A complete classification of categoricity spectra of accessible categories with directed colimits

Abstract

We provide a complete classification of all the possible categoricity spectra, in terms of internal size, that can appear in a large accessible category with directed colimits, assuming the Singular Cardinal Hypothesis (SCH), and providing as well explicit threshold cardinals for eventual categoricity. This includes as a particular case the first complete classification of categoricity spectra of abstract elementary classes (AEC's) entirely in ZFC. More specifically, we have the following theorem: Let K be a large -accessible category with directed colimits. Assume the Singular Cardinal Hypothesis SCH (only if the restriction to monomorphisms is not an AEC). Then the categoricity spectrum Cat(K)=\λ≥ : K is λ-categorical\ is one of the following: 1) Cat(K)=. 2) Cat(K)=[α, β] for some α, β ∈ [, ω()). 3) Cat(K)=[, ∞) for some ∈ [, (2)+). This solves in particular Shelah categoricity conjecture for AEC's. There are examples of each of the three cases of the classification, showing that they indeed occur.