The weakness of the Erdos-Moser theorem under arithmetic reductions
Abstract
The Erdos-Moser theorem (EM) says that every infinite tournament admits an infinite transitive subtournament. We study the computational behavior of the Erdos-Moser theorem with respect to the arithmetic hierarchy, and prove that 0n instances of EM admit lown+1 solutions for every n ≥ 1, and that if a set B is not arithmetical, then every instance of EM admits a solution relative to which B is still not arithmetical. We also provide a level-wise refinement of this theorem. These results are part of a larger program of computational study of combinatorial theorems in Reverse Mathematics.
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