Geodesic
Operator Topologies and Invariant Operator Ranges
Canadian mathematical bulletin, Tome 24 (1981) no. 2, pp. 181-185

Voir la notice de l'article provenant de la source Cambridge University Press

The invariant operator range lattices of a wide class of uniformly closed algebras (including C *-algebras) are stable under weak closures. There is an algebra whose invariant operator range lattice contains properly the corresponding lattice of its norm closure. An operator range transitive algebra is operator range n -transitive for all n. A normal operator is algebraic if and only if each of its invariant operator ranges is the range of some operator commuting with it. 
Ong, Sing-Cheong. Operator Topologies and Invariant Operator Ranges. Canadian mathematical bulletin, Tome 24 (1981) no. 2, pp. 181-185. doi: 10.4153/CMB-1981-029-x
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[1] 1. Fillmore, P., Williams, J., On operator ranges, Adv. in Math., 7, 254. 281 (1971). Google Scholar

[2] 2. Foia§, C., Invariant para-closed subspaces, Indiana U. Math. J., 21, 887. 907 (1972). Google Scholar

[3] 3. Nordgren, E., Radjabalipour, M., Radjavi, H., Rosenthal, P., On invariant operator ranges, Trans. A.M.S. 251, 389-398 (1979). Google Scholar

[4] 4. Nordgren, E., Radjabalipour, M., Radjavi, H., Rosenthal, P., Algebras intertwining compact operators, Acta Sci. Math. (Szeged), 39, 115. 119 (1977). Google Scholar

[5] 5. Radjavi, H., Rosenthal, P., Invariant Subspaces, Springer-Verlag (1973). Google Scholar

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