English

A note on bornologies

General Topology 2018-06-26 v2

Abstract

A bornology on a set XX is a family B\mathcal{B} of subsets of XX closed under taking subsets, finite unions and such that B=X\cup \mathcal{B}=X. We prove that, for a bornology B\mathcal{B} on XX, the following statements are equivalent: (1) there exists a vector topology τ\tau on the vector space V(X)\mathbb{V} (X) over R\mathbb{R} such that B\mathcal{B} is the family of all subsets of XX bounded in τ\tau; (2) there exists a uniformity U\mathcal{U} on XX such that B\mathcal{B} is the family of all subsets of XX totally bounded in U\mathcal{U}; (3) for every YXY \subseteq X, YBY \notin \mathcal{B}, there exists a metric dd on XX such that BBd\mathcal{B}\subseteq \mathcal{B}_d, YBdY\notin \mathcal{B}_d, where Bd\mathcal{B}_d is the family of all closed discrete subsets of (X,d)(X, d); (4) for every YXY \subseteq X, YBY \notin \mathcal{B}, there exists ZYZ\subseteq Y such that ZBZ^{\prime} \notin \mathcal{B} for each infinite subset ZZ^{\prime} of ZZ. A bornology B\mathcal{B} satisfying (4)(4) is called antitall. We give topological and functional characterizations of antitall bornologies.

Cite

@article{arxiv.1806.04337,
  title  = {A note on bornologies},
  author = {Igor Protasov},
  journal= {arXiv preprint arXiv:1806.04337},
  year   = {2018}
}

Comments

Bornology, uniformity, vector topology, Stone-$\check{C}$ech compactification, antitall ideal

R2 v1 2026-06-23T02:26:47.219Z