On the rigidity of Souslin trees and their generic branches

On the rigidity of Souslin trees and their generic branches

We show it is consistent that there is a Souslin tree $S$ such that after forcing with $S$, $S$ is Kurepa and for all clubs $C \subset \omega_1$, $S\upharpoonright C$ is rigid. This answers Fuchs's questions in Club degrees of rigidity and almost Kurepa trees. Moreover, we show it is consistent...

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1. Verfasser: Ramandi, Hossein Lamei
Format: Artikel
Sprache:eng
Schlagworte:
Mathematics - Logic
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Zusammenfassung:We show it is consistent that there is a Souslin tree $S$ such that after forcing with $S$, $S$ is Kurepa and for all clubs $C \subset \omega_1$, $S\upharpoonright C$ is rigid. This answers Fuchs's questions in Club degrees of rigidity and almost Kurepa trees. Moreover, we show it is consistent with $\diamondsuit$ that for every Souslin tree there is a dense $X \subset S$ which does not have a copy of $S$. This is related to a question due to Baumgartner.
DOI:10.48550/arxiv.2010.06125