Preserving measurability with Cohen iterations
Preserving measurability with Cohen iterations
Author(s): Radek HonzíkSubject(s): Essay|Book Review |Scientific Life
Published by: Univerzita Karlova v Praze, Nakladatelství Karolinum
Keywords: Cohen forcing; measurability
Summary/Abstract: We describe a weak version of Laver indestructibility for a μ-tall cardinal κ, μ > κ+, where “weaker” means that the indestructibility refers only to the Cohen forcing at κ of a certain length. A special case of this construction is: if μ is equal to κ+n for some 1 < n < ω, then one can get a model V∗ where κ is measurable, and its measurability is indestructible by Add(κ, α) for any 0 ≤ α ≤ κ+n (Theorem 3.3).
Journal: Acta Universitatis Carolinae Philosophica et Historica
- Issue Year: XXIII/2017
- Issue No: 2
- Page Range: 27-32
- Page Count: 6
- Language: English
