Trees and gaps from a construction scheme

Abstract

We present natural constructions of trees and gaps using a quite general construction scheme. In particular, we solve a natural problem about (ω1, ω1)-gaps. As it is well known (ω1, ω1)-gaps can sometimes be filled in ω1-preserving forcing extensions of the set-theoretic universe. There are two natural conditions, dubbed S and T below, that guarantee the existence of such forcing extensions. The condition T is a natural strengthening of the condition S and was motivated by the numerous analogies between (ω1,ω1)-gaps and certain trees of height ω1. It turns out that the condition S is in fact equivalent to the existence of such forcing extensions but we show that the condition T is strictly stronger by proving that it is consistent that there are fillable (ω1, ω1)-gaps (i.e., S-gaps) but no T-gaps.