Forcing Axioms and the Definabilty of the Nonstationary Ideal on ω1
Abstract
We show that under and "there exists a Woodin cardinal", the nonstationary ideal on ω1 can not be defined by a 1 formula with parameter A ⊂ ω1. We show that the same conclusion holds under the assumption of Woodin's ()-axiom. We further show that there are universes where holds and is 1(ω1)-definable. Last we show that if the canonical inner model with one Woodin cardinal M1 exists, there is a universe where is saturated, 1(ω1)-definable and holds.
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