English

Universal classes near $\aleph_1$

Logic 2019-01-25 v5

Abstract

Shelah has provided sufficient conditions for an Lω1,ωL_{\omega_1, \omega}-sentence ψ\psi to have arbitrarily large models and for a Morley-like theorem to hold of ψ\psi. These conditions involve structural and set-theoretic assumptions on all the n\aleph_n's. Using tools of Boney, Shelah, and the second author, we give assumptions on 0\aleph_0 and 1\aleph_1 which suffice when ψ\psi is restricted to be universal: Theorem\mathbf{Theorem} Assume 20<212^{\aleph_{0}} < 2 ^{\aleph_{1}}. Let ψ\psi be a universal Lω1,ωL_{\omega_{1}, \omega}-sentence. - If ψ\psi is categorical in 0\aleph_{0} and 1I(ψ,1)<211 \leq I(\psi, \aleph_{1}) < 2 ^{\aleph_{1}}, then ψ\psi has arbitrarily large models and categoricity of ψ\psi in some uncountable cardinal implies categoricity of ψ\psi in all uncountable cardinals. - If ψ\psi is categorical in 1\aleph_1, then ψ\psi is categorical in all uncountable cardinals. The theorem generalizes to the framework of Lω1,ωL_{\omega_1, \omega}-definable tame abstract elementary classes with primes.

Keywords

Cite

@article{arxiv.1712.02880,
  title  = {Universal classes near $\aleph_1$},
  author = {Marcos Mazari-Armida and Sebastien Vasey},
  journal= {arXiv preprint arXiv:1712.02880},
  year   = {2019}
}

Comments

12 pages; Corrected typos; Rewrote part of the introduction

R2 v1 2026-06-22T23:11:49.133Z