English

Closure operators, frames, and neatest representations

Rings and Algebras 2017-11-20 v3

Abstract

Given a poset PP and a standard closure operator Γ:(P)(P)\Gamma:\wp(P)\to\wp(P) we give a necessary and sufficient condition for the lattice of Γ\Gamma-closed sets of (P)\wp(P) to be a frame in terms of the recursive construction of the Γ\Gamma-closure of sets. We use this condition to show that given a set U\mathcal{U} of distinguished joins from PP, the lattice of U\mathcal{U}-ideals of PP fails to be a frame if and only if it fails to be σ\sigma-distributive, with σ\sigma depending on the cardinalities of sets in U\mathcal{U}. From this we deduce that if a poset has the property that whenever a(bc)a\wedge(b\vee c) is defined for a,b,cPa,b,c\in P it is necessarily equal to (ab)(ac)(a\wedge b)\vee (a\wedge c), then it has an (ω,3)(\omega,3)-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

R2 v1 2026-06-22T18:12:17.143Z