Jensen's inequality in finite subdiagonal algebras

Abstract

Let M be a finite von Neumann algebra with a faithful normal tracial state τ and A be a finite subdiagonal subalgebra of M with respect to a τ-preserving faithful normal conditional expectation on M. Let denote the Fuglede-Kadison determinant corresponding to τ. For X ∈ M, define |X| := (X*X)12. In 2005, Labuschagne proved the so-called Jensen's inequality for finite subdiagonal algebras i.e. ((A)) (A) for an operator A ∈ A, thus resolving a long-standing open problem posed by Arveson in 1967. In this article, we prove the following more general result: τ(f( |(A)|)) τ(f( |A|)) for A ∈ A and any increasing continuous function f : [0, ∞) R such that f is convex on R. Under the additional hypotheses that A is invertible in M and f is strictly convex, we have τ(f( |(A)|)) = τ(f( |A|)) (A) = A. As an application, we show that for A ∈ A the point spectrum of A is contained in the point spectrum of (A), though such a conclusion does not hold in general for their spectra.