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The Strength of Some Combinatorial Principles Related to Ramsey's Theorem for Pairs

We study the reverse mathematics and computability-the\-o\-re\-tic strength of (stable) Ramsey's Theorem for pairs and the related principles COH and DNR. We show that SRT$^2_2$ implies DNR over RCA$_0$ but COH does not, and answer a question of Mileti by showing that every computable stable $2$-coloring of pairs has an incomplete $Δ^0_2$ infinite homogeneous set. We also give some extensions of the latter result, and relate it to potential approaches to showing that SRT$^2_2$ does not imply RT$^2_2$.

preprint2014arXivOpen access
Denis R. HirschfeldtCarl G. JockuschBjørn Kjos-HanssenSteffen LemppTheodore A. Slaman
math.LO
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Denis R. HirschfeldtCarl G. JockuschBjørn Kjos-HanssenSteffen LemppTheodore A. Slaman

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