On quasispectral maximal subspaces of a class of Volterra-type operators |
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Authors: | Roman Drnovsek |
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Affiliation: | Institute of Mathematics, Physics and Mechanics Jadranska 19, 1000 Ljubljana, Slovenia |
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Abstract: | The concept of quasispectral maximal subspaces for quasinilpotent (but not nilpotent) operators was introduced by M. Omladiv{c} in 1984. As an application a class of quasinilpotent operators on -spaces, close to the Volterra kernel operator, was studied. In the present Banach function space setting we determine all quasispectral maximal subspaces of analogues of such operators and prove that these subspaces are all the invariant bands. An example is given showing that (in general) they are not all the closed, invariant ideals of the operator. |
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Keywords: | Banach function spaces operators invariant subspaces |
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