Riemann’s removable singularity theorem

Let $U\subset\mathbb{C}$ be a domain, $a\in U$ , and let $f:U\setminus\{a\}$ be holomorphic. Then $a$ is a removable singularity of $f$ if and only if

$\lim_{z\to a}(z-a)f(z)=0.$

In particular, $a$ is a removable singularity of $f$ if $f$ is http://planetmath.org/node/Boundedbounded near $a$ , i.e. if there is a punctured neighborhood $V$ of $a$ and a real number $M>0$ such that $|f(z)|<M$ for all $z\in V$ .

Title	Riemann’s removable singularity theorem
Canonical name	RiemannsRemovableSingularityTheorem
Date of creation	2013-03-22 13:33:00
Last modified on	2013-03-22 13:33:00
Owner	pbruin (1001)
Last modified by	pbruin (1001)
Numerical id	4
Author	pbruin (1001)
Entry type	Theorem
Classification	msc 30D30
Related topic	Pole
Related topic	EssentialSingularity
Related topic	Meromorphic
Related topic	RiemannsTheoremOnIsolatedSingularities