A proof of Shelah's eventual categoricity conjecture and an extension to accessible categories with directed colimits

Abstract

We provide a proof, in ZFC, of Shelah's eventual categoricity conjecture for abstract elementary classes (AEC's). Moreover, assuming in addition the Singular Cardinal Hypothesis (SCH), we prove a direct generalization to the more general context of accessible categories with directed colimits. If K is such a category, we show that there is a cardinal μ such that if K is λ-categorical for some λ ≥ μ (i.e., it has only one object of internal size λ up to isomorphism), then K is eventually categorical (i.e., it is λ'-categorical for every λ' ≥ μ). When considering cardinalities of models of infinitary theories T of L, θ that axiomatize K, the result implies, under SCH, the following infinitary version of Morley's categoricity theorem: let S be the class of cardinals λ which are of cofinality at least θ but are not successors of cardinals of cofinality less than θ. Then, if T is a L, θ theory whose models have directed colimits and it is λ-categorical for some λ ≥ μ in S, then it is λ'-categorical for every λ' ≥ μ in S; moreover, we also exhibit an example that shows that the exceptions in the class S are needed. Along the way we also prove Grossberg conjecture, according to which categoricity in a high enough cardinal implies eventual amalgamation. We establish this result in AEC's and, assuming in addition SCH, in the more general context of accessible categories whose morphisms are monomorphisms.