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Borel combinatorics fail in HYP
Journal of Mathematical Logic 23 (2) (2022)
Abstract
We characterize the completely determined Borel subsets of HYP as exactly the [Formula: see text] subsets of HYP. As a result, HYP believes there is a Borel well-ordering of the reals, that the Borel Dual Ramsey Theorem fails, and that every Borel d-regular bipartite graph has a Borel perfect matching, among other examples. Therefore, the Borel Dual Ramsey Theorem and several theorems of descriptive combinatorics are not theories of hyperarithmetic analysis. In the case of the Borel Dual Ramsey Theorem, this answers a question of Astor, Dzhafarov, Montalbán, Solomon and the third author.Other Versions
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References found in this work
Effectiveness for infinite variable words and the Dual Ramsey Theorem.Joseph S. Miller & Reed Solomon - 2004 - Archive for Mathematical Logic 43 (4):543-555.
The determined property of baire in reverse math.Eric P. Astor, Damir Dzhafarov, Antonio Montalbán, Reed Solomon & Linda Brown Westrick - 2020 - Journal of Symbolic Logic 85 (1):166-198.
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