Riemann Removability Theorem

Statement

Let $G \subseteq ℂ$ be a domain, $z_{0} \in G$ , and $f : G ∖ z_{0} \to ℂ$ be holomorphic. Then $f$ can be holomorphically extended to $z_{0}$ if and only if there exists a neighborhood $U \subseteq G$ of $z_{0}$ such that $f$ is bounded on $U ∖ z_{0}$ .

Proof

Let $r > 0$ be chosen such that ${\bar{B}}_{r} (z_{0}) \subseteq U$ , and let $M$ be an upper bound for $f$ on $U$ .

We consider the Laurent Series of $f$ around $z_{0}$ . It is

f (z) = \sum_{n = - \infty}^{\infty} a_{n} (z - z_{0})^{n}, a_{n} = \frac{1}{2 π i} \int_{| w - z_{0} | = r} \frac{f (w)}{(w - z_{0})^{n + 1}} d w

Estimating

a_{n}

gives the so-called Cauchy estimates, namely

\begin{matrix} | a_{n} | & = | \frac{1}{2 π i} \int_{| w - z_{0} | = r} \frac{f (w)}{(w - z_{0})^{n + 1}} d w | \\ \leq \frac{1}{2 π} \int_{| w - z_{0} | = r} \frac{| f (w) |}{| w - z_{0} |^{n + 1}} | d w | \\ \leq \frac{1}{2 π} \int_{| w - z_{0} | = r} \frac{M}{r^{n + 1}} | d w | \\ = \frac{M}{r^{n}} \end{matrix}

For

n < 0

, it follows that

| a_{n} | \leq \frac{M}{r^{n}} = M r^{- n} \to 0, r \to 0

Thus,

a_{n} = 0

for all

n < 0

, meaning we have

f (z) = \sum_{n = 0}^{\infty} a_{n} (z - z_{0})^{n}

, and

f (z_{0}) : = a_{0}

is a holomorphic extension of

f

to

z_{0}

.

Translation and Version Control

This page was translated based on the following [https://de.wikiversity.org/wiki/Riemannscher Hebbarkeitssatz Wikiversity source page] and uses the concept of Translation and Version Control for a transparent language fork in a Wikiversity:

Source: Riemannscher Hebbarkeitssatz - URL:https://de.wikiversity.org/wiki/Riemannscher Hebbarkeitssatz
Date: 11/26/2024

de:Riemannscher Hebbarkeitssatz

Riemann Removability Theorem

Statement

Proof

Translation and Version Control

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