Infinite dimensional Ellentuck spaces and Ramsey-classification theorems

Abstract

We extend the hierarchy of finite-dimensional Ellentuck spaces to infinite dimensions. Using uniform barriers B on ω as the prototype structures, we construct a class of continuum many topological Ramsey spaces EB which are Ellentuck-like in nature, and form a linearly ordered hierarchy under projection. We prove new Ramsey-classification theorems for equivalence relations on fronts, and hence also on barriers, on the spaces EB, extending the Pudlak-Rodl Theorem for barriers on the Ellentuck space. The inspiration for these spaces comes from continuing the iterative construction of the forcings P([]k)/ k to the countable transfinite. The σ-closed partial order (EB, ^B) is forcing equivalent to P(B)/B, which forces a non-p-point ultrafilter GB. The present work forms the basis for further work classifying the Rudin-Keisler and Tukey structures for the hierarchy of the generic ultrafilters GB.