Dominating and pinning down pairs for topological spaces

Abstract

We call a pair of infinite cardinals (,λ) with > λ a dominating (resp. pinning down) pair for a topological space X if for every subset A of X (resp. family U of non-empty open sets in X) of cardinality there is B ⊂ X of cardinality λ such that A ⊂ B (resp. B U for each U ∈ U). Clearly, a dominating pair is also a pinning down pair for X. Our definitions generalize the concepts introduced in [GTW] resp. [BT] which focused on pairs of the form (2λ,λ). The main aim of this paper is to answer a large number of the numerous problems from [GTW] and [BT] that asked if certain conditions on a space X together with the assumption that (2λ,λ) or ((2λ)+,λ) is a pinning down pair or pair for X would imply d(X) λ. [BT] A. Bella, V.V. Tkachuk, Exponential density vs exponential domination, preprint [GTW] G. Gruenhage, V.V. Tkachuk, R.G. Wilson, Domination by small sets versus density, Topology and its Applications 282 (2020)