Category:Definitions/Regions
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This category contains definitions related to Regions.
Related results can be found in Category:Regions.
Metric Space
Let $M = \struct {A, d}$ be a metric space.
A region of $M$ is a subset $U$ of $M$ such that $U$ is:
- $(1): \quad$ non-empty
- $(2): \quad$ path-connected.
Complex
Let $D \subseteq \C$ be a subset of the set of complex numbers.
$D$ is a region of $\C$ if and only if:
- $(1): \quad$ $D$ is non-empty
- $(2): \quad$ $D$ is path-connected.
Region in the Plane
The usual usage of region is in the real number plane or complex plane.
A point set $R$ in the plane is a region if and only if:
Pages in category "Definitions/Regions"
The following 2 pages are in this category, out of 2 total.