Tinkerbell map

The Tinkerbell map is a discrete-time dynamical system given by:

${\displaystyle x_{n+1}=x_{n}^{2}-y_{n}^{2}+ax_{n}+by_{n}}$

${\displaystyle y_{n+1}=2x_{n}y_{n}+cx_{n}+dy_{n}}$

Tinkerbell attractor with a=0.9, b=-0.6013, c=2, d=0.5. Used starting values of ${\displaystyle x_{0}=-0.72}$ and ${\displaystyle y_{0}=-0.64}$.

Some commonly used values of a, b, c, and d are

• ${\displaystyle a=0.9,b=-0.6013,c=2.0,d=0.50}$
• ${\displaystyle a=0.3,b=0.6000,c=2.0,d=0.27}$

Like all chaotic maps, the Tinkerbell Map has also been shown to have periods; after a certain number of mapping iterations any given point shown in the map to the right will find itself once again at its starting location.

The origin of the name is uncertain; however, the graphical picture of the system (as shown to the right) shows a similarity to the movement of Tinker Bell over Cinderella Castle, as shown at the beginning of all films produced by Disney.

Tinkerbell attractor with a=0.9, b=-0.6013, c=2. Used starting values of Xo = -0.7, Yo= -0.6. I vary d value from 0.5 to 0.4.