Regular topological space

Definition

A topological space, [ilmath](X,\mathcal{ J })[/ilmath] is regular if^[1]:

• [ilmath]\forall E\in C(\mathcal{J})\ \forall x\in X-E\ \exists U,V\in\mathcal{J}[U\cap V=\emptyset\implies(E\subset U\wedge x\in V)][/ilmath] - (here [ilmath]C(\mathcal{J})[/ilmath] denotes the closed sets of the topology [ilmath]\mathcal{J} [/ilmath])

Warning:Note that it is [ilmath]E\subset U[/ilmath] not [ilmath]\subseteq[/ilmath], the author (^[1]) like me is pedantic about this, so it must matter

TODO: Investigate consequences/differences between [ilmath]E\subseteq U[/ilmath] and [ilmath]E\subset U[/ilmath]

TODO: Picture

See also

• Topological separation axioms
• Normal topological space

References

1. ↑ ^{1.0 1.1} Introduction to Topology - Theodore W. Gamelin & Robert Everist Greene