Casorati-Weierstrass theorem

The Casorati-Weierstrass theorem is a statement about the behavior of Holomorphic function in the vicinity of Isolated singularity. It essentially states that in every neighborhood of an essential singularity, every complex number can be arbitrarily closely approximated by the values of the function. It is a significantly easier-to-prove weakening of the great Picard theorem, which states that in every neighborhood of an essential singularity, every complex number (except possibly one) occurs infinitely often as a value.

Let ${\displaystyle G\subseteq ℂ}$ be open, and ${\displaystyle z_0\in G}$. Let ${\displaystyle f:G\setminus \{z_0\}\to ℂ}$ be a Holomorphic function. Then, ${\displaystyle f}$ has an Isolated singularity at ${\displaystyle z_0}$ if and only if for every neighborhood ${\displaystyle U\subseteq G}$ of ${\displaystyle z_0}$: ${\displaystyle \overline{f(U\setminus z_0)}=ℂ}$.

First, assume that ${\displaystyle z_0}$ is an essential singularity of ${\displaystyle f}$, and suppose there exists an ${\displaystyle r>0}$ such that${\displaystyle f(B_r(z_0)\setminus \{z_0\})}$ is not dense in ${\displaystyle ℂ}$. Then there exists an ${\displaystyle ϵ>0}$ and a ${\displaystyle w_0\in ℂ}$ such that ${\displaystyle B_{ϵ}(w_0)}$ and ${\displaystyle f(B_r(z_0)\setminus z_0)}$ are disjoint. Consider ${\displaystyle B_r(z_0)\setminus \{z_0\}}$ the function. ${\displaystyle g(z):=\frac{1}{f(z)-w_0}}$.Let ${\displaystyle r}$ be chosen so that ${\displaystyle z_o}$ is the only ${\displaystyle w_0}$-pole in ${\displaystyle f(B_r(z_0))}$. This is possible by the Identity Theorem for non-constant holomorphic functions. Since ${\displaystyle f}$ is not constant (as it has an essential singularity), it is holomorphic and bounded by ${\displaystyle \frac{1}{ϵ}}$. By the Riemann Removability Theorem, ${\displaystyle g}$ is therefore holomorphically extendable to all of ${\displaystyle B_r(z_0)}$. Since ${\displaystyle g\ne 0}$ there exists an ${\displaystyle m\ge 0}$ and a holomorphic function ${\displaystyle g_0:B_r(z_0)\to ℂ}$ with ${\displaystyle g_0(z_0)\ne 0}$, such that

${\displaystyle g(z)=(z-z_0{)}^m{g}_0(z),|z-z_0|<r.}$

It follows that

${\displaystyle f(z)=w_0+\frac{1}{(z-z_0{)}^m{g}_0(z)}}$

and thus

${\displaystyle f(z)(z-z_0{)}^m=w_0(z-z_0{)}^m+\frac{1}{g_0(z)}}$

Since ${\displaystyle g_0(z_0)\ne 0}$,is ${\displaystyle \frac{1}{g}}$ is holomorphic in a neighborhood of ${\displaystyle z_0}$. Therefore, ${\displaystyle f\cdot (\cdot -z_0{)}^m}$ is holomorphic in a neighborhood of ${\displaystyle z_0}$, meaning that ${\displaystyle f}$ has at most a pole of order ${\displaystyle m}$ at ${\displaystyle z_0}$, which leads to a contradiction.Conversely. let ${\displaystyle z_0}$ be a removable singularity or a pole of ${\displaystyle f}$. Is ${\displaystyle z_0}$ is a removable singularity, there exists a neighborhood ${\displaystyle U}$ of ${\displaystyle z_0}$,where ${\displaystyle f}$ is bounded, say ${\displaystyle |f(z)|\le M}$ for ${\displaystyle z\in U\setminus \{z_0\}}$.Then it follows that

${\displaystyle \overline{f(U\setminus \{z_0\})}\subseteq {\overline{B}}_M(0)\ne ℂ.}$

If ${\displaystyle z_0}$ is a pole of order ${\displaystyle m}$ for ${\displaystyle f}$, there exists a neighborhood ${\displaystyle U}$ of ${\displaystyle z_0}$ and a holomorphic function ${\displaystyle g:U\to ℂ}$ with ${\displaystyle g(z_0)\ne 0}$ and ${\displaystyle f(z)=g(z)(z-z_0{)}^{-m}}$. Choose a neighborhood ${\displaystyle ϵ>0}$ such that ${\displaystyle |g(z)|\ge \frac{1}{2}|g(z_0)|}$ for ${\displaystyle |z-z_0|<ϵ}$. Then it follows that

${\displaystyle |f(z)|=|g(z)||z-z_0{|}^{-m}\ge \frac{1}{2}|g(z_0)|\cdot {ϵ}^{-m},0<|z-z_0|<ϵ}$

Thus, ${\displaystyle 0\in ̸\overline{f(B_{ϵ}(z_0)\setminus \{z_0\})}}$ and this proves the claim.

• Complex Analysis

• Identity Theorem

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• Source: Satz von Casorati-Weierstraß - URL:

https://de.wikiversity.org/wiki/Satz_von_Casorati-Weierstraß

• Date: 1/2/2025

de:Satz von Casorati-Weierstraß