Initial Tukey structure below a stable ordered-union ultrafilter

Abstract

Answering a question of Dobrinen and Todorcevic, we prove that below any stable ordered-union ultrafilter U, there are exactly four nonprincipal Tukey classes: [U], [Umin], [Umax], and [Uminmax]. This parallels the classification of ultrafilters Rudin-Keisler below U by Blass. A key step in the proof involves modifying the proof of a canonization theorem of Klein and Spinas for Borel functions on FIN[∞] to obtain a simplified canonization theorem for fronts on FIN[∞], recovering Lefmann's canonization for fronts of finite uniformity rank as a special case. We use this to classify the Rudin-Keisler classes of all ultrafilters Tukey below U, which is then applied to achieve the main result.

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