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arxiv: math/0212406 · v1 · submitted 2002-12-01 · 🧮 math.LO

Beyond underTilde{Sigma}²₁ absoluteness

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There have been many generalizations of Shoenfield's Theorem on the absoluteness of $\Sigma^1_2$ sentences between uncountable transitive models of $\mathrm{ZFC}$. One of the strongest versions currently known deals with $\Sigma^2_1$ absoluteness conditioned on $\mathrm{CH}$. For a variety of reasons, from the study of inner models and from simply combinatorial set theory, the question of whether conditional $\Sigma^2_2$ absoluteness is possible at all, and if so, what large cardinal assumptions are involved and what sentence(s) might play the role of $\mathrm{CH}$, are fundamental questions. This article investigates the possiblities for $\Sigma^2_2$ absoluteness by extending the connections between determinacy hypotheses and absoluteness hypotheses.

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