In this paper, a new commensurate fractional-order chaotic oscillator is presented. The mathematical model with a weak feedback term, which is named hypogenetic flow, is proposed based on the Liu system. And with changing the parameters of the system, the hidden attractor can have no equilibrium points or line equilibrium. What is more interesting is that under the occasion that no equilibrium point can be obtained, the phase trajectory can converge to a minimal field under the lead of some initial conditions, similar to the fixed point. We call it the virtual equilibrium point. On the other hand, when the value of parameters can produce an infinite number of equilibrium points, the line equilibrium points are nonhyperbolic. Moreover than t...
This paper studies the dynamics of a new fractional-order map with no fixed points. Through phase pl...
This paper presents the fractional-order projection of a chaotic system, which delivers a collection...
A novel nonlinear four-dimensional hyperchaotic system and its fractional-order form are presented. ...
Memristor and fractional-order derivatives are feasible options for constructing new systems with co...
Fractional order systems have a wider range of applications. Hidden attractors are a peculiar phenom...
In this work, a new fractional-order chaotic system with a single parameter and four nonlinearities ...
Some endeavors have been recently dedicated to explore the dynamic properties of the fractional-orde...
In this article, we present a nonlinear model of the Liu system that includes fractional derivatives...
Fractional order maps are a hot research topic; many new mathematical models are suitable for develo...
Fractional calculus has always been regarded as an ideal mathematical tool to describe the memory of...
There are many works on self-excited and hidden attractors. However the relationship between them is...
AbstractPresent paper deals with fractional version of a dynamical system introduced by C. Liu, L. L...
Based on the segmented disc dynamo proposed by H. K. Moffatt, we give out the hidden chaotic attract...
In this paper a new dynamic system with integer and fractional order is investigated. It is shown th...
A 3D fractional-order nonlinear system with coexisting chaotic attractors is proposed in this paper....
This paper studies the dynamics of a new fractional-order map with no fixed points. Through phase pl...
This paper presents the fractional-order projection of a chaotic system, which delivers a collection...
A novel nonlinear four-dimensional hyperchaotic system and its fractional-order form are presented. ...
Memristor and fractional-order derivatives are feasible options for constructing new systems with co...
Fractional order systems have a wider range of applications. Hidden attractors are a peculiar phenom...
In this work, a new fractional-order chaotic system with a single parameter and four nonlinearities ...
Some endeavors have been recently dedicated to explore the dynamic properties of the fractional-orde...
In this article, we present a nonlinear model of the Liu system that includes fractional derivatives...
Fractional order maps are a hot research topic; many new mathematical models are suitable for develo...
Fractional calculus has always been regarded as an ideal mathematical tool to describe the memory of...
There are many works on self-excited and hidden attractors. However the relationship between them is...
AbstractPresent paper deals with fractional version of a dynamical system introduced by C. Liu, L. L...
Based on the segmented disc dynamo proposed by H. K. Moffatt, we give out the hidden chaotic attract...
In this paper a new dynamic system with integer and fractional order is investigated. It is shown th...
A 3D fractional-order nonlinear system with coexisting chaotic attractors is proposed in this paper....
This paper studies the dynamics of a new fractional-order map with no fixed points. Through phase pl...
This paper presents the fractional-order projection of a chaotic system, which delivers a collection...
A novel nonlinear four-dimensional hyperchaotic system and its fractional-order form are presented. ...