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The directedness of the Rudin-Keisler order at measurable cardinals

Published 15 Jan 2026 in math.LO | (2601.10614v1)

Abstract: The manuscript is concerned with the Rudin-Keisler order of ultrafilters on measurable cardinals. The main theorem proved read as follows: Given regular cardinals $λ\leq κ$, the following theories are equiconsistent modulo ZFC: (1) $κ$ is a measurable cardinal with $o(κ)=λ+$ (resp. $o(κ)=κ$). (2) The Rudin-Keisler order restricted to the set of $κ$-complete (non-principal) ultrafilters on $κ$ is $λ+$-directed (resp. $κ+$-directed). The theorem reported here is proved after bridging the directedness of the RK-order with the $λ$-Gluing Property introduced by the authors in \cite{HP}. Our result provides what seems to be the first example of a compactness-type property at the level of measurable cardinals whose consistency strength is much lower than the existence of a strong cardinal. As part of our analysis we also answer a question of Gitik by showing that the $\aleph_0$-Gluing Property fails in his classical model from ''Changing cofinalities and the nonstationary ideal". As a consequence of this, in Gitik's model the Rudin-Keisler order fails to be $\aleph_1$-directed.

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