In which spaces can one "flip" the topology?

general-topology

https://en.wikipedia.org/wiki/Alexandrov_topology

Your spaces are closed under arbitrary intersections. These are called Alexandrov spaces.


Let $T$ denote the topology, then $T^c:=\{U^c:U\in T\}$ is a topology if $T$ is closed under every kind of intersection (not just finite ones).

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