Definition:Neighborhood (Topology)

Definition
Let $\left({X, \vartheta}\right)$ be a topological space.

Neighborhood of a Set
Let $A \subseteq X$ be a subset of $X$.

A neighborhood of $A$ is any subset $N \subseteq X$ containing an open set which itself contains $A$.

That is:
 * $\exists U \in \vartheta: A \subseteq U \subseteq N \subseteq X$

Neighborhood of a Point
The set $A$ can be a singleton, in which case the definition is of the neighborhood of a point.

Let $z \in X$ be a point in $X$.

A neighborhood of $z$ is any subset $N \subseteq X$ containing an open set which itself contains $z$.

That is:
 * $\exists U \in \vartheta: z \in U \subseteq N \subseteq X$

Open Neighborhood
If $N \in \vartheta$, i.e., if $N$ is open in $X$, then $N$ is called an open neighborhood.

Some authorities require all neighborhoods to be open.

Closed Neighborhood
If $\complement_X \left({N}\right) \in \vartheta$, i.e., if $N$ is closed in $X$, then $N$ is called a closed neighborhood.

Elementary Properties

 * From this definition, it follows directly that $X$ itself is always a neighborhood of any $A \subseteq X$.


 * It also follows that any open set of $X$ containing $A$ is a neighborhood of $A$.

A set which is the neighborhood of all its points is open.

Linguistic Note
The UK English spelling of this is neighbourhood.