10/02/2007, 06:39 PM
Here is a little animated gif that shows how the fixed points in the complex plane change in dependency on the base \( b \).
For \( \eta=e^{1/e} \) the animation shows b going through \( \eta+0.2 \dots \eta-0.1 \).
One can clearly see, how the conjugated primary complex fixed points transform into two real fixed points after \( b \) goes below \( \eta \).
For \( \eta=e^{1/e} \) the animation shows b going through \( \eta+0.2 \dots \eta-0.1 \).
One can clearly see, how the conjugated primary complex fixed points transform into two real fixed points after \( b \) goes below \( \eta \).
