Categoricity and Universal Classes
Abstract
Let (K ,⊂eq ) be a universal class with LS(K)=λ categorical in regular >λ+ with arbitrarily large models, and let K* be the class of all A∈K>λ for which there is B ∈ K such that A⊂eqB. We prove that K* is categorical in every >λ+, K_(2λ+)+ ⊂eq K*, and the models of K*>λ+ are essentially vector spaces (or trivial i.e. disintegrated).
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