Branch point theorem: Difference between revisions

Latest revision as of 19:10, 18 May 2008

This article gives the statement, and possibly proof, of a basic fact in complex analysis.
View a complete list of basic facts in complex analysis

Statement

Suppose $U\subset \mathbb {C}$ is an open subset, $z_{0}\in U$ is a point and $f:U\to \mathbb {C}$ is a holomorphic function. Suppose $n$ is the order of zero of the function $z\mapsto f(z)-f(z_{0})$ at $z_{0}$ : in other words, the smallest positive $n$ such that $f^{(n)}(z_{0})\neq 0$ . Assume $n$ is finite, i.e. $f$ is not constant around $z_{0}$ .

Then, there exist radii $r_{1},r_{2}>0$ such that:

For any $w$ such that $|w-f(z_{0})|<r_{2}$ , the set:

$\{z\in U\mid |z-z_{0}|<r_{1},f(z)=w\}$

has cardinality exactly $n$ . In other words, $f$ is a $n$ -to-one map around $z_{0}$ .

Related facts

Open mapping theorem, which can be viewed as a corollary of the branch point theorem.

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+{{basic fact}}
 ==Statement==
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 <math>\{ z \in U \mid |z - z_0| < r_1, f(z) = w \}</math>
-has cardinality exactly <math>n</math>.
+has cardinality exactly <math>n</math>. In other words, <math>f</math> is a <math>n</math>-to-one map around <math>z_0</math>.
 ==Related facts==
 * [[Open mapping theorem]], which can be viewed as a corollary of the branch point theorem.