Jonas Reitz, Kameryn J Williams
Published 2018-10-19Version 1
We present a class forcing notion $\mathbb M(\eta)$, uniformly definable for ordinals $\eta$, which forces the ground model to be the $\eta$-th inner mantle of the extension, in which the sequence of inner mantles has length at least $\eta$. This answers a conjecture of Fuchs, Hamkins, and Reitz [FHR15] in the positive. We also show that $\mathbb M(\eta)$ forces the ground model to be the $\eta$-th iterated HOD of the extension, where the sequence of iterated HODs has length at least $\eta$. We conclude by showing that the lengths of the sequences of inner mantles and of iterated HODs can be separated to be any two ordinals you please.
The $ω$-th inner mantle
Forcing a countable structure to belong to the ground model
A generalization of Solovay's $Σ$-construction with application to intermediate models
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