Good Scales and Non-Compactness of Squares

Abstract

Cummings, Foreman, and Magidor investigated the extent to which square principles are compact at singular cardinals. The first author proved that if is a singular strong limit of uncountable cofinality, all scales on are good, and *δ holds for all δ<, then * holds. In this paper we will present a strongly contrasting result for ω. We construct a model in which _n holds for all n<ω, all scales on ω are good, but in which _ω* fails and some weak forms of internal approachability for [H(ω+1)]1 fail. This requires an extensive analysis of the dominating and approximation properties of a version of Namba forcing. We also prove some supporting results.

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