Category:Poles (Complex Analysis)
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This category contains results about poles in the context of Complex Analysis.
Definitions specific to this category can be found in Definitions/Poles (Complex Analysis).
Let $U$ be an open subset of a Riemann surface.
Let $z_0 \in U$.
Let $f: U \setminus \set {z_0} \to \C$ be a holomorphic function.
Definition 1
Let $z_0$ be an isolated singularity of $f$.
Then $z_0$ is a pole if and only if:
- $\ds \lim_{z \mathop \to z_0} \cmod {\map f z} \to \infty$
Definition 2
Let $z_0$ be an isolated singularity of $f$.
Then $z_0$ is a pole if and only if $f$ can be written in the form:
- $\map f z = \dfrac {\map \phi z} {\paren {z - z_0}^k}$
where:
- $\phi$ is analytic at $z_0$
- $\map \phi {z_0} \ne 0$
- $k \in \Z$ such that $k \ge 1$.
Pages in category "Poles (Complex Analysis)"
The following 5 pages are in this category, out of 5 total.