Distributive Aronszajn trees

Abstract

Ben-David and Shelah proved that if λ is a singular strong-limit cardinal and 2λ=λ+, then *λ entails the existence of a normal λ-distributive λ+-Aronszajn tree. Here, it is proved that the same conclusion remains valid after replacing the hypothesis *λ by (λ+,<λ). As (λ+,<λ) does not impose a bound on the order-type of the witnessing clubs, our construction is necessarily different from that of Ben-David and Shelah, and instead uses walks on ordinals augmented with club guessing. A major component of this work is the study of postprocessing functions and their effect on square sequences. A byproduct of this study is the finding that for regular uncountable, () entails the existence of a partition of into many fat sets. When contrasted with a classic model of Magidor, this shows that it is equiconsistent with the existence of a weakly compact cardinal that ω2 cannot be split into two fat sets.