The Cofinality of Generating Familes

Abstract

The topology of a separable metrizable space M is generated by a family C of its subsets provided that a set A⊂eq M is closed in M if and only if A C is closed in C for each C∈ C. The sequentiality number, seq(M), and k-ness number, k(M), of M, are the minimum size of a generating family of convergent sequences, respectively compact subsets. Let b be the minimum size of an unbounded set in ωω with the mod finite order. For a cardinal , the covering number, cov(), is the minimum size of a family of countable subsets of so that every countable subset of is contained in an element of the family. It is shown using the Tukey order on relations that (1) seq(M)=cov(|M|)· b, unless M is locally small (every point of M has a neighborhood of size strictly less than |M|) in which case seq(M)=μ <|M| cov(μ)· b and (2) k(M) is in the interval [kc(M)·b,cov(kc(M))· b], where kc(M) is the minimum number of compact sets that cover M. Solutions to problems of van Douwen's on the k-ness number of analytic and of co-analytic spaces are deduced.