Lebesgue and Hardy Spaces for Symmetric Norms II: A Vector-Valued Beurling Theorem
Abstract
Suppose α is a rotationally symmetric norm on L∞(T) and β is a "nice" norm on L∞(,μ ) where μ is a σ-finite measure on . We prove a version of Beurling's invariant subspace theorem for the space Lβ(μ,Hα) . Our proof uses the recent version of Beurling's theorem on Hα(T) proved by the first author and measurable cross-section techniques. Our result significantly extends a result of H. Rezaei, S. Talebzadeh, and D. Y. Shin.
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