Varsovian models ω

Abstract

For n<ω, let Nn be the minimal iterable proper class mouse M such that M "there are ordinals δ0<0<…<δn-1<n-1 such that each δi is a Woodin cardinal and each i is a strong cardinal", and let Nω be likewise, but with M "there is an ordinal λ which is a limit of Woodin cardinals and a limit of strong cardinals". Under appropriate large cardinal hypotheses, Sargsyan and Schindler introduced and analysed in "Varsovian models I" the Varsovian model of N1, and Sargsyan, Schindler and the author introduced and analysed in "Varsovian models II" the Varsovian model of N2. We extend this to Nω, assuming that *-translation integrates routinely with the P-constructions of this paper (the write-up of which is yet to be completed). We show, under this assumption, that Nω has a proper class inner model Vω which is a fully iterable strategy mouse with ω Woodin cardinals, closed under its strategy, and that the universe of Vω is the eventual generic HOD, and the mantle, of Nω. We also show, under the same assumption, that the core model K of Nω (which can be defined in a natural manner) is an iterate of Nω, is an inner model of Vω, and is fully iterable in M and in Vω.

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