# meromorphic

Let $U\subset \u2102$ be a domain. A function $f:U\to \u2102$ 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^{}.

Title | meromorphic |
---|---|

Canonical name | Meromorphic |

Date of creation | 2013-03-22 12:05:53 |

Last modified on | 2013-03-22 12:05:53 |

Owner | djao (24) |

Last modified by | djao (24) |

Numerical id | 7 |

Author | djao (24) |

Entry type | Definition |

Classification | msc 30D30 |