Some results on large cardinals and the continuum function

Abstract

Given a Woodin cardinal δ, I show that if F is any Easton function with F"δ⊂eqδ and holds, then there is a cofinality-preserving forcing extension in which 2γ= F(γ) for each regular cardinal γ<δ, and in which δ remains Woodin. I also present a new example in which forcing a certain behavior of the continuum function on the regular cardinals, while preserving a given large cardinal, requires large cardinal strength beyond that of the original large cardinal under consideration. Specifically, I prove that the existence of a λ-supercompact cardinal such that fails at λ is equiconsistent with the existence of a cardinal that is λ-supercompact and λ++-tall. I generalize a theorem on measurable cardinals due to Levinski, which says that given a measurable cardinal, there is a forcing extension preserving the measurability of in which is the least regular cardinal at which holds. Indeed, I show that Levinski's result can be extended to many other large cardinal contexts. This work paves the way for many additional results, analogous to the results stated above for Woodin cardinals and partially supercompact cardinals.