Local Ramsey Spaces in Matet Forcing Extensions and Finitely Many Near-Coherence Classes
Abstract
We introduce Gowers--Matet forcing with a finite sequence of pairwise non-isomorphic Ramsey ultrafilters over ω, and with this forcing we settle the long-standing problem of the spectrum of numbers near-coherence classes. We prove that for any finite n ≥ 1, there is a forcing extension with exactly n near-coherence classes of ultrafilters. For evaluating the new forcing, we prove a strengthening of Gowers's theorem on colourings of Fink.
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