A Beurling theorem for noncommutative L^p
Operator Algebras
2007-05-23 v1 Functional Analysis
Abstract
We extend Beurling's invariant subspace theorem, by characterizing subspaces of the noncommutative spaces which are invariant with respect to Arveson's maximal subdiagonal algebras, sometimes known as noncommutative . It is significant that a certain subspace, and a certain quotient, of are -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 . These facts generalize the classical ones, and should be useful in the future development of noncommutative theory. In addition, these results characterize maximal subdiagonal algebras.
Cite
@article{arxiv.math/0510358,
title = {A Beurling theorem for noncommutative L^p},
author = {David P. Blecher and Louis E. Labuschagne},
journal= {arXiv preprint arXiv:math/0510358},
year = {2007}
}
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16 pages