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Maximal, Minimal, and Primary Invariant Subspaces

✍ Scribed by Aharon Atzmon

Publisher
Elsevier Science
Year
2001
Tongue
English
Weight
345 KB
Volume
185
Category
Article
ISSN
0022-1236

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✦ Synopsis

Let X be a complex infinite dimensional Banach space. An operator L on X is called of subcritical class, if n=1 n &3Γ‚2 log + &L n &< . Assume that T is an operator on X whose iterates have norms of polynomial growth. We prove that if T has a range of finite codimension and a left inverse of subcritical class, then every maximal invariant subspace of T has codimension one, and if T has a finite dimensional kernel and a right inverse of subcritical class, then every minimal invariant subspace of T is one dimensional. Using these results we obtain new information on the invariant subspace lattices of shifts and backward shifts on a wide class of Banach spaces of analytic functions on the unit disc. We also introduce the notion of primary invariant subspaces, and determine their structure for a large class of shifts.

πŸ“œ SIMILAR VOLUMES

Invariant Subspaces, Quasi-invariant Sub
Invariant Subspaces, Quasi-invariant Subspaces, and Hankel Operators
✍ Kunyu Guo; Dechao Zheng πŸ“‚ Article πŸ“… 2001 πŸ› Elsevier Science 🌐 English βš– 210 KB

In this paper, using the theory of Hilbert modules we study invariant subspaces of the Bergman spaces on bounded symmetric domains and quasi-invariant subspaces of the Segal-Bargmann spaces. We completely characterize small Hankel operators with finite rank on these spaces.