Saturating the random graph with an independent family of small range

Abstract

Motivated by Keisler's order, a far-reaching program of understanding basic model-theoretic structure through the lens of regular ultrapowers, we prove that for a class of regular filters D on I, |I| = λ > 0, the fact that P(I)/ has little freedom (as measured by the fact that any maximal antichain is of size <λ, or even countable) does not prevent extending D to an ultrafilter D1 on I which saturates ultrapowers of the random graph. "Saturates" means that MI/1 is λ+-saturated whenever M is a model of the theory of the random graph. This was known to be true for stable theories, and false for non-simple and non-low theories. This result and the techniques introduced in the proof have catalyzed the authors' subsequent work on Keisler's order for simple unstable theories. The introduction, which includes a part written for model theorists and a part written for set theorists, discusses our current program and related results.