The number of normal measures, revisited

Abstract

We present a new version of the Friedman-Magidor theorem: for every measurable cardinal and τ≤++, there exists a forcing extension V⊂eq V[G] such that any normal measure U∈ V on has exactly τ distinct lifts in V[G], and every normal measure on in V[G] arises as such a lift. This version differs from the original Friedman-Magidor theorem in several notable ways. First, the new technique does not involve forcing over canonical inner models or rely on any fine-structural tools or assumptions, allowing it to be applied in the realm of large cardinals beyond the current reach of the inner model program. Second, in the case where τ≤ +, all lifts of a normal measure U∈ V on to V[G] have the same ultrapower. Finally, the technique generalizes to a version of the Friedman-Magidor theorem for extenders. An additional advantage is that the forcing used is notably simple, relying only on nonstationary support product forcing.