Totally Bounded Elements in W*-probability Spaces

Abstract

We introduce the notion of a totally (K-) bounded element of a W*-probability space (M, ) and, borrowing ideas of Kadison, give an intrinsic characterization of the *-subalgebra Mtb of totally bounded elements. Namely, we show that Mtb is the unique strongly dense *-subalgebra M0 of totally bounded elements of M for which the collection of totally 1-bounded elements of M0 is complete with respect to the \|·\|\#-norm and for which M0 is closed under all operators ha(()) for a ∈ N, where is the modular operator and ha(t):=1/(t-a) (see Theorem 4.3). As an application, we combine this characterization with Rieffel and Van Daele's bounded approach to modular theory to arrive at a new language and axiomatization of W*-probability spaces as metric structures. Previous work of Dabrowski had axiomatized W*-probability spaces using a smeared version of multiplication, but the subalgebra Mtb allows us to give an axiomatization in terms of the original algebra operations. Finally, we prove the (non-)axiomatizability of several classes of W*-probability spaces.