The Ostaszewski square, and homogenous Souslin trees

Abstract

Assume GCH and let λ denote an uncountable cardinal. We prove that if λ holds, then this may be witnessed by a coherent sequence < Cα | α < λ+ > with the following remarkable guessing property: For every sequence < Ai | i<λ > of unbounded subsets of λ+, and every limit θ<λ, there exists some α<λ+ such that (Cα)=θ, and the (i+1)th-element of Cα is a member of Ai, for all i<θ. As an application, we construct an homogenous λ+-Souslin tree from GCH+λ, for every singular cardinal λ. In addition, as a by-product, a theorem of Farah and Velickovic, and a theorem of Abraham, Shelah and Solovay are generalized to cover the case of successors of regulars.