A Characterization of the Invariant Subspaces of Direct Sums of Strictly Cyclic Algebras
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Publication:4722683
DOI10.2307/2044876zbMath0615.47005OpenAlexW4256391124MaRDI QIDQ4722683
Publication date: 1985
Full work available at URL: https://doi.org/10.2307/2044876
invariant subspacesDonoghue latticehereditarily strictly cyclicinvariant graph subspaceunicellular strictly cyclic Abelian algebra of operators on a Hilbert spaceunipunctual spectrum
Abstract operator algebras on Hilbert spaces (47L30) Invariant subspaces of linear operators (47A15) Linear transformations, semilinear transformations (15A04)
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Network reoptimization procedures for multiobjective network problems ⋮ Power set of some quasinilpotent weighted shifts ⋮ Hereditarily strictly cyclic operator algebras
Cites Work
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- The lattice of invariant subspaces of a completely continuous quasinilpotent transformation
- Invariant subspaces of a direct sum of weighted shifts
- A density theorem for operator algebras
- Strictly cyclic operator algebras
- Maximal invariant subspaces of strictly cyclic operator algebras
- The double commutants of invertibly weighted shifts
- Strongly Strictly Cyclic Weighted Shifts
- Power Bounded Strictly Cyclic Operators
- Closed Operators Commuting with a Weighted Shift
- Strictly Cyclic Weighted Shifts
- Some Remarks on the Volterra Operator
- On Strictly Cyclic Algebras, -Algebras and Reflexive Operators
