Club Stationary Reflection and the Special Aronszajn Tree Property

Abstract: We prove that it is consistent that Club Stationary Reflection and the Special Aronszajn Tree Property simultaneously hold on ω 2 , thereby contributing to the study of the tension between compactness and incompactness in set theory. The poset which produces the final model follows the collapse of a weakly compact cardinal first with an iteration of club adding (with anticipation) and second with an iteration specializing Aronszajn trees.In the first part of the paper, we prove a general theorem about speciali… Show more