meromorphic
Let be a domain. A function is meromorphic if is holomorphic except at an isolated set of poles.
It can be proven that if is meromorphic then its set of poles does not have an accumulation point.
Title | meromorphic |
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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 |