PlanetMath: Hartogs' theorem

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Hartogs' theorem

(Theorem)

Let $U\subset\C^n$ ($n>1$ ) be an open set, and let $K$ be a compact subset of $U$ such that $U-K$ is connected. Then any holomorphic function on $U-K$ extends uniquely to a holomorphic function on $U$ .

"Hartogs' theorem" is owned by mathcam. [ full author list (2) | owner history (1) ]

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Other names:

Hartogs' Phenomenon

Attachments:: proof of Hartogs' theorem (Proof) by jirka
failure of Hartogs' theorem in one dimension (Example) by jirka

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Cross-references: holomorphic function, connected, compact subset, open set
There are 6 references to this entry.

This is version 7 of Hartogs' theorem, born on 2003-01-10, modified 2008-05-27.
Object id is 3892, canonical name is HartogsTheorem.
Accessed 4501 times total.

Classification:

AMS MSC:

32H02 (Several complex variables and analytic spaces :: Holomorphic mappings and correspondences :: Holomorphic mappings, embeddings and related questions)

Pending Errata and Addenda

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