Invariant Subspaces for Operators in a General II1-factor
Abstract
It is shown that to every operator T in a general von Neumann factor M of type II1 and to every Borel set B in the complex plane, one can associate a largest, closed, T-invariant subspace, K = KT(B), affiliated with M, such that the Brown measure of T|K is concentrated on B. Moreover, K is T-hyperinvariant, and the Brown measure of (1-PK)T|(1-PK)(H) is concentrated on C. In particular, if T has a Brown measure which is not concentrated on a singleton, then there exists a non-trivial, closed, T-hyperinvariant subspace. Furthermore, it is shown that for every T in M, the limit A=n∞[(Tn)* Tn]1/2n exists in the strong operator topology and KT(B(0,r))=1[0,r](A), r>0.
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