Towards a generic absoluteness theorem for Chang models

Abstract

Let ∞ be the set of all universally Baire sets of reals. Inspired by recent work of the second author and Nam Trang, we introduce a new technique for establishing generic absoluteness results for models containing ∞. Our main technical tool is an iteration that realizes ∞ as the sets of reals in a derived model of some iterate of V. We show, from a supercompact cardinal and a proper class of Woodin cardinals, that whenever g ⊂eq Col(ω, 22) is V-generic and h is V[g]-generic for some poset P∈ V[g], there is an elementary embedding j: V→ M such that j()=ω1V[g*h] and L(∞, R) as computed in V[g*h] is a derived model of M at j(). As a corollary we obtain that Sealing holds in V[g], which was previously demonstrated by Woodin using the stationary tower forcing. Also, using a theorem of Woodin, we conclude that the derived model of V at satisfies ADR+`` is a regular cardinal". Inspired by core model induction, we introduce the definable powerset A∞ of ∞ and use our derived model representation mentioned above to show that the theory of L(A∞) cannot be changed by forcing. Working in a different direction, we also show that the theory of L(∞, R)[C], where C is the club filter on ω1(∞), cannot be changed by forcing. Proving the two aforementioned results is the first step towards showing that the theory of L(Ordω, ∞, R)([μα: α∈ Ord]), where μα is the club filter on ω1(α), cannot be changed by forcing.