Topological space

TODO: This page is in dire need of an update (was last changed in March 2015, in late Nov 2015 the definition was moved to a subpage, that was it)

Definition

A topological space is a set $$X$$ coupled with a "topology", $\mathcal{J}$ on $$X$$ . We denote this by the ordered pair $(X,\mathcal{J})$.

• A topology, $\mathcal{J}$ is a collection of subsets of $X$, $$\mathcal{J}\subseteq\mathcal{P}(X)$$ with the following properties^[1][2][3]:

1. Both $$\emptyset,X\in\mathcal{J}$$
2. For the collection $$\{U_\alpha\}_{\alpha\in I}\subseteq\mathcal{J}$$ where $$I$$ is any indexing set, $$\cup_{\alpha\in I}U_\alpha\in\mathcal{J}$$ - that is it is closed under union (infinite, finite, whatever - "closed under arbitrary union")
3. For the collection $$\{U_i\}^n_{i=1}\subseteq\mathcal{J}$$ (any finite collection of members of the topology) that $$\cap^n_{i=1}U_i\in\mathcal{J}$$

• We call the elements of $\mathcal{J}$ "open sets", that is $\forall S\in\mathcal{J}[S\text{ is an open set}]$, each $S$ is exactly what we call an 'open set'

As mentioned above we write the topological space as $$(X,\mathcal{J})$$ ; or just $$X$$ if the topology on $$X$$ is obvious from the context.

Examples

• Every metric space induces a topology, see the topology induced by a metric space
• Given any set $X$ we can always define the following two topologies on it:
  1. Discrete topology - the topology $\mathcal{J}=\mathcal{P}(X)$ - where $\mathcal{P}(X)$ denotes the power set of $X$
  2. Trivial topology - the topology $\mathcal{J}=\{\emptyset, X\}$

See Also

• Topology
• Topological property theorems

References

1. Jump up ↑ Topology - James R. Munkres
2. Jump up ↑ Introduction to Topological Manifolds - John M. Lee
3. Jump up ↑ Introduction to Topology - Bert Mendelson