Dominating and pinning down pairs for topological spaces
Keywords:
density of a topological space, cardinal function, dominating pair, pinning down pairAbstract
We call a pair of infinite cardinals ($\kappa,\lambda$) with $\kappa > \lambda$ 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 $\leq\kappa$ there is $B\subset X$ of cardinality $\leq\lambda$ such that $A \subset \overline B$ (resp. $B \cap U \not=\emptyset$ for each $U \in\mathcal U$). Clearly, a dominating pair is also a pinning down pair for X. Our definitions generalize the concepts introduced in [4] resp. [3] which focused on pairs of the form ($2^\lambda,\lambda$).
The main aim of this paper is to answer a large number of the numerous problems from [4] and [3] that asked if certain conditions on a space X together with the assumption that ($2^\lambda,\lambda$) or ($(2^\lambda)^+,\lambda$) is a pinning down pair or dominating pair for X would imply $d(X)\leq\lambda$.
This paper is dedicated to the memory of Phil Zenor.
References
B. Balcar and F. Franek, Independent families in complete Boolean algebras, Transactions of the American Mathematical Society, No. 2, Vol. 274 (1982), pp. 607–618.
Banakh, Taras; Ravsky, Alex, Verbal covering properties of topological spaces, Topology Appl. 201 (2016), 181—205.
A. Bella, V. V. Tkachuk, Exponential density vs exponential domination, to appear in Acta Mathematica Hungarica
G. Gruenhage, V. V. Tkachuk, R. G. Wilson, Domination by small sets versus density, Topology and its Applications 282 (2020), 107306
Juhász, I; Cardinal Functions in Topology – Ten Years Later, Math. Centre Tract 123 (1980). Amsterdam.
Juhász, István; Soukup, Lajos; Szentmiklóssy, Zoltán, Pinning down versus density, Israel J. Math. 215 (2016), no. 2, 583—605.
Juhász, István; On the free set number of topological spaces and their G-modifications, Topology and its Applications, to appear, https://arxiv.org/pdf/2004.13423.pdf
Juhász, István; Anti-Urysohn spaces, Top. Appl., 213 (2016), pp. 8–23.
Juhász, István; Szentmiklóssy, Zoltán, Calibers, free sequences and density, Top. Appl. 119 (2002), pp. 315–324.
