Transferring Compactness

Abstract

We demonstrate that the technology of Radin forcing can be used to transfer compactness properties at a weakly inaccessible but not strong limit cardinal to a strongly inaccessible cardinal. As an application, relative to the existence of large cardinals, we construct a model of set theory in which there is a cardinal that is n-d-stationary for all n∈ ω but not weakly compact. This is in sharp contrast to the situation in the constructible universe L, where being (n+1)-d-stationary is equivalent to being 1n-indescribable. We also show that it is consistent that there is a cardinal ≤ 2ω such that P(λ) is n-stationary for all λ≥ and n∈ ω, answering a question of Sakai.