One numerical solution to the Rabinovich-Fabrikant system 01

Another numerical solution to the Rabinovich-Fabrikant system

The Rabinovich–Fabrikant equations are a set of three coupled

ordinary differential equations In mathematics, an ordinary differential equation (ODE) is a differential equation whose unknown(s) consists of one (or more) function(s) of one variable and involves the derivatives of those functions. The term ''ordinary'' is used in contrast w ...

exhibiting

chaotic Chaotic was originally a Danish trading card game. It expanded to an online game in America which then became a television program based on the game. The program was able to be seen on 4Kids TV (Fox affiliates, nationwide), Jetix, The CW4Kid ...

behaviour for certain values of the

parameter A parameter (), generally, is any characteristic that can help in defining or classifying a particular system (meaning an event, project, object, situation, etc.). That is, a parameter is an element of a system that is useful, or critical, when ...

s. They are named after

Mikhail Rabinovich Mikhail Izrailevich Rabinovich (MIR) (Russian: Михаи́л Изра́илевич Рабино́вич (MИР); born April 20, 1941) is a Russian influential physicist and neuroscientist working in the field of nonlinear dynamics and its applica ...

and

Anatoly Fabrikant Anatoly (russian: Анато́лий, Anatólij , uk, Анато́лій, Anatólij ) is a common Russian and Ukrainian male given name, derived from the Greek name ''Anatolios'', meaning "sunrise." Other common Russian transliterations are Ana ...

, who described them in 1979.

System description

The equations are: :

\dot = y (z - 1 + x^2) + \gamma x \,

\dot = x (3z + 1 - x^2) + \gamma y \,

\dot = -2z (\alpha + xy), \,

where ''α'', ''γ'' are constants that control the evolution of the system. For some values of ''α'' and ''γ'', the system is chaotic, but for others it tends to a stable periodic orbit. Danca and Chen note that the Rabinovich–Fabrikant system is difficult to analyse (due to the presence of quadratic and cubic terms) and that different attractors can be obtained for the same parameters by using different step sizes in the integration, see on the right an example of a solution obtained by two different solvers for the same parameter values and initial conditions. Also, recently, a

hidden attractor In the bifurcation theory, a bounded oscillation that is born without loss of stability of stationary set is called a hidden oscillation. In nonlinear control theory, the birth of a hidden oscillation in a time-invariant control system with bounde ...

was discovered in the Rabinovich–Fabrikant system.

Equilibrium points

Rabinovich-Fabrikant equilibrium point existence regions

The Rabinovich–Fabrikant system has five hyperbolic

equilibrium points In mathematics, specifically in differential equations, an equilibrium point is a constant solution to a differential equation. Formal definition The point \tilde\in \mathbb^n is an equilibrium point for the differential equation :\frac = \ma ...

, one at the origin and four dependent on the system parameters ''α'' and ''γ'': :

\tilde_0 = (0,0,0)

\tilde_ = \left( \pm q_-, - \frac, 1- \left(1-\frac\right)q_-^2 \right)

\tilde_ = \left( \pm q_+, - \frac, 1- \left(1-\frac\right)q_+^2 \right)

where :

q_ = \sqrt

These equilibrium points only exist for certain values of ''α'' and ''γ'' > 0.

γ = 0.87, α = 1.1

An example of chaotic behaviour is obtained for ''γ'' = 0.87 and ''α'' = 1.1 with initial conditions of (−1, 0, 0.5), see trajectory on the right. The

correlation dimension In chaos theory, the correlation dimension (denoted by ''ν'') is a measure of the dimensionality of the space occupied by a set of random points, often referred to as a type of fractal dimension. For example, if we have a set of random points on ...

was found to be 2.19 ± 0.01. The Lyapunov exponents, ''λ'' are approximately 0.1981, 0, −0.6581 and the Kaplan–Yorke dimension, ''D''_KY ≈ 2.3010

γ = 0.1

Danca and Romera showed that for ''γ'' = 0.1, the system is chaotic for ''α'' = 0.98, but progresses on a stable

limit cycle In mathematics, in the study of dynamical systems with two-dimensional phase space, a limit cycle is a closed trajectory in phase space having the property that at least one other trajectory spirals into it either as time approaches infinity ...

for ''α'' = 0.14. Rabinovich-Fabrikant LimitCicle

References

External links