Factorial relative commutants and the generalized Jung property for II1 factors

Abstract

We introduce the notion of a generalized Jung factor: a II1 factor M for which any two embeddings of M into its ultrapower M U are equivalent by an automorphism of M U. We show that R is not the unique generalized Jung factor but is the unique R U-embeddable generalized Jung factor. We use model-theoretic techniques to obtain these results. Integral to the techniques used is the result that if M is elementarily equivalent to R, then any elementary embedding of M into R U has factorial relative commutant. This answers a long-standing question of Popa for an uncountable family of II1 factors. We also provide new examples and results about the notion of super McDuffness, which is a strengthening of the McDuff property for II1 factors.