Capturing sets of ordinals by normal ultrapowers

Abstract

We investigate the extent to which ultrapowers by normal measures on can be correct about powersets P(λ) for λ>. We consider two versions of this questions, the capturing property CP(,λ) and the local capturing property LCP(,λ). CP(,λ) holds if there is an ultrapower by a normal measure on which correctly computes P(λ). LCP(,λ) is a weakening of CP(,λ) which holds if every subset of λ is contained in some ultrapower by a normal measure on . After examining the basic properties of these two notions, we identify the exact consistency strength of LCP(,+). Building on results of Cummings, who determined the exact consistency strength of CP(,+), and using a forcing due to Apter and Shelah, we show that CP(,λ) can hold at the least measurable cardinal.