Groupwise density and the cofinality of the infinite symmetric group

Archive for Mathematical Logic 37 (7):483-493 (1998)
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Abstract

We study the relationship between the cofinality $c(Sym(\omega))$ of the infinite symmetric group and the cardinal invariants $\frak{u}$ and $\frak{g}$ . In particular, we prove the following two results. Theorem 0.1 It is consistent with ZFC that there exists a simple $P_{\omega_{1}}$ -point and that $c(Sym(\omega)) = \omega_{2} = 2^{\omega}$ . Theorem 0.2 If there exist both a simple $P_{\omega_{1}}$ -point and a $P_{\omega_{2}}$ -point, then $c(Sym(\omega)) = \omega_{1}$

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10.1007/s001530050109

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Citations of this work

Van Douwen’s diagram for dense sets of rationals.Jörg Brendle - 2006 - Annals of Pure and Applied Logic 143 (1-3):54-69.
Groupwise density cannot be much bigger than the unbounded number.Saharon Shelah - 2008 - Mathematical Logic Quarterly 54 (4):340-344.

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