Maximal Prikry Sequences

Abstract

In this paper we investigate the covering machinery of the Jensen-Steel core model K, under the hypothesis that there is no inner model with a Woodin cardinal. In an earlier work, Mitchell and the first author showed that if >ω2 is a regular cardinal in K but a singular ordinal in V, then is a measurable cardinal in K. In this article, we further show that under certain circumstances, there exists a maximal Prikry sequence C for a measure on in K. The first author shows that the anti-large cardinal hypothesis is necessary. In a more restrictive setting, we prove that every subset of with size <|| can be covered by a set in K[C] with size <||. Benhamou and the first author show that the result is optimal.