Fractals/Iterations in the complex plane/boettcher

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Contents

1 Intro
2 References

Intro [edit]

Superattracting fixed points [edit]

For complex quadratic polynomial there are many superattracting fixed point ( with multiplier = 0 ):

infinity ( It is always is superattracting fixed point for polynomials )
$z_s = 0 \,$ is finite superattracting fixed point for map $f_0\,$
$z_s = 0 \,$ and $z_s = -1 \,$ are two finite superattracting fixed points for map $f_{-1}\,$

Description [edit]

Near^[1] super attracting fixed point (for example infinity) the behaviour of discrete dynamical system :

$z_{n+1} = f_c(z_n) = z_n^2 + c \,$

based on complex quadratic polynomial $f_c(z) = z^2 + c\,$ is similar to

$w_{n+1} = f_0(w_n) = w_n^2 \,$

based on $f_0(w) = w^2\,$

It can be treated as one dynamical system viewed in two coordinate systems :

easy ( w )
hard to analyse( z )

In other words map $f_c\,$ is conjugate ^[3] to map $f_0\,$ near infinity. ^[4]

History [edit]

In 1904 LE Boettcher solved Schröder equation^[5]^[6] in case of supperattracting fixed point^[7]

Names [edit]

$w\,$ is Boettcher coordinate
$\Phi_c \,$ is Boettcher function
Boettcher Functional Equation ^[8]^[9]: $\Phi_c(f_c(z)) = \Phi_c(z)^2 \,$

where :

$w = \Phi_c(z)\,$

References [edit]

↑ Neighbourhood in wikipedia
↑ The work of George Szekeres on functional equations by Keith Briggs
↑ Topological conjugacy in wikipedia
↑ How to draw external rays by Wolf Jung
↑ Schröder equation in wikipedia
↑ Lucjan Emil Böttcher and his mathematical legacy by Stanislaw Domoradzki, Malgorzata Stawiska
↑ L. E. Boettcher, The principal laws of convergence of iterates and their aplication to analysis (Russian), Izv. Kazan. fiz.-Mat. Obshch. 14) (1904), 155-234.
↑ Böttcher equation at Hyperoperations Wiki
↑ wikipedia : Böttcher's equation

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Fractals