Isolated singularity: Difference between revisions

Latest revision as of 19:14, 18 May 2008

Definition

Suppose $U \subset C$ is an open subset and $f : U \to C$ is a holomorphic function. An isolated singularity for $f$ is a point $z_{0} \in C ∖ U$ such that there exists a neighborhood $V ∋ z_{0}$ such that $V ∖ z_{0} \subset U$ . In other words, it is a point outside $U$ , such that a small disc about the point, excluding the point itself, lies completely inside $U$ .

Classification

There are three types of isolated singularities:

Removable singularity

Further information: removable singularity

$z_{0}$ is a removable singularity if we can extend $f$ to a holomorphic function on the open subset $U \cup {z_{0}}$ .

Pole

Further information: pole

$z_{0}$ is a pole of order $n$ if the function $z \mapsto (z - z_{0})^{n} f (z)$ has a removable singularity at $z_{0}$ . The minimum such $n$ is termed the order of the pole at $z_{0}$ .

Essential singularity

Further information: essential singularity

$z_{0}$ is an essential singularity if it is a singularity that is neither removable nor a pole.

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 ==Definition==
-Suppose <math>U \subset \mathbb{C}</math> is an open subset and <math>f: U \to mathbb{C}</math> is a [[holomorphic function]]. An '''isolated singularity''' for <math>f</math> is a point <math>z_0 \in \mathbb{C} \setminus U</math> such that there exists a neighborhood <math>V \ni z_0</math> such that <math>V \setminus z_0 \subset U</math>. In other words, it is a point outside <math>U</math>, such that a small disc about the point, excluding the point itself, lies completely inside <math>U</math>.
+Suppose <math>U \subset \mathbb{C}</math> is an open subset and <math>f: U \to \mathbb{C}</math> is a [[holomorphic function]]. An '''isolated singularity''' for <math>f</math> is a point <math>z_0 \in \mathbb{C} \setminus U</math> such that there exists a neighborhood <math>V \ni z_0</math> such that <math>V \setminus z_0 \subset U</math>. In other words, it is a point outside <math>U</math>, such that a small disc about the point, excluding the point itself, lies completely inside <math>U</math>.
 ==Classification==