Diamonds on trees

Abstract

We generalize the diamond principle and its variants using the notion of stationarity in trees introduced by Brodsky in [Brodsky, A. M., A theory of stationary trees and the balanced Baumgartner--Hajnal--Todorcevic theorem for trees. The Bulletin of Symbolic Logic]. In particular, we show that if T is a nonspecial ω1-tree, then T , and if T is a Suslin tree, then T . We also prove that * implies T (yielding the consistency of T) and establish the consistency of * + (∀ T nonspecial ω1-tree (T)). Finally, we demonstrate that it is consistent with that there exists a nonspecial ω1-tree with (T), introducing two forcing properties -- σ(S)-closed and strategically closed in models -- which are preserved under countable support iterations.

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