Complex Analysis/chain

Definition - Chain

Let $G\subseteq \mathbb {C}$ be a region, $n\in \mathbb {N}$ and let $\gamma _{i}\colon [a_{i},b_{i}]\to G$ be curves in $G$ and $n_{i}\in \mathbb {Z}$ . Then the formal linear combination $\sum _{i=1}^{n}n_{i}\gamma _{i}$ is called a chain in $\mathbb {C}$ . The set of all chains in $G$ that form an abelian group in a natural way is denoted by $C(G)$ .

Definition - Trace of a chain

The trace of a chain $\Gamma$ is the union of the traces of the individual curves $\gamma _{i}$ , i.e.

\mathrm {Spur} (\Gamma ):=\bigcup _{i=1}^{n}\mathrm {Spur} (\gamma _{i})

Cycle

A chain $\Gamma =\sum _{i=1}^{n}n_{i}\gamma _{i}\in C(G)$ with $\gamma _{i}\colon [a_{i},b_{i}]\to G$ is called a cycle if every point in $G$ appears the same number of times as the starting and ending point of curves in $G$ , i.e. if

\sum _{i=1}^{n}n_{i}|\{i:\gamma _{i}(a_{i})=z\}|=\sum _{i=1}^{n}n_{i}|\{i:\gamma _{i}(b_{i})=z\}|

holds for every $z\in G$ .

Inner and outer regions

Let $\Gamma$ be a cycle in $\mathbb {C}$ , using theWinding number, we can consider a decomposition of $\mathbb {C}$ determined by $\Gamma$ into three parts, namely:

The image of the trace of $\Gamma$
The outer region, the points that are not traversed by $\Gamma$ , i.e.

A_{\Gamma }:=\{z\in \mathbb {C} \setminus \mathrm {Spur} (\Gamma ):n(\Gamma ,z)=0\}

The inner region are the points that are traversed by $\Gamma$ , i.e.

I_{\Gamma }:=\{z\in \mathbb {C} \setminus \mathrm {Spur} (\Gamma ):n(\Gamma ,z)\neq 0\}

Page information

This learning resource can be presented as a Wiki2Reveal-Foliensatz.

Wiki2Reveal

This Wiki2Reveal Foliensatz was created for the learning unit Kurs:Funktionentheorie'. The link for the Wiki2Reveal-Folien was created with the Wiki2Reveal-Linkgenerator.

The contents of the page are based on the following contents:
- https://de.wikiversity.org/wiki/Kurs:Funktionentheorie/Kette
The page was created as a document type PanDocElectron-SLIDE.
Link to the source in Wikiversity: https://de.wikiversity.org/wiki/Kurs:Funktionentheorie/Kette
See also further information about Wiki2Reveal and under Wiki2Reveal-Linkgenerator.
Next content of the course is [[]]