The reverse mathematics of the pigeonhole hierarchy

Abstract

The infinite pigeonhole principle for k colors (RTk) states, for every k-partition A0 … Ak-1 = N, the existence of an infinite subset~H ⊂eq Ai for some~i < k. This seemingly trivial combinatorial principle constitutes the basis of Ramsey's theory, and plays a very important role in computability and proof theory. In this article, we study the infinite pigeonhole principle at various levels of the arithmetical hierarchy from both a computability-theoretic and reverse mathematical viewpoint. We prove that this hierarchy is strict over~RCA0 using an elaborate iterated jump control construction, and study its first-order consequences. This is part of a large meta-mathematical program studying the computational content of combinatorial theorems.

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