English

Two inequalities between cardinal invariants

Logic 2015-05-26 v1

Abstract

We prove two ZFC\mathrm{ZFC} inequalities between cardinal invariants. The first inequality involves cardinal invariants associated with an analytic P-ideal, in particular the ideal of subsets of ω\omega of asymptotic density 00. We obtain an upper bound on the \ast-covering number, sometimes also called the weak covering number, of this ideal by proving in Section \ref{sec:covz0} that cov(Z0)d{\mathord{\mathrm{cov}}}^{\ast}({\mathcal{Z}}_{0}) \leq \mathfrak{d}. In Section \ref{sec:skbk} we investigate the relationship between the bounding and splitting numbers at regular uncountable cardinals. We prove in sharp contrast to the case when κ=ω\kappa = \omega, that if κ\kappa is any regular uncountable cardinal, then sκbκ{\mathfrak{s}}_{\kappa} \leq {\mathfrak{b}}_{\kappa}.

Keywords

Cite

@article{arxiv.1505.06296,
  title  = {Two inequalities between cardinal invariants},
  author = {Dilip Raghavan and Saharon Shelah},
  journal= {arXiv preprint arXiv:1505.06296},
  year   = {2015}
}

Comments

11 pages, submitted

R2 v1 2026-06-22T09:40:03.792Z