Remarks on Hyperspaces for Priestley Spaces
Abstract
The Vietoris space of a Stone space plays an important role in the coalgebraic approach to modal logic. When generalizing this to positive modal logic, there is a variety of relevant hyperspace constructions based on various topologies on a Priestley space and mechanisms to topologize the hyperspace of closed sets. A number of authors considered hyperspaces of Priestley spaces and their application to the coalgebraic approach to positive modal logic. A mixture of techniques from category theory, pointfree topology, and Priestley duality have been employed. Our aim is to provide a unifying approach to this area of research relying only on a basic familiarity with Priestley duality and related free constructions of distributive lattices.
Cite
@article{arxiv.2207.03604,
title = {Remarks on Hyperspaces for Priestley Spaces},
author = {G. Bezhanishvili and J. Harding and P. J. Morandi},
journal= {arXiv preprint arXiv:2207.03604},
year = {2022}
}
Comments
24 pages