Thin Set Versions of Hindman's Theorem

Abstract

In this paper we examine the reverse mathematical strength of a variation of Hindman's Theorem HT constructed by essentially combining HT with the Thin Set Theorem TS to obtain a principle which we call thin-HT. thin-HT says that every coloring c: N N has an infinite set S ⊂eq N whose finite sums are thin for c, meaning that there is an i with c(s) ≠ i for all s ∈ S. We show that there is a computable instance of thin-HT such that every solution computes ', as is the case with HT (see Blass, Hirst, and Simpson 1987). In analyzing this proof, we deduce that thin-HT implies ACA0 over RCA0 + I02. On the other hand, using Rumyantsev and Shen's computable version of the Lov\'asz Local Lemma, we show that there is a computable instance of the restriction of thin-HT to sums of exactly 2 elements such that any solution has diagonally noncomputable degree relative to '. Hence there is a computable instance of this restriction of thin-HT with no 02 solution.