Vaught's Two-Cardinal Theorem and Quasi-Minimality in Continuous Logic

Abstract

We prove the following continuous analogue of Vaught's Two-Cardinal Theorem: if for some >λ≥ 0, a continuous theory T has a model with density character which has a definable subset of density character λ, then T has a model with density character 1 which has a separable definable subset. We also show that if we assume that T is ω-stable, then if T has a model of density character 1 with a separable definable set, then for any uncountable we can find a model of T with density character which has a separable definable subset. In order to prove this, we develop an approximate notion of quasi-minimality for the continuous setting. We apply these results to show a continuous version of the forward direction of the Baldwin-Lachlan characterization of uncountable categoricity: if a continuous theory T is uncountably categorical, then T is ω-stable and has no Vaughtian pairs.