Ramsey-like theorems and immunities

Abstract

A Ramsey-like theorem is a statement of the form ``For every 2-coloring of [N]2, there exists an infinite set~H ⊂eq N such that [H]2 avoids some pattern''. We prove that none of these statements are computably trivial, by constructing a computable 2-coloring of [N]2 such that every infinite set avoiding any pattern computes a diagonally non-computable function relative to '. We also consider multiple notions of weaknesses based of variants of immunity, and characterize the Ramsey-like theorems which preserve these notions or not, based on the shape of the avoided pattern. This is part of a larger study of the reverse mathematics of Ramsey-like theorems.