Computable Ramsey's Theorem for Pairs Needs Infinitely Many Pi-0-2 Sets
Abstract
In J, Theorem 4.2, Jockusch proves that for any computable k-coloring of pairs of integers, there is an infinite 02 homogeneous set. The proof uses a countable collection of 02 sets as potential infinite homogeneous sets. In a remark preceding the proof, Jockusch states without proof that it can be shown that there is no computable way to prove this result with a finite number of 02 sets. We provide a proof of this latter fact.
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