Stone Duality for Relations

12/18/2019
by   Alexander Kurz, et al.
0

We show how Stone duality can be extended from maps to relations. This is achieved by working order enriched and defining a relation from A to B as both an order-preserving function from the opposite of A times B to the 2-element chain and as a subobject of A times B. We show that dual adjunctions and equivalences between regular categories, taken in a suitably order enriched sense, extend to (framed bi)categories of relations.

READ FULL TEXT

Please sign up or login with your details

Forgot password? Click here to reset