A snail-shaped chaotic system with large bandwidth: dynamical analysis, synchronization and secure communication scheme

Abstract: In this paper, a snail-shaped chaotic system with large bandwidth is first introduced, it contains two quadratic, one cubic and two quartic nonlinear terms. The new snail-shaped autonomous system can exhibit periodic, quasi-periodic and chaotic behaviors with the variations of its parameters. The major properties of the proposed model are discussed using equilibrium points, Kaplan-Yorke dimension, Lyapunov exponents spectrum and bifurcation diagrams. The feasibility of the snail-shaped system is verified by im… Show more

“…As it can be seen from Table 1, the proposed system has a higher Kaplan-Yorke dimension compared to other systems, so it is more complex. To illustrate the complexity of System (33), a comparison is made between the Kaplan-Yorke dimension of the proposed chaotic system and the well-known new chaotic systems [18]. As it can be seen from Table 1, the proposed system has a higher Kaplan-Yorke dimension compared to other systems, so it is more complex.…”

“…In chaos control and synchronization, the use of an appropriate control approach can make the proposed design attractive, especially when the chaotic system has a complex dynamic structure [17]. For example, in [18], a complex spiral-shaped chaotic system is used for synchronization. Nonlinear analysis and orbital design of the proposed system have been performed.…”

Nonsingular Terminal Sliding Mode Control Based on Adaptive Barrier Function for nth-Order Perturbed Nonlinear Systems

“…As it can be seen from Table 1, the proposed system has a higher Kaplan-Yorke dimension compared to other systems, so it is more complex. To illustrate the complexity of System (33), a comparison is made between the Kaplan-Yorke dimension of the proposed chaotic system and the well-known new chaotic systems [18]. As it can be seen from Table 1, the proposed system has a higher Kaplan-Yorke dimension compared to other systems, so it is more complex.…”

“…In chaos control and synchronization, the use of an appropriate control approach can make the proposed design attractive, especially when the chaotic system has a complex dynamic structure [17]. For example, in [18], a complex spiral-shaped chaotic system is used for synchronization. Nonlinear analysis and orbital design of the proposed system have been performed.…”

Nonsingular Terminal Sliding Mode Control Based on Adaptive Barrier Function for nth-Order Perturbed Nonlinear Systems

Generalized synchronization of commensurate fractional-order chaotic systems: Applications in secure information transmission

Finite-time synchronization of multi-scroll hyperchaotic system and its application in image encryption