A Generalized Beurling Theorem in Finite von Neumann Algebras

Abstract

In 2016 and 2017, Haihui Fan, Don Hadwin and Wenjing Liu proved a commutative and noncommutative version of Beurling's theorems for a continuous unitarily invariant norm α on L∞(T,μ) and tracial finite von Neumann algebras ( M,τ ) , respectively. In the paper, we study unitarily \|\|1-dominating invariant norms α on finite von Neumann algebras. First we get a Burling theorem in commutative von Neumann algebras by defining Hα(T,μ)= H∞(T,μ)σ(Lα( T ),Lα'( T )) Lα(T,μ), then prove that the generalized Beurling theorem holds. Moreover, we get similar result in noncommutative case. The key ingredients in the proof of our result include a factorization theorem and a density theorem for Lα (M,τ ) .