04 conservation of the Ordered Variable Word theorem

Abstract

A left-variable word over an alphabet~A is a word over~A \\ whose first letter is the distinguished symbol~ standing for a placeholder. The Ordered Variable Word theorem (OVW), also known as Carlson-Simpson's theorem, is a tree partition theorem, stating that for every finite alphabet~A and every finite coloring of the words over~A, there exists a word c0 and an infinite sequence of left-variable words w1, w2, … such that \ c0 · w1[a1] · … · wk[ak] : k ∈ N, a1, …, ak ∈ A \ is monochromatic. In this article, we prove that OVW is 04-conservative over~RCA0 + B02. This implies in particular that OVW does not imply ACA0 over~RCA0. This is the first principle for which the only known separation from~ACA0 involves non-standard models.

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