Two remarks on Merimovich's model of the total failure of GCH

Abstract

Let M denote the Merimovich's model in which for each infinite cardinal λ, 2λ=λ+3. We show that in M the following hold: (1) Shelah's strong hypothesis fails at all singular cardinals, indeed, ∀ λ (λ is a singular cardinal ⇒ pp(λ)=λ+3). (2) For each singular cardinal λ there is an inner model N of M such that M and N have the same bounded subsets of λ, λ is a singular cardinal in N, (λ+i)N=(λ+i)M, for i=1,2,3, and N 2λ=λ+. Thus it is possible to add many new fresh subsets to λ without adding any new bounded subsets to λ.