A Beurling theorem for noncommutative Lp

Abstract

We extend Beurling's invariant subspace theorem, by characterizing subspaces K of the noncommutative Lp spaces which are invariant with respect to Arveson's maximal subdiagonal algebras, sometimes known as noncommutative H∞. It is significant that a certain subspace, and a certain quotient, of K are Lp( D)-modules in the recent sense of Junge and Sherman, and therefore have a nice decomposition into cyclic submodules. We also give general inner-outer factorization formulae for elements in the noncommutative Lp. These facts generalize the classical ones, and should be useful in the future development of noncommutative Hp theory. In addition, these results characterize maximal subdiagonal algebras.

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