Keisler Measures and Generically Stable Random Types

Abstract

We introduce the notions of rgs and irgs for Keisler measures, motivated by the study of generically stable random types and their associated Morley sequences. We obtain characterizations of these notions in terms of averages of classical first-order formulas over suitable probabilistic partitions (Theorems 3.2 and 3.3). We compare these notions with fim, fam, and self-averaging, and show that for types the notions fim, irgs, and rgs coincide. We prove that every irgs measure is dependent (Theorem 4.5); consequently, such measures are symmetric (Corollary 4.8). Furthermore, we show that for irgs measures the model-theoretic instability events Oφ, Iφ, and Lφ have Pμ-measure zero (Theorem 5.4), extending results from [8] beyond the fim case.