The strength of the tree theorem for pairs in reverse mathematics

Abstract

No natural principle is currently known to be strictly between the arithmetic comprehension axiom (ACA) and Ramsey's theorem for pairs (RT22) in reverse mathematics. The tree theorem for pairs (TT22) is however a good candidate. The tree theorem states that for every finite coloring over tuples of comparable nodes in the full binary tree, there is a monochromatic subtree isomorphic to the full tree. The principle TT22 is known to lie between ACA and RT22 over RCA, but its exact strength remains open. In this paper, we prove that RT22 together with weak K\"onig's lemma (WKL) does not imply TT22, thereby answering a question of Montalban. This separation is a case in point of the method of Lerman, Solomon and Towsner for designing a computability-theoretic property which discriminates between two statements in reverse mathematics. We therefore put the emphasis on the different steps leading to this separation in order to serve as a tutorial for separating principles in reverse mathematics.