On the spectrum of limit models
Abstract
We study the spectrum of limit models assuming the existence of a nicely behaved independence notion. Under reasonable assumptions, we show that all `long' limit models are isomorphic, and all `short' limit models are non-isomorphic. Theorem. Let K be a 0-tame abstract elementary class stable in λ ≥ LS(K) with amalgamation, joint embedding and no maximal models. Suppose there is an independence relation on the models of size λ that satisfies uniqueness, extension, non-forking amalgamation, universal continuity, and (≥ )-local character in a minimal regular < λ+. Suppose δ1, δ2 < λ+ with cf(δ1) < cf(δ2). Then for any N1, N2, M ∈ Kλ where Nl is a (λ, δl)-limit model over M for l = 1, 2, \[N1 is isomorphic to N2 over M cf(δ1) ≥ \] Both implications in the conclusion have improvements. High cofinality limits are isomorphic without the 0-tameness assumption and assuming the independence relation is defined only on high cofinality limit models. Low cofinality limits are non-isomorphic without assuming non-forking amalgamation. We show how our results can be used to study limit models in both abstract settings and in natural examples of abstract elementary classes.
Turn this paper into a full lesson
ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.