Closure operators, frames, and neatest representations
Rings and Algebras
2017-11-20 v3
Abstract
Given a poset and a standard closure operator we give a necessary and sufficient condition for the lattice of -closed sets of to be a frame in terms of the recursive construction of the -closure of sets. We use this condition to show that given a set of distinguished joins from , the lattice of -ideals of fails to be a frame if and only if it fails to be -distributive, with depending on the cardinalities of sets in . From this we deduce that if a poset has the property that whenever is defined for it is necessarily equal to , then it has an -representation. This answers a question from the literature.
Cite
@article{arxiv.1702.02257,
title = {Closure operators, frames, and neatest representations},
author = {Rob Egrot},
journal= {arXiv preprint arXiv:1702.02257},
year = {2017}
}
Comments
Revised versions make minor corrections and slight changes to exposition