Disjoint non-forking amalgamation in stable AECs

Abstract

The disjoint amalgamation property (DAP), which asserts that all spans of a class of models can be amalgamated with minimal intersection, is an important property in the context of abstract elementary classes, with connections to both Grossberg's question and Shelah's categoricity conjecture. We prove that, in a nice AEC K stable in λ ≥ LS(K) with a strong enough independence relation, all high cofinality λ-limit models are disjoint (non-forking) amalgamation bases. Theorem. Let K be an AEC stable in λ, where Kλ has AP, JEP, and NMM, and let K' be some AC where K(λ,≥) ⊂eq K' ⊂eq Kλ. Suppose there is an independence relation on K' satisfying uniqueness, existence, non-forking amalgamation, K(λ,≥)-universal continuity* in Kλ, and (≥ )-local character. Assume M0, M1, M2 ∈ K(λ,≥), and that M0 ≤K Ml and al ∈ Ml for l = 1, 2. Then there exist N ∈ K(λ,≥) and fl : Ml → N fixing M0 for l = 1, 2 such that gtp(fl(al)/f3-l[M3-l], N) does not fork over M0 and f1[M1] f2[M2] = M0. That is, our independence relation has disjoint non-forking amalgamation in K(λ,≥). In particular, every M0 ∈ K(λ,≥) is a disjoint amalgamation base in Kλ. The hypotheses on the independence relation can be weakened (closer to λ-non-splitting in λ-stable AECs) if we are willing to give up the `non-forking' conditions of the amalgamation.