A characterization of absolutely dilatable Schur multipliers

Abstract

Let M be a von Neumann algebra equipped with a normal semi-finite faithful trace (nsf trace in short) and let T M M be a contraction. We say that T is absolutely dilatable if there exist another von Neumann algebra M' equipped with a nsf trace, a w*-continuous trace preserving unital *-homomorphim J M M' and a trace preserving *-automomorphim U M' M' such that Tk=E Uk J for all integer k≥ 0, where E M' M is the conditional expectation associated with J. Given a σ-finite measure space (,μ), we characterize bounded Schur multipliers φ∈ L∞(2) such that the Schur multiplication operator Tφ B(L2()) B(L2()) is absolutely dilatable. In the separable case, they are characterized by the existence of a von Neumann algebra N with a separable predual, equipped with a normalized normal faithful trace τN, and of a w*-continuous essentially bounded function d N such that φ(s,t)=τN(d(s)*d(t)) for almost every (s,t)∈2.