Ramsey's Theorem and Cone Avoidance

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Journal of Symbolic Logic 74 (2):557-578 (2009)
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Abstract

It was shown by Cholak, Jockusch, and Slaman that every computable 2-coloring of pairs admits an infinite low₂ homogeneous set H. We answer a question of the same authors by showing that H may be chosen to satisfy in addition $C\,\not \leqslant _T \,H$, where C is a given noncomputable set. This is shown by analyzing a new and simplified proof of Seetapun's cone avoidance theorem for Ramsey's theorem. We then extend the result to show that every computable 2-coloring of pairs admits a pair of low₂ infinite homogeneous sets whose degrees form a minimal pair.

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10.2178/jsl/1243948327

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Citations of this work

Partition Genericity and Pigeonhole Basis Theorems.Benoit Monin & Ludovic Patey - forthcoming - Journal of Symbolic Logic:1-29.

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References found in this work

On the Strength of Ramsey's Theorem.David Seetapun & Theodore A. Slaman - 1995 - Notre Dame Journal of Formal Logic 36 (4):570-582.
A cohesive set which is not high.Carl Jockusch & Frank Stephan - 1993 - Mathematical Logic Quarterly 39 (1):515-530.

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