E-resources
Peer reviewed
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Liu, Wenjing; Sager, Lauren
Journal of operator theory, 06/2019, Volume: 82, Issue: 1Journal Article
We prove a Beurling-type theorem for H∞-invariant spaces of Lα(M,τ), where α is a unitarily invariant, locally ∥⋅∥1-dominating, mutually continuous norm with respect to τ, where M is a von Neumann algebra with a faithful, normal, semifinite tracial weight τ, and H∞ is an extension of Arveson's noncommutative Hardy space. We use our main result to characterize the H∞-invariant subspaces of a noncommutative Banach function space I(τ) with the norm ∥⋅∥E on M, the crossed product of a semifinite von Neumann algebra by an action β, and B(H) for a separable Hilbert space H.
