Orbit (dynamics)

Orbit (dynamics)
This article is licensed under the GNU Free Documentation License. It uses material from the Wikipedia article "Orbit_(dynamics)".

In mathematics, in the study of dynamical systems, an orbit is a collection of points related by the evolution function of the dynamical system. The orbit is a subset of the phase space and the set of all orbits is a partition of the phase space, that is different orbits do not intersect in the phase space. Understanding the properties of orbits by using topological method is one of the objectives of the modern theory of dynamical systems.

For discrete-time dynamical systems the orbits are sequences, for real dynamical systems the orbits are curves and for holomorphic dynamical systems the orbits are Riemann surfaces.

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1 Definition
2 Stability of orbits
3 See also
4 References

Definition

Given a dynamical system (T, M, Φ) with T a group, M a set and Φ the evolution function

$\Phi: T \times M \to M$

we define

$I(x):=\{t \in T : (t,x) \in T \times M \},$

then the set

$\gamma_x:=\{\Phi(t,x) : t \in I(x)\}$

is called orbit through x. An orbit which consists of a single point is called constant orbit. A non-constant orbit is called closed or periodic if there exists a t in T so that

Φ(t, x) = x

for every point x on the orbit.

Real dynamical system

Given a real dynamical system (R, M, Φ), I(x) is an open interval in the real numbers, that is $I(x) = ]t_x^- , t_x^+[$ . For any x in M

$\gamma_{x}^{+} := \{\Phi(t,x) : t \in ]0,t_x^+[\}$

is called positive semi-orbit through x and

$\gamma_{x}^{-} := \{\Phi(t,x) : t \in ]t_x^-,0[\}$

is called negative semi-orbit through x.

Notes

It is often the case that the evolution function can be understood to compose the elements of a group, in which case the group-theoretic orbits of the group action are the same thing as the dynamical orbits.

Examples

The orbit of a equilibrium point is a constant orbit

Stability of orbits

A basic classification of orbits is

constant orbits or fixed points
periodic orbits
non-constant and non-periodic orbits

An orbit can fail to be closed in two interesting ways. It could be an asymptotically periodic orbit if it converges to a periodic orbit. Such orbits are not closed because they never truly repeat, but they become arbitrarily close to a repeating orbit. An orbit can also be chaotic. These orbits come arbitrarily close to the initial point, but fail to ever converge to a periodic orbit. They exhibit sensitive dependence on initial conditions, meaning that small differences in the initial value will cause large differences in future points of the orbit.

There are other properties of orbits that allow for different classifications. An orbit can be hyperbolic if nearby points approach or diverge from the orbit exponentially fast.

References

Anatole Katok and Boris Hasselblatt (1996). Introduction to the modern theory of dynamical systems. Cambridge. ISBN 0-521-57557-5.

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