Ramsey theory for monochromatically well-connected subsets

Abstract

We define well-connectedness, an order-theoretic notion of largeness whose associated partition relations wc(μ)λ2 formally weaken those of the classical Ramsey relations (μ)λ2. We show that it is consistent that the arrows wc and are, in infinite contexts, essentially indistinguishable. We then show, in contrast, that in Mitchell's model of the tree property at ω2, the relation ω2wc(ω2)ω2 does hold, and that the consistency strength of this relation holding is precisely a weakly compact cardinal. These investigations may be viewed as augmenting those of [BHS], the central arrow of which, hc, is of intermediate strength between wc and the Ramsey arrow .