PlanetMath: chaotic dynamical system

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chaotic dynamical system

(Definition)

As Strogatz says in reference [1], “No definition of the term chaos is universally accepted yet, but almost everyone would agree on the three ingredients used in the following working definition”.

Chaos is the aperiodic long-term behavior in a deterministic system that exhibits sensitive dependence on initial conditions.

Aperiodic long-term behavior means that there are trajectories which do not settle down to fixed points, periodic orbits, or quasiperiodic orbits as $t \to \infty$ . For the purposes of this definition, a trajectory which approaches a limit of $\infty$ as $t \to \infty$ should be considered to have a fixed point at $\infty$ .

Sensitive dependence on initial conditions means that nearby trajectories separate exponentially fast; i.e., the system has a positive Liapunov exponent.

Strogatz notes that he favors additional constraints on the aperiodic long-term behavior, but leaves open what form they may take. He suggests two alternatives to fulfill this:

Requiring that there exists an open set of initial conditions having aperiodic trajectories, or
If one picks a random initial condition then there must be a nonzero chance of the associated trajectory being aperiodic.