Bounded Ramsey's theorem for triples in computability theory
Abstract
We study a restriction of Ramsey's theorem for 2-coloring of triples, in which homogeneous sets for color~1 are of bounded size (BRT32). We prove that the computational content of this statement is very close to Ramsey's theorem for pairs (RT22), in that it satisfies the same known computability-theoretic upper bounds, but that BRT32 is not computably-reducible to RT22, even when allowing multiple applications of RT22.
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