cocentraltopologies

Cocentraltopologies is a term used in some corners of topology to denote a class of topological structures defined by a distinguished family of subsets called cocenters. The idea is to emphasize a dual or dualized-constructive role for a chosen family of sets in generating the topology, by viewing these cocenters as the primary building blocks from which open sets arise.

Definition. Let X be a set. A cocentraltopology on X is a topology T for which there

- C forms a basis for T: every open set is a union of elements of C, and

- X ∈ C (often included to ensure X itself is recognizable as a cocenter).

In this framework, T is precisely the topology generated by the cocenter family C. Different authors may

Basic properties. Because T is generated by C as a basis, many standard facts about bases apply.

Examples. If C consists of all singletons on a finite X, T is the discrete topology. If

Relation to other notions. Cocentraltopologies aligns with the standard idea of defining a topology by a basis,