Partition Genericity and Pigeonhole Basis Theorems

Journal of Symbolic Logic 89 (2):829-857 (2024)
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Abstract

There exist two main notions of typicality in computability theory, namely, Cohen genericity and randomness. In this article, we introduce a new notion of genericity, called partition genericity, which is at the intersection of these two notions of typicality, and show that many basis theorems apply to partition genericity. More precisely, we prove that every co-hyperimmune set and every Kurtz random is partition generic, and that every partition generic set admits weak infinite subsets, for various notions of weakness. In particular, we answer a question of Kjos-Hanssen and Liu by showing that every Kurtz random admits an infinite subset which does not compute any set of positive effective Hausdorff dimension. Partition genericity is a partition regular notion, so these results imply many existing pigeonhole basis theorems.

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References found in this work

RT₂² does not imply WKL₀.Jiayi Liu - 2012 - Journal of Symbolic Logic 77 (2):609-620.
RT2 2 does not imply WKL0.Jiayi Liu - 2012 - Journal of Symbolic Logic 77 (2):609-620.
Ramsey's Theorem and Cone Avoidance.Damir D. Dzhafarov & Carl G. Jockusch - 2009 - Journal of Symbolic Logic 74 (2):557-578.
Lowness for Kurtz randomness.Noam Greenberg & Joseph S. Miller - 2009 - Journal of Symbolic Logic 74 (2):665-678.

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