Jun 28, 2016 · Abstract: A novel 4-D hyperchaotic four-wing system with a saddle-focus equilibrium is introduced in this brief. The qualitative analysis of ...

Oct 22, 2024 · Most importantly, the new system generates fourwing and two-wing hyperchaotic attractor phenomenon with three and two positive Lyapunov ...

The qualitative analysis of the proposed 4-D hyperchaotic four-wing system with a saddle–focus equilibrium confirms its complex dynamic behavior, ...

All these chaotic systems have a number of equilibrium points and each wing of these chaotic systems wanders around a nonzero equilibrium point. Hyperchaotic ...

We construct a new four-dimensional autonomous hyperchaotic system. Theoretical numerical analysis has confirmed that this system only has one equilibrium ...

This paper presents a novel simple 4-D dissipative autonomous hyperchaotic system with a saddle-point index-2 equilibrium point that shows multistability ...

Dynamics around equilibria or saddle focus play significant role in creating chaotic attractors. As for a 3D or a 4D system with smooth quadratic terms, if ...

That is to say, each index-2 saddle-focus equilibrium point corresponds to a special wing in the multiwing hyper-chaotic attractors. A logical question is what ...

This paper presents a novel simple 4-D dissipative autonomous hyperchaotic system with a saddle-point index-2 equilibrium point.

The purpose of this paper is to introduce a novel four-dimensional conservative system with hyperchaotic behavior. This system is derived from the Lorenz-like ...