Meromorphic function

Let ${\displaystyle U\subseteq \mathbb {C} }$  be open. A meromorphic function ${\displaystyle f}$  on ${\displaystyle U}$  is a function with a discrete set of singularities ${\displaystyle S\subseteq U}$  with

1. ${\displaystyle f\colon U\setminus S\to \mathbb {C} }$  is holomorphic.
2. ${\displaystyle f}$  has a pole at each point ${\displaystyle s\in S}$ .

We say that ${\displaystyle f}$  is meromorphic on ${\displaystyle U}$  and write ${\displaystyle f\in {\mathcal {M}}(U)}$ .

Note that a meromorphic function on ${\displaystyle U}$  is not defined on the entire set ${\displaystyle U}$ , but only on the complement of a discrete subset.

In the definition of singularities, the following three types of singularities were mentioned:

• Removable singularities,
• Poles (of order ${\displaystyle m}$ ),
• Essential singularities.

Meromorphic functions may only have poles in the set of singularities ${\displaystyle S}$ ; they must not have essential singularities.

1. The sum, difference, and product of two functions ${\displaystyle f,g\in {\mathcal {M}}(U)}$  are again meromorphic, so ${\displaystyle {\mathcal {M}}(U)}$  is an algebra over the ring of holomorphic functions on ${\displaystyle U}$ .Let ${\displaystyle S}$  be the set of poles of ${\displaystyle f}$  and ${\displaystyle T}$  the set of poles of ${\displaystyle g}$ . Then ${\displaystyle S\cup T}$  is a discrete subset of ${\displaystyle U}$ , and ${\displaystyle f+g,f-g,fg}$  are holomorphic on ${\displaystyle U\setminus (S\cup T)}$ , with removable singularities or poles on ${\displaystyle S\cup T}$ .
2. If ${\displaystyle U}$  is connected, ${\displaystyle f,g\in {\mathcal {M}}(U)}$ , and ${\displaystyle g\neq 0}$ , then ${\displaystyle f/g}$  is meromorphic on ${\displaystyle U}$ . In this case, ${\displaystyle {\mathcal {M}}(U)}$  is a field.Let ${\displaystyle S}$  be the set of poles of ${\displaystyle f}$  and ${\displaystyle T}$  the set of poles of ${\displaystyle g}$ . Since ${\displaystyle U\setminus T}$  is a domain, the zero set ${\displaystyle N}$  of ${\displaystyle g}$  is a discrete subset of ${\displaystyle U}$ , by the Identity Theorem. Now ${\displaystyle f/g\colon U\setminus (S\cup T\cup N)\to \mathbb {C} }$  is holomorphic, on ${\displaystyle S\cup T\cup N}$  has ${\displaystyle f/g}$  removable singularities or poles.
3. Locally, every meromorphic function is a quotient of two holomorphic functions. That is, if ${\displaystyle f\in {\mathcal {M}}(U)}$  and ${\displaystyle z_{0}\in U}$ , there exist a neighborhood ${\displaystyle V}$  of ${\displaystyle z_{0}}$  and holomorphic functions ${\displaystyle p,q\colon V\to \mathbb {C} }$  such that ${\displaystyle f=p/q}$ .A deeper result shows that for domains ${\displaystyle U}$ , such a representation is globally always possible. In this case, the field of meromorphic functions is the field of fractions of the ring of holomorphic functions on ${\displaystyle U}$ .

Another way to describe meromorphic functions on an open set ${\displaystyle U\subseteq \mathbb {C} }$  is to define them as holomorphic functions with values in the Riemann sphere.

Let ${\displaystyle U\subseteq \mathbb {C} }$ . A function ${\displaystyle f\colon U\to {\hat {\mathbb {C} }}}$  is called "holomorphic" at a point ${\displaystyle z_{0}\in U}$  with ${\displaystyle f(z_{0})\neq \infty }$  if there exists a neighborhood ${\displaystyle V}$  of ${\displaystyle z_{0}}$  such that ${\displaystyle f(V)\subseteq \mathbb {C} }$  and ${\displaystyle f|_{V}\colon V\to \mathbb {C} }$  is holomorphic at ${\displaystyle z_{0}}$ .${\displaystyle f}$  is called "holomorphic" at a point ${\displaystyle z_{0}}$  with ${\displaystyle f(z_{0})=\infty }$  if ${\displaystyle {\frac {1}{f}}}$  is holomorphic at ${\displaystyle z_{0}}$  in the above sense.

Let ${\displaystyle f\colon U\to {\hat {\mathbb {C} }}}$  be holomorphic with ${\displaystyle f(z_{0})=\infty }$ . If ${\displaystyle f}$  is not constant on any neighborhood of ${\displaystyle z_{0}}$ , then by the Identity Theorem, there exists a neighborhood ${\displaystyle V}$  of ${\displaystyle z_{0}}$  such that ${\displaystyle f|_{V\setminus {z_{0}}}\colon V\setminus {z_{0}}\to \mathbb {C} }$ . Since ${\displaystyle f}$  is holomorphic at ${\displaystyle z_{0}}$ , ${\displaystyle {\frac {1}{f}}}$  has a power series expansion at ${\displaystyle z_{0}}$ , say

Let ${\displaystyle m:=\min\{k:a_{k}\neq 0\}}$ . Then

Here,${\displaystyle g}$  is holomorphic with ${\displaystyle g(z_{0})\neq 0}$ , so ${\displaystyle 1/g}$  is holomorphic at ${\displaystyle z_{0}}$ . It follows that

thus, ${\displaystyle f}$  in ${\displaystyle z_{0}}$  has a pole of order ${\displaystyle m}$ .

Since poles can be described as points at infinity, we have: A meromorphic function ${\displaystyle f}$  on ${\displaystyle U\subseteq \mathbb {C} }$  is a holomorphic function ${\displaystyle f\colon U\to {\hat {\mathbb {C} }}}$  whose points at infinity do not accumulate (equivalently, ${\displaystyle f}$  is not constantly equal to ${\displaystyle \infty }$  on any component of ${\displaystyle U}$ ).

• Complex Analysis

This page was translated based on the following Wikiversity source page and uses the concept of Translation and Version Control for a transparent language fork in a Wikiversity:

• Source: Meromorphe Funktion - URL:

https://de.wikiversity.org/wiki/Meromorphe_Funktion

• Date: 01/07/2024