Overlapping interval topology

Not to be confused with Interlocking interval topology.

In mathematics, the overlapping interval topology is a topology which is used to illustrate various topological principles.

Definition

Given the closed interval ${\displaystyle [-1,1]}$  of the real number line, the open sets of the topology are generated from the half-open intervals ${\displaystyle (a,1]}$  with ${\displaystyle a<0}$  and ${\displaystyle [-1,b)}$  with ${\displaystyle b>0}$ . The topology therefore consists of intervals of the form ${\displaystyle [-1,b)}$ , ${\displaystyle (a,b)}$ , and ${\displaystyle (a,1]}$  with ${\displaystyle a<0<b}$ , together with ${\displaystyle [-1,1]}$  itself and the empty set.

Properties

Any two distinct points in ${\displaystyle [-1,1]}$  are topologically distinguishable under the overlapping interval topology as one can always find an open set containing one but not the other point. However, every non-empty open set contains the point 0 which can therefore not be separated from any other point in ${\displaystyle [-1,1]}$ , making ${\displaystyle [-1,1]}$  with the overlapping interval topology an example of a T₀ space that is not a T₁ space.

The overlapping interval topology is second countable, with a countable basis being given by the intervals ${\displaystyle [-1,s)}$ , ${\displaystyle (r,s)}$  and ${\displaystyle (r,1]}$  with ${\displaystyle r<0<s}$  and r and s rational.

See also

• List of topologies
• Particular point topology, a topology where sets are considered open if they are empty or contain a particular, arbitrarily chosen, point of the topological space

References

• Steen, Lynn Arthur; Seebach, J. Arthur Jr. (1995) [1978], Counterexamples in Topology (Dover reprint of 1978 ed.), Berlin, New York: Springer-Verlag, ISBN 978-0-486-68735-3, MR 0507446 (See example 53)