📝 SummarXiv

Abstract

We prove a theorem on iterated forcing that can be used for preservation of $\aleph_2$ and $\aleph_1$ in iterations with supports of size $\aleph_1$ of forcings that have amalgamation properties similar to those present in the perfect set forcing. The work is modelled after Baumgartner's Axiom A and his proof that iterations with countable support of the same preserve $\aleph_1$. In honour of James E. Baumgartner, the property introduced here is called Property B$(\kappa)$. The known additional difficulties when forcing at cardinals higher than $\aleph_1$ make for a less general theorem and a more complex theorem on the iteration, which is not an iteration theorem in the classical sense. The results extend to other cardinals $\kappa$ such that $\kappa^{<\kappa}=\kappa$, in place of $\aleph_1$. We give examples of individual forcings that have Property B$(\kappa)$ and their products. In particular, we introduce a correct version of the generalised Prikry forcing, which we call Perfect Set Forcing with Respect to a Filter and give its basic properties.