High dimensional Ellentuck spaces and initial chains in the Tukey structure of non-p-points

Abstract

The generic ultrafilter G2 forced by P(ω×ω)/(Fin) was recently proved to be neither maximum nor minimum in the Tukey order of ultrafilters (in a recent paper of Blass, Dobrinen, and Raghavan), but it was left open where exactly in the Tukey order it lies. We prove that G2 is in fact Tukey minimal over its projected Ramsey ultrafilter. Furthermore, we prove that for each k 2, the collection of all nonprincipal ultrafilters Tukey reducible to the generic ultrafilter Gk forced by P(ωk)/Fin k forms a chain of length k. Essential to the proof is the extraction of a dense subset Ek from (Fin k)+ which we prove to be a topological Ramsey space. The spaces Ek, k 2, form a hiearchy of high dimensional Ellentuck spaces. New Ramsey-classification theorems for equivalence relations on fronts on Ek are proved, extending the Pudlak-Rodl Theorem for fronts on the Ellentuck space, which are applied to find the Tukey structure below Gk.