The exact strength of generic absoluteness for the universally Baire sets (2110.02725v3)

Abstract: A set of reals is \textit{universally Baire} if all of its continuous preimages in topological spaces have the Baire property. $\sf{Sealing}$ is a type of generic absoluteness condition introduced by Woodin that asserts in strong terms that the theory of the universally Baire sets cannot be changed by forcing. The $\sf{Largest\ Suslin\ Axiom}$ ($\sf{LSA}$) is a determinacy axiom isolated by Woodin. It asserts that the largest Suslin cardinal is inaccessible for ordinal definable bijections. Let $\sf{LSA-over-uB}$ be the statement that in all (set) generic extensions there is a model of $\sf{LSA}$ whose Suslin, co-Suslin sets are the universally Baire sets. We show that over some mild large cardinal theory, $\sf{Sealing}$ is equiconsistent with $\sf{LSA-over-uB}$. In fact, we isolate an exact large cardinal theory that is equiconsistent with both (see \rdef{dfn:hod_pm}). As a consequence, we obtain that $\sf{Sealing}$ is weaker than the theory $``\sf{ZFC} + $there is a Woodin cardinal which is a limit of Woodin cardinals". A variation of $\sf{Sealing}$, called $\sf{Tower \ Sealing}$, is also shown to be equiconsistent with $\sf{Sealing}$ over the same large cardinal theory. The result is proven via Woodin's $\sf{Core\ Model\ Induction}$ technique, and is essentially the ultimate equiconsistency that can be proven via the current interpretation of $\sf{CMI}$ as explained in the paper.