English

The linear refinement number and selection theory

General Topology 2016-05-03 v1 Logic

Abstract

The \emph{linear refinement number} lr\mathfrak{lr} is the minimal cardinality of a centered family in [ω]ω[\omega]^\omega such that no linearly ordered set in ([ω]ω,)([\omega]^\omega,\subseteq^*) refines this family. The \emph{linear excluded middle number} lx\mathfrak{lx} is a variation of lr\mathfrak{lr}. We show that these numbers estimate the critical cardinalities of a number of selective covering properties. We compare these numbers to the classic combinatorial cardinal characteristics of the continuum. We prove that lr=lx=fd\mathfrak{lr}=\mathfrak{lx}=\mathfrak{fd} in all models where the continuum is at most 2\aleph_2, and that the cofinality of lr\mathfrak{lr} is uncountable. Using the method of forcing, we show that lr\mathfrak{lr} and lx\mathfrak{lx} are not provably equal to d\mathfrak{d}, and rule out several potential bounds on these numbers. Our results solve a number of open problems.

Keywords

Cite

@article{arxiv.1404.2239,
  title  = {The linear refinement number and selection theory},
  author = {Michał Machura and Saharon Shelah and Boaz Tsaban},
  journal= {arXiv preprint arXiv:1404.2239},
  year   = {2016}
}
R2 v1 2026-06-22T03:46:10.157Z