Smooth paths of conditional expectations

Abstract

Let A be a von Neumann algebra with a finite trace τ, represented in H=L2(A,τ), and let Bt⊂ A be sub-algebras, for t in an interval I. Let Et:A Bt be the unique τ-preserving conditional expectation. We say that the path t Et is smooth if for every a∈ A and v ∈ H, the map I t Et(a)v∈ H is continuously differentiable. This condition implies the existence of the derivative operator dEt(a):H H, \ dEt(a)v=ddtEt(a)v. If this operator verifies the additional boundedness condition, ∫J \|dEt(a)\|22 d t CJ\|a\|22, for any closed bounded sub-interval J⊂ I, and CJ>0 a constant depending only on J, then the algebras Bt are *-isomorphic. More precisely, there exists a curve Gt:A A, t∈ I of unital, *-preserving linear isomorphisms which intertwine the expectations, Gt E0=Et Gt. The curve Gt is weakly continuously differentiable. Moreover, the intertwining property in particular implies that Gt maps B0 onto Bt. We show that this restriction is a multiplicative isomorphism.