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arxiv: 1809.03940 · v3 · pith:P32Q6W4Ynew · submitted 2018-09-11 · 🧮 math.LO

The determined property of Baire in reverse math

classification 🧮 math.LO
keywords determinedomegabaireboreleveryhyperarithmeticmathmodel
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We define the notion of a determined Borel code in reverse math, and consider the principle $DPB$, which states that every determined Borel set has the property of Baire. We show that this principle is strictly weaker than $ATR$. Any $\omega$-model of $DPB$ must be closed under hyperarithmetic reduction, but $DPB$ is not a theory of hyperarithmetic analysis. We show that whenever $M\subseteq 2^\omega$ is the second-order part of an $\omega$-model of $DPB$, then for every $Z \in M$, there is a $G \in M$ such that $G$ is $\Delta^1_1$-generic relative to $Z$.

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