Removable singular point

2020 Mathematics Subject Classification: Primary: 30-XX [MSN][ZBL]

of a single-valued holomorphic function $f$ of one complex variable

Let $z_0\in \mathbb C$, $U$ an open neighborhood of $z_0$ and $f:U\setminus \{z_0\}\to \mathbb C$ an holomorphic function. Then $z_0$ is called a removable singularity of the function $f$ if there is a positive radius $r_0$ such that $f$ is bounded on the punctured disk $\{z: 0<|z-z_0|<r_0\}$.

Indeed, under this condition the limit \[ w_0 := \lim_{z\to z_0} f(z) \] exists and if we extend $f$ to $U$ by setting $f(z_0) = w_0$, then the resulting extension is holomorphic on the whole open set $U$.

The condition is obviously sharp, since the map $z\mapsto z^{-1}$ is holomorphic on $\mathbb C\setminus \{0\}$ but cannot be extended to a continuous function on the whole complex plane (indeed $0$ is, in this case, a pole).

Cf. also Singular point; Essential singular point; Removable set.

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