arXiv:2104.09151 Abstract | arXiv Analytics

arXiv:2104.09151 [math.LO]Abstract References Reviews Resources

On the ideal $J[κ]$

Published 2021-04-19Version 1

Motivated by a question from a recent paper by Gilton, Levine and Stejskalova, we obtain a new characterization of the ideal $J[\kappa]$, from which we confirm that $\kappa$-Souslin trees exist in various models of interest. As a corollary we get that for every integer $n$ such that $\mathfrak b<2^{\aleph_n}=\aleph_{n+1}$, if $\square(\aleph_{n+1})$ holds, then there exists an $\aleph_{n+1}$-Souslin tree.

Categories: math.LO

Subjects: 03E05, 03E35, 03E17

Keywords: souslin tree, stejskalova, characterization

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