

Automated summary

This paper proposes a simple four-dimensional memristive chaotic system with an infinite number of coexisting attractors, which exhibits complex dynamical behavior. The system is further investigated through digital simulations and the results are consistent with the experimental findings, demonstrating the feasibility and existence of this memristive chaotic system.