Universal classes near 1

Abstract

Shelah has provided sufficient conditions for an Lω1, ω-sentence to have arbitrarily large models and for a Morley-like theorem to hold of . These conditions involve structural and set-theoretic assumptions on all the n's. Using tools of Boney, Shelah, and the second author, we give assumptions on 0 and 1 which suffice when is restricted to be universal: Theorem Assume 20 < 2 1. Let be a universal Lω1, ω-sentence. - If is categorical in 0 and 1 ≤ I(, 1) < 2 1, then has arbitrarily large models and categoricity of in some uncountable cardinal implies categoricity of in all uncountable cardinals. - If is categorical in 1, then is categorical in all uncountable cardinals. The theorem generalizes to the framework of Lω1, ω-definable tame abstract elementary classes with primes.