Topological spaces with an ωω-base

Abstract

Given a partially ordered set P we study properties of topological spaces X admitting a P-base, i.e., an indexed family (Uα)α∈ P of subsets of X× X such that Uβ⊂ Uα for all αβ in P and for every x∈ X the family (Uα[x])α∈ P of balls Uα[x]=\y∈ X:(x,y)∈ Uα\ is a neighborhood base at x. A P-base (Uα)α∈ P for X is called locally uniform if the family of entourages (Uα Uα-1Uα)α∈ P remains a P-base for X. A topological space is first-countable if and only if it has an ω-base. By Moore's Metrization Theorem, a topological space is metrizable if and only if it is a T0-space with a locally uniform ω-base. In the paper we shall study topological spaces possessing a (locally uniform) ωω-base. Our results show that spaces with an ωω-base share some common properties with first countable spaces, in particular, many known upper bounds on the cardinality of first-countable spaces remain true for countably tight ωω-based topological spaces. On the other hand, topological spaces with a locally uniform ωω-base have many properties, typical for generalized metric spaces. Also we study Tychonoff spaces whose universal (pre- or quasi-) uniformity has an ωω-base and show that such spaces are close to being σ-compact.