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MORE ZFC INEQUALITIES BETWEEN CARDINAL INVARIANTS

Part of: Set theory

Published online by Cambridge University Press:  02 August 2021

VERA FISCHER  and
DÁNIEL T. SOUKUP
VERA FISCHER
Affiliation:
KURT GÖDEL RESEARCH CENTER FOR MATHEMATICAL LOGIC UNIVERSITÄT WIENWIEN, AUSTRIAE-mail:[email protected]: http://www.logic.univie.ac.at/~vfischer/E-mail:[email protected]: http://www.logic.univie.ac.at/~soukupd73/
DÁNIEL T. SOUKUP
Affiliation:
KURT GÖDEL RESEARCH CENTER FOR MATHEMATICAL LOGIC UNIVERSITÄT WIENWIEN, AUSTRIAE-mail:[email protected]: http://www.logic.univie.ac.at/~vfischer/E-mail:[email protected]: http://www.logic.univie.ac.at/~soukupd73/
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Abstract

Motivated by recent results and questions of Raghavan and Shelah, we present ZFC theorems on the bounding and various almost disjointness numbers, as well as on reaping and dominating families on uncountable, regular cardinals. We show that if $\kappa =\lambda ^+$ for some $\lambda \geq \omega $ and $\mathfrak {b}(\kappa )=\kappa ^+$ then $\mathfrak {a}_e(\kappa )=\mathfrak {a}_p(\kappa )=\kappa ^+$ . If, additionally, $2^{<\lambda }=\lambda $ then $\mathfrak {a}_g(\kappa )=\kappa ^+$ as well. Furthermore, we prove a variety of new bounds for $\mathfrak {d}(\kappa )$ in terms of $\mathfrak {r}(\kappa )$ , including $\mathfrak {d}(\kappa )\leq \mathfrak {r}_\sigma (\kappa )\leq \operatorname {\mathrm {cf}}([\mathfrak {r}(\kappa )]^\omega )$ , and $\mathfrak {d}(\kappa )\leq \mathfrak {r}(\kappa )$ whenever $\mathfrak {r}(\kappa )<\mathfrak {b}(\kappa )^{+\kappa }$ or $\operatorname {\mathrm {cf}}(\mathfrak {r}(\kappa ))\leq \kappa $ holds.

Keywords

eventually differentmadalmost disjointunboundedreapingsplittingdominatingcardinal characteristic

MSC classification

Primary: 03E05: Other combinatorial set theory
Secondary: 03E17: Cardinal characteristics of the continuum
Type
Article
Information
The Journal of Symbolic Logic , Volume 86 , Issue 3 , September 2021 , pp. 897 - 912
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Copyright
© Association for Symbolic Logic 2021

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