Definition:Complex Disk/Closed

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Definition

A closed (complex) disk is a closed ball in the complex plane.

Let $a \in \C$ be a complex number.

Let $R > 0$ be a real number.

The closed (complex) disk of center $a$ and radius $R$ is the set:

$\map {\overline B} {a, R} = \set {z \in \C: \cmod {z - a} \le R}$

where $\cmod {\, \cdot \,}$ denotes complex modulus.

Also see

Definition:Open Complex Disk

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Definitions/Complex Disks