A long chain of P-points
Abstract
The notion of a δ-generic sequence of P-points is introduced in this paper. It is proved assuming the Continuum Hypothesis that for each δ < ω2, any δ-generic sequence of P-points can be extended to an ω2-generic sequence. This shows that the Continuum Hypothesis implies that there is a chain of P-points of length c+ with respect to both Rudin-Keisler and Tukey reducibility. The proofs can be easily adapted to get such a chain of length c+ under a more general hypothesis like Martin's Axiom. These results answer an old question of Andreas Blass.
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