Iterating Generalised Perfect Set Forcing Along Well-Founded Orders

Abstract

The technique of geometric forcing iteration was developed by Kanovei zbMATH01335192 and used to prove that the perfect set forcing can be iterated with countable supports along any partial order, while preserving 1. In Property-B we considered a generalised perfect set forcing with respect to a filter on a cardinal κ satisfying κ<κ=κ, which we denoted P ( F), and we proved that its iteration with supports of size κ along any ordinal preserves cardinals up to and including κ+. We show that there is a version of the geometric iteration technique that applies to P ( F) and yields that for κ satisfying κ<κ=κ and for appropriate filters F, the forcing P () can be iterated with supports of size κ along any well-founded partial order and preserve cardinals up to and including κ+. As an application of our technique we obtain that common notions of arboreal forcings on ω can be iterated with countable supports along any well-founded partial order and that such iterations preserve 1.