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Regular embeddings of the stationary tower and Woodin's Σ 2 2 maximality theorem
Journal of Symbolic Logic 75 (2):711-727 (2010)
Abstract
We present Woodin's proof that if there exists a measurable Woodin cardinal δ, then there is a forcing extension satisfying all $\Sigma _{2}^{2}$ sentences ϕ such that CH + ϕ holds in a forcing extension of V by a partial order in V δ . We also use some of the techniques from this proof to show that if there exists a stationary limit of stationary limits of Woodin cardinals, then in a homogeneous forcing extension there is an elementary embedding j: V → M with critical point $\omega _{1}^{V}$ such that M is countably closed in the forcing extensionOther Versions
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2010-09-12
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References found in this work
The stationary set splitting game.Paul B. Larson & Saharon Shelah - 2008 - Mathematical Logic Quarterly 54 (2):187-193.
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