## You are here

Homemeromorphic

## Primary tabs

# meromorphic

Let $U\subset\mathbb{C}$ be a domain. A function $f\colon U\to\mathbb{C}$ is *meromorphic* if $f$ is holomorphic except at an isolated set of poles.

It can be proven that if $f$ is meromorphic then its set of poles does not have an accumulation point.

Type of Math Object:

Definition

Major Section:

Reference

Groups audience:

## Mathematics Subject Classification

30D30*no label found*

- Forums
- Planetary Bugs
- HS/Secondary
- University/Tertiary
- Graduate/Advanced
- Industry/Practice
- Research Topics
- LaTeX help
- Math Comptetitions
- Math History
- Math Humor
- PlanetMath Comments
- PlanetMath System Updates and News
- PlanetMath help
- PlanetMath.ORG
- Strategic Communications Development
- The Math Pub
- Testing messages (ignore)

- Other useful stuff