User:OdedSchramm/sb3

The Koebe 1/4 theorem states that the image of an injective analytic function ${\displaystyle f:\mathbb {D} \to \mathbb {C} }$ from the unit disk ${\displaystyle \mathbb {D} }$ onto a subset of the complex plane contains the disk whose center is ${\displaystyle f(0)}$ and whose radius is ${\displaystyle |f\,'(0)|/4}$. The theorem is named after Paul Koebe, who conjectured the result in 1907. The theorem was proven by Ludwig Bieberbach in 1914. The Koebe function ${\displaystyle f(z)=z/(1-z)^{2}}$ shows that the constant ${\displaystyle 1/4}$ in the theorem cannot be improved.

Proof[edit]

There is a proof based on the area theorem and some power series calculations. Following is a proof based on the notion and properties of extremal length.

We start by assuming that ${\displaystyle f(0)=1}$ and ${\displaystyle 0\notin f(\mathbb {D} )}$. Since every point ${\displaystyle z_{0}\neq 0}$ has a neighborhood in which ${\displaystyle {\sqrt {z}}}$ can be defined as an analytic function, the monodromy theorem implies that there is an analytic function ${\displaystyle g:\mathbb {D} \to \mathbb {C} }$ such that ${\displaystyle g(z)^{2}=f(z)}$ for every ${\displaystyle z\in \mathbb {D} }$. Fix such a ${\displaystyle g}$ satisfying ${\displaystyle g(0)=1}$. Note that since ${\displaystyle f}$ is injective, also ${\displaystyle g}$ must be injective, and moreover, ${\displaystyle g(\mathbb {D} )\cap -g(\mathbb {D} )=\emptyset }$. This implies that for all ${\displaystyle r>0}$ sufficiently small so that ${\displaystyle g(\mathbb {D} )\supset B(1,r)}$, the extremal distance in ${\displaystyle \mathbb {C} }$ from ${\displaystyle B(1,r)}$ to ${\displaystyle B(-1,r)}$ is at least twice the extremal distance from ${\displaystyle B(1,r)}$ to the boundary of ${\displaystyle g(\mathbb {D} )}$.