Effectiveness for the Dual Ramsey Theorem

Abstract

We analyze the Dual Ramsey Theorem for k partitions and colors (DRTk) in the context of reverse math, effective analysis, and strong reductions. Over RCA0, the Dual Ramsey Theorem stated for Baire colorings is equivalent to the statement for clopen colorings and to a purely combinatorial theorem cDRTk. When the theorem is stated for Borel colorings and k≥ 3, the resulting principles are essentially relativizations of cDRTk. For each α, there is a computable Borel code for a 0α coloring such that any partition homogeneous for it computes (α) or (α-1) depending on whether α is infinite or finite. For k=2, we present partial results giving bounds on the effective content of the principle. A weaker version for 0n reduced colorings is equivalent to Dn2 over RCA0+I0n-1 and in the sense of strong Weihrauch reductions.