On the structure of categorical abstract elementary classes with amalgamation

Abstract

For K an abstract elementary class with amalgamation and no maximal models, we show that categoricity in a high-enough cardinal implies structural properties such as the uniqueness of limit models and the existence of good frames. This improves several classical results of Shelah. Theorem Let μ LS (K). If K is categorical in a λ (2μ)+, then: 1) Whenever M0, M1, M2 ∈ Kμ are such that M1 and M2 are limit over M0, we have M1 M0 M2. 2) If μ > LS (K), the model of size λ is μ-saturated. 3) If μ (2LS (K))+ and λ (2μ+)+, then there exists a type-full good μ-frame with underlying class the saturated models in Kμ. Our main tool is the symmetry property of splitting (previously isolated by the first author). The key lemma deduces symmetry from failure of the order property.