RT Journal Article
T1 Reducing subspaces for rank-one perturbations of normal operaators
A1 Gallardo Gutiérrez, Eva A.
A1 González Doña, Javier
AB We study the existence of reducing subspaces for rank-one perturbations of diagonal operators and, in general, of normal operators of uniform multiplicity one. As we will show, the spectral picture will play a significant role in order to prove the existence of reducing subspaces for rank-one perturbations of diagonal operators whenever they are not normal. At this regard, the most extreme case is provided when the spectrum of the rank-one perturbation of a diagonal operator T = D + u ⊗ v (uniquely determined by such expression) is contained in a line, since in such a case T has a reducing subspace if and only if T is normal. Nevertheless, we will show that it is possible to exhibit non-normal operators T = D + u ⊗ v with spectrum contained in a circle either having or lacking non-trivial reducing subspaces. Moreover, as far as the spectrum of T is contained in any compact subset of the complex plane, we provide a characterization of the reducing subspaces M of T such that the restriction T |M is normal. In particular, such characterization allows to exhibit rank-one perturbations of completely normal diagonal operators (in the sense of Wermer) lacking reducing subspaces. Furthermore, it determines completely the decomposition of the underlying Hilbert space in an orthogonal sum of reducing subspaces in the context of a classical theorem due to Behncke on essentially normal operators.
PB Cambridge University Press
SN 0308-2105
YR 2022
FD 2022-08-09
LK https://hdl.handle.net/20.500.14352/71955
UL https://hdl.handle.net/20.500.14352/71955
LA eng
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NO Ministerio de Ciencia e Innovación (MICINN)
NO Centro de Excelencia Severo Ochoa
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DS Docta Complutense
RD 29 abr 2024