Covering entropy for types in tracial W*-algebras

Abstract

We study embeddings of tracial W*-algebras into a ultraproduct of matrix algebras through an amalgamation of free probabilistic and model-theoretic techniques. Jung implicitly and Hayes explicitly defined 1-bounded entropy through the asymptotic covering numbers of Voiculescu's microstate spaces, that is, spaces of matrix tuples (X1(N),X2(N),…) having approximately the same *-moments as the generators (X1,X2,…) of a given tracial W*-algebra. We study the analogous covering entropy for microstate spaces defined through formulas that use not only *-algebra operations and the trace, but also suprema and infima, such as arise in the model theory of tracial W*-algebras initiated by Farah, Hart, and Sherman. By relating the new theory with the original 1-bounded entropy, we show that if h(N:M) ≥ 0, then there exists an embedding of M into a matrix ultraproduct Q = Πn U Mn(C) such that h(N:Q) is arbitrarily close to h(N:M). We deduce if all embeddings of M into Q are automorphically equivalent, then M is strongly 1-bounded and in fact has h(M) ≤ 0.