Notions of amalgamation for AECs and categoricity

Abstract

Motivated by the free products of groups, the direct sums of modules, and Shelah's (λ,2)-goodness, we study strong amalgamation properties in Abstract Elementary Classes. Such a notion of amalgamation consists of a selection of certain amalgams for every triple M0≤ M1, M2, and we show that if K designates a unique strong amalgam to every triple M0≤ M1, M2, then K satisfies categoricity transfer at cardinals ≥θ(K)+2LS(K), where θ(K) is a cardinal associated with the notion of amalgamation. We also show that if such a unique choice does not exist, then there is some model M∈ K having 2|M| many extensions which cannot be embedded in each other over M. Thus, for AECs which admit a notion of amalgamation, the property of having unique amalgams is a dichotomy property in the sense of Shelah's classification theory.